The lists L(m): List L(1): Tree 1. Subtrees: (0,1) (0,1) (0,1); (sigma,sigma_0): (9,8) List L(2): Tree 1. Subtrees: (0,1) (0,1) (1,1); (sigma,sigma_0): (44,36) List L(3): Tree 1. Subtrees: (0,1) (1,1) (1,1); (sigma,sigma_0): (226,162) Tree 2. Subtrees: (0,1) (0,1) (2,1); (sigma,sigma_0): (212,176) List L(4): Tree 1. Subtrees: (1,1) (1,1) (1,1); (sigma,sigma_0): (1241,729) Tree 2. Subtrees: (0,1) (0,1) (3,1); (sigma,sigma_0): (1066,904) List L(5): Tree 1. Subtrees: (1,1) (1,1) (2,1); (sigma,sigma_0): (5868,3564) Tree 2. Subtrees: (0,1) (0,1) (4,1); (sigma,sigma_0): (5693,4964) List L(6): Tree 1. Subtrees: (1,1) (1,1) (3,1); (sigma,sigma_0): (28674,18306) Tree 2. Subtrees: (0,1) (1,1) (4,1); (sigma,sigma_0): (28170,22338) Tree 3. Subtrees: (0,1) (0,1) (5,2); (sigma,sigma_0): (27736,22772) Tree 4. Subtrees: (0,1) (0,1) (5,1); (sigma,sigma_0): (27036,23472) List L(7): Tree 1. Subtrees: (1,1) (1,1) (4,1); (sigma,sigma_0): (147177,100521) Tree 2. Subtrees: (0,1) (0,1) (6,2); (sigma,sigma_0): (135018,112680) Tree 3. Subtrees: (0,1) (0,1) (6,1); (sigma,sigma_0): (133002,114696) List L(8): Tree 1. Subtrees: (1,1) (1,1) (5,2); (sigma,sigma_0): (778829,461133) Tree 2. Subtrees: (0,1) (0,1) (7,1); (sigma,sigma_0): (689229,588708) List L(9): Tree 1. Subtrees: (1,1) (1,1) (6,2); (sigma,sigma_0): (3711402,2281770) Tree 2. Subtrees: (0,1) (4,1) (4,1); (sigma,sigma_0): (3611603,3080162) Tree 3. Subtrees: (0,1) (0,1) (8,1); (sigma,sigma_0): (3576449,3115316) List L(10): Tree 1. Subtrees: (1,1) (1,1) (7,1); (sigma,sigma_0): (18354681,11921337) Tree 2. Subtrees: (1,1) (4,1) (4,1); (sigma,sigma_0): (18112257,13860729) Tree 3. Subtrees: (0,1) (0,1) (9,2); (sigma,sigma_0): (17526574,14446412) Tree 4. Subtrees: (0,1) (0,1) (9,1); (sigma,sigma_0): (17127378,14845608) List L(11): Tree 1. Subtrees: (1,1) (1,1) (8,2); (sigma,sigma_0): (93504861,55827549) Tree 2. Subtrees: (1,1) (1,1) (8,1); (sigma,sigma_0): (92597661,63085149) Tree 3. Subtrees: (1,1) (4,1) (5,2); (sigma,sigma_0): (92535165,63585117) Tree 4. Subtrees: (0,1) (0,1) (10,2); (sigma,sigma_0): (86309757,72449028) Tree 5. Subtrees: (0,1) (0,1) (10,1); (sigma,sigma_0): (85340061,73418724) List L(12): Tree 1. Subtrees: (1,1) (1,1) (9,2); (sigma,sigma_0): (489670211,292539843) Tree 2. Subtrees: (0,1) (4,1) (7,1); (sigma,sigma_0): (438573123,365293314) Tree 3. Subtrees: (0,1) (0,1) (11,3); (sigma,sigma_0): (433725777,370140660) Tree 4. Subtrees: (0,1) (0,1) (11,2); (sigma,sigma_0): (433475793,370390644) Tree 5. Subtrees: (0,1) (0,1) (11,1); (sigma,sigma_0): (429846993,374019444) List L(13): Tree 1. Subtrees: (1,1) (1,1) (10,2); (sigma,sigma_0): (2354179473,1467092817) Tree 2. Subtrees: (4,1) (4,1) (4,1); (sigma,sigma_0): (2298661010,1911240521) Tree 3. Subtrees: (0,1) (0,1) (12,1); (sigma,sigma_0): (2251220687,1958680844) List L(14): Tree 1. Subtrees: (1,1) (1,1) (11,4); (sigma,sigma_0): (11627828109,6991090317) Tree 2. Subtrees: (1,1) (1,1) (11,3); (sigma,sigma_0): (11564795853,7495348365) Tree 3. Subtrees: (4,1) (4,1) (5,2); (sigma,sigma_0): (11405754257,8767681133) Tree 4. Subtrees: (0,1) (0,1) (13,2); (sigma,sigma_0): (11105884561,9194644040) Tree 5. Subtrees: (0,1) (0,1) (13,1); (sigma,sigma_0): (10883810709,9416717892) List L(15): Tree 1. Subtrees: (1,1) (1,1) (12,2); (sigma,sigma_0): (58903195059,35524422963) Tree 2. Subtrees: (1,1) (1,1) (12,1); (sigma,sigma_0): (58385837043,39663287091) Tree 3. Subtrees: (1,1) (4,1) (9,2); (sigma,sigma_0): (58301498691,40337993907) Tree 4. Subtrees: (0,1) (4,1) (10,2); (sigma,sigma_0): (55059093315,44954621874) Tree 5. Subtrees: (0,1) (0,1) (14,3); (sigma,sigma_0): (54390698161,45623017028) Tree 6. Subtrees: (0,1) (0,1) (14,2); (sigma,sigma_0): (53754531777,46259183412) Tree 7. Subtrees: (0,1) (0,1) (14,1); (sigma,sigma_0): (53502402753,46511312436) List L(16): Tree 1. Subtrees: (1,1) (1,1) (13,2); (sigma,sigma_0): (308510935154,186191541810) Tree 2. Subtrees: (4,1) (4,1) (7,1); (sigma,sigma_0): (280085482098,226664501337) Tree 3. Subtrees: (0,1) (0,1) (15,3); (sigma,sigma_0): (273543988671,233205994764) Tree 4. Subtrees: (0,1) (0,1) (15,2); (sigma,sigma_0): (273206635263,233543348172) Tree 5. Subtrees: (0,1) (0,1) (15,1); (sigma,sigma_0): (271137203199,235612780236) List L(17): Tree 1. Subtrees: (1,1) (1,1) (14,4); (sigma,sigma_0): (1488033868001,899576649441) Tree 2. Subtrees: (1,1) (1,1) (14,3); (sigma,sigma_0): (1484997687329,923866094817) Tree 3. Subtrees: (4,1) (4,1) (8,1); (sigma,sigma_0): (1444524727802,1199459745149) Tree 4. Subtrees: (0,1) (0,1) (16,1); (sigma,sigma_0): (1420235282426,1234043740616) List L(18): Tree 1. Subtrees: (1,1) (1,1) (15,4); (sigma,sigma_0): (7336882358451,4459786558515) Tree 2. Subtrees: (1,1) (1,1) (15,3); (sigma,sigma_0): (7304053004019,4722421393971) Tree 3. Subtrees: (4,1) (4,1) (9,2); (sigma,sigma_0): (7199085533285,5562161159843) Tree 4. Subtrees: (0,1) (4,1) (13,2); (sigma,sigma_0): (7098570966629,5705276626820) Tree 5. Subtrees: (0,1) (0,1) (17,2); (sigma,sigma_0): (6863856844133,5939990749316) Tree 6. Subtrees: (0,1) (0,1) (17,1); (sigma,sigma_0): (6851712121445,5952135472004) List L(19): Tree 1. Subtrees: (1,1) (1,1) (16,2); (sigma,sigma_0): (37193452135506,22686924049938) Tree 2. Subtrees: (1,1) (1,1) (16,1); (sigma,sigma_0): (36905644423314,24989385747474) Tree 3. Subtrees: (1,1) (4,1) (13,2); (sigma,sigma_0): (36820099539162,25673744820690) Tree 4. Subtrees: (4,1) (4,1) (10,2); (sigma,sigma_0): (35260502553306,27894342872817) Tree 5. Subtrees: (0,1) (0,1) (18,3); (sigma,sigma_0): (34358503292983,28796342133140) Tree 6. Subtrees: (0,1) (0,1) (18,2); (sigma,sigma_0): (33938633410047,29216212016076) Tree 7. Subtrees: (0,1) (0,1) (18,1); (sigma,sigma_0): (33807315992319,29347529433804) List L(20): Tree 1. Subtrees: (1,1) (1,1) (17,4); (sigma,sigma_0): (194017857275930,115039057876506) Tree 2. Subtrees: (1,1) (1,1) (17,3); (sigma,sigma_0): (193771926641498,117006502951962) Tree 3. Subtrees: (1,1) (5,2) (13,2); (sigma,sigma_0): (193675677739322,117776494169370) Tree 4. Subtrees: (4,1) (4,1) (11,3); (sigma,sigma_0): (176303387611962,142511649448365) Tree 5. Subtrees: (0,1) (0,1) (19,3); (sigma,sigma_0): (172954142977338,147280398156648) Tree 6. Subtrees: (0,1) (0,1) (19,2); (sigma,sigma_0): (172611963440730,147622577693256) Tree 7. Subtrees: (0,1) (0,1) (19,1); (sigma,sigma_0): (171460732591962,148773808542024) List L(21): Tree 1. Subtrees: (1,1) (1,1) (18,4); (sigma,sigma_0): (940121952413429,574984248296949) Tree 2. Subtrees: (1,1) (1,1) (18,3); (sigma,sigma_0): (939104242426037,583125928196085) Tree 3. Subtrees: (4,1) (4,1) (12,1); (sigma,sigma_0): (909599454930854,754131788227091) Tree 4. Subtrees: (0,1) (4,1) (16,1); (sigma,sigma_0): (901457775031718,765724141052228) Tree 5. Subtrees: (0,1) (0,1) (20,3); (sigma,sigma_0): (892479205126658,774702710957288) Tree 6. Subtrees: (0,1) (0,1) (20,2); (sigma,sigma_0): (892094209517954,775087706565992) Tree 7. Subtrees: (0,1) (0,1) (20,1); (sigma,sigma_0): (891110486980226,776071429103720) List L(22): Tree 1. Subtrees: (1,1) (1,1) (19,4); (sigma,sigma_0): (4641338650678074,2856100706817786) Tree 2. Subtrees: (1,1) (1,1) (19,3); (sigma,sigma_0): (4625547731196282,2982428062672122) Tree 3. Subtrees: (4,1) (4,1) (13,2); (sigma,sigma_0): (4555835720662571,3540124146941810) Tree 4. Subtrees: (0,1) (0,1) (21,2); (sigma,sigma_0): (4339542897900233,3756416969704148) Tree 5. Subtrees: (0,1) (0,1) (21,1); (sigma,sigma_0): (4335472057950665,3760487809653716) List L(23): Tree 1. Subtrees: (1,1) (1,1) (20,5); (sigma,sigma_0): (23435231063189850,14009285581164378) Tree 2. Subtrees: (1,1) (1,1) (20,4); (sigma,sigma_0): (23401319961264282,14280574396568922) Tree 3. Subtrees: (1,1) (1,1) (20,3); (sigma,sigma_0): (23225425523724762,15687729896885082) Tree 4. Subtrees: (4,1) (5,2) (13,2); (sigma,sigma_0): (23156383021055006,16240069918243130) Tree 5. Subtrees: (4,1) (4,1) (14,3); (sigma,sigma_0): (22225290650877470,17565785421874817) Tree 6. Subtrees: (0,1) (0,1) (22,3); (sigma,sigma_0): (21763467029592094,18223342882650284) Tree 7. Subtrees: (0,1) (0,1) (22,2); (sigma,sigma_0): (21484618987457250,18502190924785128) Tree 8. Subtrees: (0,1) (0,1) (22,1); (sigma,sigma_0): (21421455309530082,18565354602712296) List L(24): Tree 1. Subtrees: (1,1) (1,1) (21,4); (sigma,sigma_0): (122024424804911750,73018079777569158) Tree 2. Subtrees: (1,1) (1,1) (21,3); (sigma,sigma_0): (121941990295932998,73677555849399174) Tree 3. Subtrees: (1,1) (9,2) (13,2); (sigma,sigma_0): (121812102402446486,74716658997291270) Tree 4. Subtrees: (4,1) (4,1) (15,3); (sigma,sigma_0): (111226294225463958,89789030405533971) Tree 5. Subtrees: (0,1) (4,1) (19,3); (sigma,sigma_0): (110103647030483094,91387487056200084) Tree 6. Subtrees: (0,1) (0,1) (23,4); (sigma,sigma_0): (108865602002463154,92625532084220024) Tree 7. Subtrees: (0,1) (0,1) (23,3); (sigma,sigma_0): (108589431991784130,92901702094899048) Tree 8. Subtrees: (0,1) (0,1) (23,2); (sigma,sigma_0): (107885854241626050,93605279845057128) Tree 9. Subtrees: (0,1) (0,1) (23,1); (sigma,sigma_0): (107750209833923778,93740924252759400) List L(25): Tree 1. Subtrees: (1,1) (1,1) (22,3); (sigma,sigma_0): (595590638777944091,369022693373668251) Tree 2. Subtrees: (4,1) (4,1) (16,1); (sigma,sigma_0): (574081648693955684,475131829522907474) Tree 3. Subtrees: (0,1) (0,1) (24,3); (sigma,sigma_0): (561965068607077214,487248409609785944) Tree 4. Subtrees: (0,1) (0,1) (24,2); (sigma,sigma_0): (561445517033131166,487767961183731992) Tree 5. Subtrees: (0,1) (0,1) (24,1); (sigma,sigma_0): (561115778997216158,488097699219647000) List L(26): Tree 1. Subtrees: (1,1) (1,1) (23,6); (sigma,sigma_0): (2929134773886577790,1762840829396959614) Tree 2. Subtrees: (1,1) (1,1) (23,5); (sigma,sigma_0): (2924458809721063358,1800248542721075070) Tree 3. Subtrees: (1,1) (1,1) (23,4); (sigma,sigma_0): (2915031499473015806,1875667024705455486) Tree 4. Subtrees: (4,1) (8,1) (13,2); (sigma,sigma_0): (2864211443793940487,2221717444994796890) Tree 5. Subtrees: (4,1) (4,1) (17,3); (sigma,sigma_0): (2862127173739761671,2224685087318031962) Tree 6. Subtrees: (0,1) (0,1) (25,1); (sigma,sigma_0): (2751385248485444615,2382362555111776364) List L(27): Tree 1. Subtrees: (1,1) (1,1) (24,5); (sigma,sigma_0): (14767194581065935990,8918395409469130614) Tree 2. Subtrees: (1,1) (1,1) (24,4); (sigma,sigma_0): (14755827778216754742,9009329832262580598) Tree 3. Subtrees: (1,1) (1,1) (24,3); (sigma,sigma_0): (14648646470424806646,9866780294598165366) Tree 4. Subtrees: (4,1) (9,2) (13,2); (sigma,sigma_0): (14594169370921265288,10302597090626496230) Tree 5. Subtrees: (4,1) (4,1) (18,3); (sigma,sigma_0): (14043135336135219848,11087174847187096085) Tree 6. Subtrees: (0,1) (4,1) (22,3); (sigma,sigma_0): (13888334761805080712,11307584258684501222) Tree 7. Subtrees: (0,1) (0,1) (26,3); (sigma,sigma_0): (13535793022597518710,11660125997892063224) Tree 8. Subtrees: (0,1) (0,1) (26,2); (sigma,sigma_0): (13498083781605328502,11697835238884253432) Tree 9. Subtrees: (0,1) (0,1) (26,1); (sigma,sigma_0): (13479379924943270774,11716539095546311160) List L(28): Tree 1. Subtrees: (1,1) (1,1) (25,2); (sigma,sigma_0): (76909050633676488740,46500613544210410404) Tree 2. Subtrees: (1,1) (13,2) (13,2); (sigma,sigma_0): (76777304582946792428,47554581950047980900) Tree 3. Subtrees: (4,1) (4,1) (19,3); (sigma,sigma_0): (70350016339624466412,56705935718372152122) Tree 4. Subtrees: (0,1) (0,1) (27,4); (sigma,sigma_0): (68679274574311557382,58376677483685061152) Tree 5. Subtrees: (0,1) (0,1) (27,3); (sigma,sigma_0): (68461366176297391950,58594585881699226584) Tree 6. Subtrees: (0,1) (0,1) (27,2); (sigma,sigma_0): (68032640945129599566,59023311112867018968) Tree 7. Subtrees: (0,1) (0,1) (27,1); (sigma,sigma_0): (67987173733732874574,59068778324263743960) List L(29): Tree 1. Subtrees: (1,1) (1,1) (26,6); (sigma,sigma_0): (375333408654474701111,222862205127321013815) Tree 2. Subtrees: (1,1) (1,1) (26,5); (sigma,sigma_0): (374212146661274740919,231832301072920695351) Tree 3. Subtrees: (1,1) (1,1) (26,4); (sigma,sigma_0): (374191043426976180407,232001126947309179447) Tree 4. Subtrees: (1,1) (5,2) (22,3); (sigma,sigma_0): (374012764942941309047,233427354819588150327) Tree 5. Subtrees: (4,1) (4,1) (20,3); (sigma,sigma_0): (360867489286316927252,298276231448452765082) Tree 6. Subtrees: (0,1) (0,1) (28,2); (sigma,sigma_0): (354663800281835150612,307109218331787169712) Tree 7. Subtrees: (0,1) (0,1) (28,1); (sigma,sigma_0): (354136816078916365364,307636202534705954960) List L(30): Tree 1. Subtrees: (1,1) (1,1) (27,6); (sigma,sigma_0): (1848640508262019615880,1124955115706211537672) Tree 2. Subtrees: (1,1) (1,1) (27,5); (sigma,sigma_0): (1847073152446926957128,1137493962226952807688) Tree 3. Subtrees: (1,1) (1,1) (27,4); (sigma,sigma_0): (1841493932844718247048,1182127719044622488328) Tree 4. Subtrees: (4,1) (12,1) (13,2); (sigma,sigma_0): (1804446112254672339497,1396852004834158829510) Tree 5. Subtrees: (4,1) (4,1) (21,3); (sigma,sigma_0): (1801633389816558027305,1400856838149364559174) Tree 6. Subtrees: (0,1) (4,1) (25,1); (sigma,sigma_0): (1747273508916261388841,1478255965446857233862) Tree 7. Subtrees: (0,1) (0,1) (29,4); (sigma,sigma_0): (1729478414591353386515,1496051059771765236188) Tree 8. Subtrees: (0,1) (0,1) (29,3); (sigma,sigma_0): (1728765300655213901075,1496764173707904721628) Tree 9. Subtrees: (0,1) (0,1) (29,2); (sigma,sigma_0): (1728680887718019659027,1496848586645098963676) Tree 10. Subtrees: (0,1) (0,1) (29,1); (sigma,sigma_0): (1724195839745219818259,1501333634617898804444) List L(31): Tree 1. Subtrees: (1,1) (1,1) (28,3); (sigma,sigma_0): (9327531209485399515180,5698351323509581779372) Tree 2. Subtrees: (1,1) (1,1) (28,2); (sigma,sigma_0): (9262454916021760964268,6218961671218690186668) Tree 3. Subtrees: (4,1) (13,2) (13,2); (sigma,sigma_0): (9220169066590631344589,6557248466667727144100) Tree 4. Subtrees: (4,1) (4,1) (22,3); (sigma,sigma_0): (8897723149288635456461,7016356032513733008251) Tree 5. Subtrees: (0,1) (0,1) (30,3); (sigma,sigma_0): (8548103450423495476520,7365975731378872988192) Tree 6. Subtrees: (0,1) (0,1) (30,2); (sigma,sigma_0): (8525786572014660636200,7388292609787707828512) Tree 7. Subtrees: (0,1) (0,1) (30,1); (sigma,sigma_0): (8519517148754290001192,7394562033048078463520) List L(32): Tree 1. Subtrees: (1,1) (1,1) (29,6); (sigma,sigma_0): (48382757796063026061140,28727767822828647199572) Tree 2. Subtrees: (1,1) (1,1) (29,5); (sigma,sigma_0): (48319945444892648072660,29230266632191671107412) Tree 3. Subtrees: (5,2) (13,2) (13,2); (sigma,sigma_0): (48213614398338507582424,30080915004624795029300) Tree 4. Subtrees: (4,1) (4,1) (23,4); (sigma,sigma_0): (44293344516870461945816,35662705519449414695486) Tree 5. Subtrees: (0,1) (0,1) (31,3); (sigma,sigma_0): (43437924733030252522456,36880676266362525378356) Tree 6. Subtrees: (0,1) (0,1) (31,2); (sigma,sigma_0): (43268781335305734043740,37049819664087043857072) Tree 7. Subtrees: (0,1) (0,1) (31,1); (sigma,sigma_0): (43008476161451179840092,37310124837941598060720) List L(33): Tree 1. Subtrees: (1,1) (1,1) (30,6); (sigma,sigma_0): (236137536010816035463289,141529154222217172496121) Tree 2. Subtrees: (1,1) (1,1) (30,5); (sigma,sigma_0): (235587142216700531998841,145932304575141200211705) Tree 3. Subtrees: (1,1) (1,1) (30,4); (sigma,sigma_0): (235558663402014624587897,146160135092628459499257) Tree 4. Subtrees: (1,1) (9,2) (22,3); (sigma,sigma_0): (235318076587809565687577,148084829606268930701817) Tree 5. Subtrees: (4,1) (4,1) (24,3); (sigma,sigma_0): (227308000454241656425436,187600504480062186605366) Tree 6. Subtrees: (0,1) (4,1) (28,2); (sigma,sigma_0): (225228560216458916882396,190561269974873938806296) Tree 7. Subtrees: (0,1) (0,1) (32,3); (sigma,sigma_0): (222935372597978825358996,192854457593354030329696) Tree 8. Subtrees: (0,1) (0,1) (32,2); (sigma,sigma_0): (222510048411762263398052,193279781779570592290640) Tree 9. Subtrees: (0,1) (0,1) (32,1); (sigma,sigma_0): (222258799007080751444132,193531031184252104244560) List L(34): Tree 1. Subtrees: (1,1) (1,1) (31,4); (sigma,sigma_0): (1169762361173258384501405,720715575092379471973341) Tree 2. Subtrees: (1,1) (1,1) (31,3); (sigma,sigma_0): (1166497596260575676134109,746833694393841138911709) Tree 3. Subtrees: (4,1) (13,2) (16,1); (sigma,sigma_0): (1139489735050432209529430,880070113726248438615140) Tree 4. Subtrees: (4,1) (4,1) (25,2); (sigma,sigma_0): (1136636774215719434660438,884132239602235963770404) Tree 5. Subtrees: (4,1) (4,1) (25,1); (sigma,sigma_0): (1113371615748970542591062,917257826559774913611371) Tree 6. Subtrees: (0,1) (0,1) (33,4); (sigma,sigma_0): (1089357135957507193452125,941272306351238262750308) Tree 7. Subtrees: (0,1) (0,1) (33,3); (sigma,sigma_0): (1088394788700686957850845,942234653608058498351588) Tree 8. Subtrees: (0,1) (0,1) (33,2); (sigma,sigma_0): (1088280873441943328207069,942348568866802127995364) Tree 9. Subtrees: (0,1) (0,1) (33,1); (sigma,sigma_0): (1086079298265481314349277,944550144043264141853156) List L(35): Tree 1. Subtrees: (1,1) (1,1) (32,5); (sigma,sigma_0): (5878835184422652078533720,3518471903375450454318936) Tree 2. Subtrees: (1,1) (1,1) (32,4); (sigma,sigma_0): (5870174059111269958122200,3587760905866507417611096) Tree 3. Subtrees: (1,1) (1,1) (32,3); (sigma,sigma_0): (5830481326561405996051544,3905302766265419114176344) Tree 4. Subtrees: (8,1) (13,2) (13,2); (sigma,sigma_0): (5799654942326112503305553,4115209722841546546262900) Tree 5. Subtrees: (4,1) (4,1) (26,4); (sigma,sigma_0): (5591829365255095513177937,4411117624569615659159447) Tree 6. Subtrees: (0,1) (0,1) (34,2); (sigma,sigma_0): (5412824079436143843448145,4665990385042302704536436) Tree 7. Subtrees: (0,1) (0,1) (34,1); (sigma,sigma_0): (5399765019785413009978961,4679049444693033538005620) List L(36): Tree 1. Subtrees: (1,1) (1,1) (33,6); (sigma,sigma_0): (30439434655925104351077020,18243513377533172267474076) Tree 2. Subtrees: (1,1) (1,1) (33,5); (sigma,sigma_0): (30418380323517554113203740,18411948036793574170460316) Tree 3. Subtrees: (9,2) (13,2) (13,2); (sigma,sigma_0): (30334481177637040635033742,19083141203837681995820300) Tree 4. Subtrees: (4,1) (4,1) (27,4); (sigma,sigma_0): (27951425459377428948975758,22476202958937793166008328) Tree 5. Subtrees: (0,1) (4,1) (31,3); (sigma,sigma_0): (27664693755478720085318798,22884459623277946997269898) Tree 6. Subtrees: (0,1) (0,1) (35,3); (sigma,sigma_0): (27227228072511043098382520,23321925306245623984206176) Tree 7. Subtrees: (0,1) (0,1) (35,2); (sigma,sigma_0): (27068457142311587250099896,23480696236445079832488800) Tree 8. Subtrees: (0,1) (0,1) (35,1); (sigma,sigma_0): (27033812641066058768453816,23515340737690608314134880) List L(37): Tree 1. Subtrees: (1,1) (1,1) (34,5); (sigma,sigma_0): (148887601775492208421003766,90183100875666613949876022) Tree 2. Subtrees: (1,1) (1,1) (34,4); (sigma,sigma_0): (148652042046016375888801334,92067578711473274207495478) Tree 3. Subtrees: (1,1) (1,1) (34,3); (sigma,sigma_0): (148623155817564909043252790,92298668539085008971883830) Tree 4. Subtrees: (1,1) (13,2) (22,3); (sigma,sigma_0): (148379127203516693925174470,94250897451470729916510390) Tree 5. Subtrees: (4,1) (4,1) (28,2); (sigma,sigma_0): (143515722605524728046783568,118243268019409279029306668) Tree 6. Subtrees: (0,1) (0,1) (36,3); (sigma,sigma_0): (140421065914385844535955268,121337924710548162540134968) Tree 7. Subtrees: (0,1) (0,1) (36,2); (sigma,sigma_0): (140085469330863790623275276,121673521294070216452814960) Tree 8. Subtrees: (0,1) (0,1) (36,1); (sigma,sigma_0): (140001252001233589671782156,121757738623700417404308080) List L(38): Tree 1. Subtrees: (1,1) (1,1) (35,6); (sigma,sigma_0): (737062135077035024409631649,438438750434327651319299745) Tree 2. Subtrees: (1,1) (1,1) (35,5); (sigma,sigma_0): (735249706558118138753617505,452938178585662736567412897) Tree 3. Subtrees: (1,1) (1,1) (35,4); (sigma,sigma_0): (733145472590274091728575393,469772050328415112767749793) Tree 4. Subtrees: (1,1) (5,2) (31,3); (sigma,sigma_0): (732815253573212958549205793,472413802464904178202706593) Tree 5. Subtrees: (4,1) (13,2) (20,3); (sigma,sigma_0): (716583981383569103696358350,552486658694838191716908020) Tree 6. Subtrees: (4,1) (4,1) (29,5); (sigma,sigma_0): (714281382484757445567130574,555765163767560259639187412) Tree 7. Subtrees: (4,1) (4,1) (29,4); (sigma,sigma_0): (700062819918766740376344014,576009953046089994178412807) Tree 8. Subtrees: (0,1) (0,1) (37,4); (sigma,sigma_0): (687767406265537505617208270,593516508814066775700697880) Tree 9. Subtrees: (0,1) (0,1) (37,3); (sigma,sigma_0): (686791291809344645144894990,594492623270259636173011160) Tree 10. Subtrees: (0,1) (0,1) (37,2); (sigma,sigma_0): (686675746895538777762700814,594608168184065503555205336) Tree 11. Subtrees: (0,1) (0,1) (37,1); (sigma,sigma_0): (685733507977635447633891086,595550407101968833684015064) List L(39): Tree 1. Subtrees: (1,1) (1,1) (36,5); (sigma,sigma_0): (3705445610083564934736096110,2240840194193776326910822638) Tree 2. Subtrees: (1,1) (1,1) (36,4); (sigma,sigma_0): (3702542451581590507491569390,2264065462209571744867036398) Tree 3. Subtrees: (1,1) (1,1) (36,3); (sigma,sigma_0): (3678414012434211939170232302,2457092975388600291437733102) Tree 4. Subtrees: (12,1) (13,2) (13,2); (sigma,sigma_0): (3655941578326682982958404863,2587340241944087363047441100) Tree 5. Subtrees: (4,1) (4,1) (30,4); (sigma,sigma_0): (3521337599308358233798503167,2778993173007288031284879257) Tree 6. Subtrees: (0,1) (4,1) (34,2); (sigma,sigma_0): (3439688797131859018431494399,2895247033918748828164858538) Tree 7. Subtrees: (0,1) (0,1) (38,4); (sigma,sigma_0): (3403674816757756012399529765,2931261014292851834196823172) Tree 8. Subtrees: (0,1) (0,1) (38,3); (sigma,sigma_0): (3402353940689511479682051365,2932581890361096366914301572) Tree 9. Subtrees: (0,1) (0,1) (38,2); (sigma,sigma_0): (3393937004818135291581882917,2940998826232472555014470020) Tree 10. Subtrees: (0,1) (0,1) (38,1); (sigma,sigma_0): (3386687290742467748957826341,2948248540308140097638526596) List L(40): Tree 1. Subtrees: (1,1) (1,1) (37,5); (sigma,sigma_0): (19192342684289696829665095760,11624773531047502971789469008) Tree 2. Subtrees: (13,2) (13,2) (13,2); (sigma,sigma_0): (19127219051011953293860241761,12145762597269451258228301000) Tree 3. Subtrees: (4,1) (4,1) (31,3); (sigma,sigma_0): (17684597878618329692993619809,14199807196243966111805971709) Tree 4. Subtrees: (0,1) (0,1) (39,3); (sigma,sigma_0): (17170749025125448048118662310,14713656049736847756680929208) Tree 5. Subtrees: (0,1) (0,1) (39,2); (sigma,sigma_0): (17074235268535933774833313958,14810169806326362029966277560) Tree 6. Subtrees: (0,1) (0,1) (39,1); (sigma,sigma_0): (17062622634528036065855207078,14821782440334259738944384440) List L(41): Tree 1. Subtrees: (1,1) (1,1) (38,8); (sigma,sigma_0): (93694216471608811599838534190,55709159907508537954993869870) Tree 2. Subtrees: (1,1) (1,1) (38,7); (sigma,sigma_0): (93569725408369865597902284782,56705088413420105970483865134) Tree 3. Subtrees: (1,1) (1,1) (38,6); (sigma,sigma_0): (93425762462389209707845570862,57856791981265353090937576494) Tree 4. Subtrees: (1,1) (1,1) (38,5); (sigma,sigma_0): (93402448648538741669287139630,58043302492069097399405026350) Tree 5. Subtrees: (5,2) (13,2) (22,3); (sigma,sigma_0): (93205495360169283491230911670,59618928799024762823854850030) Tree 6. Subtrees: (4,1) (4,1) (32,3); (sigma,sigma_0): (90239103027180372791213357644,74252871476207567096047136344) Tree 7. Subtrees: (0,1) (0,1) (40,2); (sigma,sigma_0): (88654638801317264433669268044,76508876204047813175440967044) Tree 8. Subtrees: (0,1) (0,1) (40,1); (sigma,sigma_0): (88394144268206290290449852048,76769370737158787318660383040) List L(42): Tree 1. Subtrees: (1,1) (1,1) (39,6); (sigma,sigma_0): (463910602738480505495501992751,278614792567680580492951046319) Tree 2. Subtrees: (1,1) (1,1) (39,5); (sigma,sigma_0): (463083908616443450939911028975,285228345543977016937678756527) Tree 3. Subtrees: (1,1) (1,1) (39,4); (sigma,sigma_0): (461721043328882912854667024303,296131267844461321619630793903) Tree 4. Subtrees: (1,1) (9,2) (31,3); (sigma,sigma_0): (461275412765358913629107749103,299696312352653315424104995503) Tree 5. Subtrees: (4,1) (13,2) (24,3); (sigma,sigma_0): (451588168420606272834750344690,347485870350241152880821177260) Tree 6. Subtrees: (4,1) (4,1) (33,5); (sigma,sigma_0): (449771332348957672981084212722,350072732647568944469341900316) Tree 7. Subtrees: (4,1) (4,1) (33,4); (sigma,sigma_0): (441107248640215510534793602034,362408898709430343733689273737) Tree 8. Subtrees: (0,1) (4,1) (37,4); (sigma,sigma_0): (436985897961250596431419108850,368276993719128434322283034540) Tree 9. Subtrees: (0,1) (0,1) (41,5); (sigma,sigma_0): (432440910239701896788778496710,372821981440677133964923646680) Tree 10. Subtrees: (0,1) (0,1) (41,4); (sigma,sigma_0): (431653097086224064076553584870,373609794594154966677148558520) Tree 11. Subtrees: (0,1) (0,1) (41,3); (sigma,sigma_0): (431559841830822191922319859942,373703049849556838831382283448) Tree 12. Subtrees: (0,1) (0,1) (41,2); (sigma,sigma_0): (430983990046899568362093004262,374278901633479462391609139128) Tree 13. Subtrees: (0,1) (0,1) (41,1); (sigma,sigma_0): (430486025793943784354348006630,374776865886435246399354136760) List L(43): Tree 1. Subtrees: (1,1) (1,1) (40,3); (sigma,sigma_0): (2341240088727698536288065393905,1432452428168084705132483204529) Tree 2. Subtrees: (1,1) (1,1) (40,2); (sigma,sigma_0): (2326633549357213097329290846641,1549304743131968216802679582641) Tree 3. Subtrees: (13,2) (13,2) (16,1); (sigma,sigma_0): (2310251144892824488250868643610,1630123172029647944736503395400) Tree 4. Subtrees: (4,1) (4,1) (34,3); (sigma,sigma_0): (2222611831954995884150362700570,1754906490646204687684294083830) Tree 5. Subtrees: (4,1) (4,1) (34,2); (sigma,sigma_0): (2193398829928940976580672265498,1796500784546583647876294722829) Tree 6. Subtrees: (0,1) (0,1) (42,4); (sigma,sigma_0): (2144797963414088969940535991915,1845101651061435654516430996412) Tree 7. Subtrees: (0,1) (0,1) (42,3); (sigma,sigma_0): (2143015441159992973038298891115,1846884173315531651418668097212) Tree 8. Subtrees: (0,1) (0,1) (42,2); (sigma,sigma_0): (2137563980009750820697322872427,1852335634465773803759644115900) Tree 9. Subtrees: (0,1) (0,1) (42,1); (sigma,sigma_0): (2134257203521602602474959017323,1855642410953922021982007971004) List L(44): Tree 1. Subtrees: (1,1) (1,1) (41,7); (sigma,sigma_0): (12077593819965758462355432602380,7181025742906698419127210711564) Tree 2. Subtrees: (1,1) (1,1) (41,6); (sigma,sigma_0): (12061551119678894490235298695180,7309367345201610196088281969164) Tree 3. Subtrees: (13,2) (13,2) (17,3); (sigma,sigma_0): (12014075991019419452633560129909,7632641060792329107823577220200) Tree 4. Subtrees: (4,1) (4,1) (35,4); (sigma,sigma_0): (11118929553549176008295821208693,8931938383232541670203319369793) Tree 5. Subtrees: (0,1) (0,1) (43,2); (sigma,sigma_0): (10855838940560820606119842969205,9306534197428852389317163386564) Tree 6. Subtrees: (0,1) (0,1) (43,1); (sigma,sigma_0): (10797412783078878850284744780149,9364960354910794145152261575620) List L(45): Tree 1. Subtrees: (1,1) (1,1) (42,8); (sigma,sigma_0): (58965585332885518107571062027410,35395857734861298310944947816850) Tree 2. Subtrees: (1,1) (1,1) (42,7); (sigma,sigma_0): (58923856657260998352274395283922,35729687139857456353318281764754) Tree 3. Subtrees: (1,1) (1,1) (42,6); (sigma,sigma_0): (58836132809709983957505702850706,36431477920265571511467821230482) Tree 4. Subtrees: (1,1) (1,1) (42,5); (sigma,sigma_0): (58817737344484541883987333264530,36578641642069108099614777919890) Tree 5. Subtrees: (9,2) (13,2) (22,3); (sigma,sigma_0): (58662333883237290916180032253750,37821869332047115842073186006130) Tree 6. Subtrees: (4,1) (4,1) (36,3); (sigma,sigma_0): (56859121751045132735784136465402,46717558106536431178243400413102) Tree 7. Subtrees: (0,1) (4,1) (40,2); (sigma,sigma_0): (56328018618021098042609551479802,47473757684611668075361120050802) Tree 8. Subtrees: (0,1) (0,1) (44,2); (sigma,sigma_0): (55555571823917188157029476749884,48246204478715577960941194780720) Tree 9. Subtrees: (0,1) (0,1) (44,1); (sigma,sigma_0): (55491401022769732268548941121084,48310375279863033849421730409520) List L(46): Tree 1. Subtrees: (1,1) (1,1) (43,5); (sigma,sigma_0): (292641355435225572567117315766394,177665305224244219103034453505338) Tree 2. Subtrees: (1,1) (1,1) (43,4); (sigma,sigma_0): (292345573789711766627974200111290,180031558388354666616179378746170) Tree 3. Subtrees: (1,1) (1,1) (43,3); (sigma,sigma_0): (291458225746216252011456577438010,187130342736318783548320360132410) Tree 4. Subtrees: (1,1) (13,2) (31,3); (sigma,sigma_0): (291006220056903624814019687582810,190746388250819801127815478974010) Tree 5. Subtrees: (4,1) (13,2) (28,2); (sigma,sigma_0): (285275410516648290763518220507580,219017880653663201399579278859480) Tree 6. Subtrees: (4,1) (4,1) (37,5); (sigma,sigma_0): (283865158185542015351632249137596,221025837586039128695018484189008) Tree 7. Subtrees: (4,1) (4,1) (37,4); (sigma,sigma_0): (278604665795226249674536821104060,228515874602719193496976622932070) Tree 8. Subtrees: (0,1) (0,1) (45,5); (sigma,sigma_0): (272471204864996279506793315021130,234649335532949163664720129015000) Tree 9. Subtrees: (0,1) (0,1) (45,4); (sigma,sigma_0): (271849591020007275635564110978010,235270949377938167535949333058120) Tree 10. Subtrees: (0,1) (0,1) (45,3); (sigma,sigma_0): (271776009159105507341490632633306,235344531238839935830022811402824) Tree 11. Subtrees: (0,1) (0,1) (45,2); (sigma,sigma_0): (271425113768901449762415862900442,235695426629043993409097581135688) Tree 12. Subtrees: (0,1) (0,1) (45,1); (sigma,sigma_0): (271258199066403370741229195926490,235862341331542072430284248109640) List L(47): Tree 1. Subtrees: (1,1) (1,1) (44,5); (sigma,sigma_0): (1474941142820873022012005737245701,879322954185426469095707280505605) Tree 2. Subtrees: (1,1) (1,1) (44,4); (sigma,sigma_0): (1472277350364365923564973957570885,900633293837483256671961517904133) Tree 3. Subtrees: (1,1) (5,2) (40,2); (sigma,sigma_0): (1462353846779463899284279496420357,980021322516699450917517207108357) Tree 4. Subtrees: (13,2) (13,2) (20,3); (sigma,sigma_0): (1453570493143970620221247110334370,1023351765420630168862660292772200) Tree 5. Subtrees: (4,1) (4,1) (38,5); (sigma,sigma_0): (1397211437016631992234016579083170,1103597374633188488789791264026350) Tree 6. Subtrees: (4,1) (4,1) (38,4); (sigma,sigma_0): (1379654912134038527783644001379746,1128594848538287386415419406889233) Tree 7. Subtrees: (0,1) (0,1) (46,4); (sigma,sigma_0): (1354771268478434300383894229305250,1164024880227614499256078750331240) Tree 8. Subtrees: (0,1) (0,1) (46,3); (sigma,sigma_0): (1352963245721183791594146669884450,1165832902984865008045826309752040) Tree 9. Subtrees: (0,1) (0,1) (46,2); (sigma,sigma_0): (1349413853547201733128076179191330,1169382295158847066511896800445160) Tree 10. Subtrees: (0,1) (0,1) (46,1); (sigma,sigma_0): (1348230726965146509371503716570914,1170565421740902290268469263065576) List L(48): Tree 1. Subtrees: (1,1) (1,1) (45,7); (sigma,sigma_0): (7600889999874855698274485353115290,4562569508059708941451373669863962) Tree 2. Subtrees: (1,1) (1,1) (45,6); (sigma,sigma_0): (7595512580652987347006092680136090,4605588861834655751598515053697562) Tree 3. Subtrees: (13,2) (13,2) (21,3); (sigma,sigma_0): (7560903211860230044594425266053531,4806180202358696836330265756965400) Tree 4. Subtrees: (4,1) (4,1) (39,4); (sigma,sigma_0): (7005464847409943987382858265439003,5630446161890936255077563119813903) Tree 5. Subtrees: (0,1) (4,1) (43,2); (sigma,sigma_0): (6904147627247807737620453297108251,5774704469504602907571299881362962) Tree 6. Subtrees: (0,1) (0,1) (47,3); (sigma,sigma_0): (6829436709634555048054635192789785,5849415387117855597137117985681428) Tree 7. Subtrees: (0,1) (0,1) (47,2); (sigma,sigma_0): (6789742695294946950931857348187673,5889109401457463694259895830283540) Tree 8. Subtrees: (0,1) (0,1) (47,1); (sigma,sigma_0): (6779087525468918557143730229488409,5899764571283492088048022948982804) List L(49): Tree 1. Subtrees: (1,1) (1,1) (46,7); (sigma,sigma_0): (37191993903987354607443986377081340,22566977929413326223637482509428860) Tree 2. Subtrees: (1,1) (1,1) (46,6); (sigma,sigma_0): (37138731418535407479963395168241788,22993077813028903243482212180145276) Tree 3. Subtrees: (1,1) (1,1) (46,5); (sigma,sigma_0): (37124452613682956441418049708120700,23107308251848511551844975861113980) Tree 4. Subtrees: (13,2) (13,2) (22,3); (sigma,sigma_0): (37003826379480629635185852402525310,24072318125467126001702554305877100) Tree 5. Subtrees: (4,1) (4,1) (40,2); (sigma,sigma_0): (35912222863757014486885681503263641,29457466643301540040761574991522641) Tree 6. Subtrees: (0,1) (0,1) (48,2); (sigma,sigma_0): (34987639184446605139622885774241922,30382050322611949388024370720544360) Tree 7. Subtrees: (0,1) (0,1) (48,1); (sigma,sigma_0): (34966129507559131734549315082325122,30403559999499422793097941412461160) List L(50): Tree 1. Subtrees: (1,1) (1,1) (47,7); (sigma,sigma_0): (184234065081320506283484472594924610,109736472746753178331095432573725250) Tree 2. Subtrees: (1,1) (1,1) (47,6); (sigma,sigma_0): (183982118189307513481062006152670338,111752047882857120750475164111759426) Tree 3. Subtrees: (1,1) (1,1) (47,5); (sigma,sigma_0): (183804358374871254653501983803423170,113174126398347191370955342905736770) Tree 4. Subtrees: (1,1) (1,1) (47,4); (sigma,sigma_0): (183233722931581951045131274674504770,117739209944661620237921015937083970) Tree 5. Subtrees: (5,2) (13,2) (31,3); (sigma,sigma_0): (182868913225888026799584547197209170,120657687590213014202294835755448770) Tree 6. Subtrees: (4,1) (13,2) (32,3); (sigma,sigma_0): (179447572272895798148282984230909540,137536003660676452176182495919505840) Tree 7. Subtrees: (4,1) (4,1) (41,6); (sigma,sigma_0): (178436548299390201373755045239520868,138975528029202975708664659053729164) Tree 8. Subtrees: (4,1) (4,1) (41,5); (sigma,sigma_0): (175227955639667389268330639030438500,143544012499784870288458393675645270) Tree 9. Subtrees: (0,1) (0,1) (49,4); (sigma,sigma_0): (172087623643389644542445963915978340,148015305517922518540743409610101240) Tree 10. Subtrees: (0,1) (0,1) (49,3); (sigma,sigma_0): (171605118706580337317517174693596780,148497810454731825765672198832482800) Tree 11. Subtrees: (0,1) (0,1) (49,2); (sigma,sigma_0): (171548003487170533163335792853112428,148554925674141629919853580672967152) Tree 12. Subtrees: (0,1) (0,1) (49,1); (sigma,sigma_0): (171334953545362744653413428017754220,148767975615949418429775945508325360) List L(51): Tree 1. Subtrees: (1,1) (1,1) (48,5); (sigma,sigma_0): (928817043855367012831819909472997899,559235957807072426747256717065768331) Tree 2. Subtrees: (1,1) (1,1) (48,4); (sigma,sigma_0): (927791207001225383302975559168649035,567442652640205462978011519500559243) Tree 3. Subtrees: (1,1) (9,2) (40,2); (sigma,sigma_0): (921006626661672652179265777040871947,621719295356627311967689776522775947) Tree 4. Subtrees: (13,2) (13,2) (24,3); (sigma,sigma_0): (916563981486816105262977924236788670,643635956244975328142298804955568600) Tree 5. Subtrees: (4,1) (4,1) (42,5); (sigma,sigma_0): (880150596434178237801751632864751550,695482358009375729273615145600519890) Tree 6. Subtrees: (4,1) (4,1) (42,4); (sigma,sigma_0): (869672406900093151663131674261407166,710401498967086721060829891346297343) Tree 7. Subtrees: (0,1) (4,1) (46,4); (sigma,sigma_0): (861331555216082431810574348752587710,722277438181234796788396864580534420) Tree 8. Subtrees: (0,1) (0,1) (50,5); (sigma,sigma_0): (852133340493765121400633024544285450,731475652903552107198338188788836680) Tree 9. Subtrees: (0,1) (0,1) (50,4); (sigma,sigma_0): (850674101670989424418446114635103050,732934891726327804180525098698019080) Tree 10. Subtrees: (0,1) (0,1) (50,3); (sigma,sigma_0): (848391559897832209984963278119429450,735217433499485018614007935213692680) Tree 11. Subtrees: (0,1) (0,1) (50,2); (sigma,sigma_0): (847680520640087174674723188722440778,735928472757230053924248024610681352) Tree 12. Subtrees: (0,1) (0,1) (50,1); (sigma,sigma_0): (846672733072035203465033322953423690,736936260325282025133937890379698440) List L(52): Tree 1. Subtrees: (1,1) (1,1) (49,5); (sigma,sigma_0): (4794167917135616736046481001221803945,2908890051964318173437740201764354921) Tree 2. Subtrees: (13,2) (13,2) (25,2); (sigma,sigma_0): (4768937687285696662588375456355618434,3033356978759485666513791513142048400) Tree 3. Subtrees: (4,1) (4,1) (43,3); (sigma,sigma_0): (4424288182144294164088598132474303810,3557973893477686030689886031519532410) Tree 4. Subtrees: (4,1) (4,1) (43,2); (sigma,sigma_0): (4406568185322402425253824416464033602,3583204123327606104147991576385717921) Tree 5. Subtrees: (0,1) (0,1) (51,3); (sigma,sigma_0): (4305745802003317920684752884686263735,3684026506646690608717063108163487788) Tree 6. Subtrees: (0,1) (0,1) (51,2); (sigma,sigma_0): (4278607480645106996189913756175155383,3711164828004901533211902236674596140) Tree 7. Subtrees: (0,1) (0,1) (51,1); (sigma,sigma_0): (4274504133228540478074536354957759927,3715268175421468051327279637891991596) List L(53): Tree 1. Subtrees: (1,1) (1,1) (50,9); (sigma,sigma_0): (23412077068261602394545701292240724900,13939097515114561207938123077194245540) Tree 2. Subtrees: (1,1) (1,1) (50,8); (sigma,sigma_0): (23380281206799290229196118956706815780,14193464406813058530734781761465518500) Tree 3. Subtrees: (1,1) (1,1) (50,7); (sigma,sigma_0): (23347794206119596756628696843839856804,14453360412250606311274158664401190308) Tree 4. Subtrees: (1,1) (1,1) (50,6); (sigma,sigma_0): (23337557588387852589286601461552046500,14535253354104559650010921722703672740) Tree 5. Subtrees: (13,2) (13,2) (26,4); (sigma,sigma_0): (23249621063654356347543329625773007190,15134041980684909916147549147679188700) Tree 6. Subtrees: (4,1) (8,1) (40,2); (sigma,sigma_0): (22569961518880101086819883814172092429,18486969611874210417732712884023035429) Tree 7. Subtrees: (4,1) (4,1) (44,3); (sigma,sigma_0): (22558948564313714703422215619910690829,18502650166325178530031345918430382629) Tree 8. Subtrees: (0,1) (0,1) (52,1); (sigma,sigma_0): (22085561720506785117623664206651570701,19176671668542466944185924004887215780) List L(54): Tree 1. Subtrees: (1,1) (1,1) (51,7); (sigma,sigma_0): (115993612016101703971113921582113807390,69767855972502676976656522248959604510) Tree 2. Subtrees: (1,1) (1,1) (51,6); (sigma,sigma_0): (115909160892801095432606778661337010398,70443464958907545284713665615173980446) Tree 3. Subtrees: (1,1) (1,1) (51,5); (sigma,sigma_0): (115803069223768483935453251580478148510,71292198311168437261941882262044875550) Tree 4. Subtrees: (1,1) (1,1) (51,4); (sigma,sigma_0): (115434383700110525527408335380336272670,74241682500432104526301211863179882270) Tree 5. Subtrees: (9,2) (13,2) (31,3); (sigma,sigma_0): (115146535289805850451354017872831376870,76544469782869505134735751923219048670) Tree 6. Subtrees: (4,1) (13,2) (36,3); (sigma,sigma_0): (113121735849824866839829619523221402920,86533303224741918206266289137321080220) Tree 7. Subtrees: (4,1) (4,1) (45,6); (sigma,sigma_0): (112395278883167166590656019630712117544,87567653085471339068859168671772777562) Tree 8. Subtrees: (4,1) (4,1) (45,5); (sigma,sigma_0): (110444837888922421521708676297671287080,90344745829229970231481460253387553750) Tree 9. Subtrees: (0,1) (4,1) (49,4); (sigma,sigma_0): (109392216987336457609772447752052225320,91843497073870922754531285663067819420) Tree 10. Subtrees: (0,1) (0,1) (53,4); (sigma,sigma_0): (107885483707655970007157327568911858740,93350230353551410357146405846208186000) Tree 11. Subtrees: (0,1) (0,1) (53,3); (sigma,sigma_0): (107844537236728993337788946039760617524,93391176824478387026514787375359427216) Tree 12. Subtrees: (0,1) (0,1) (53,2); (sigma,sigma_0): (107714589234010219447519257588292781620,93521124827197160916784475826827263120) Tree 13. Subtrees: (0,1) (0,1) (53,1); (sigma,sigma_0): (107587405788160970786120928246157145140,93648308273046409578182805168962899600) List L(55): Tree 1. Subtrees: (1,1) (1,1) (52,4); (sigma,sigma_0): (586257086904081387111031238622272668706,356932023011114596445559777733586721762) Tree 2. Subtrees: (1,1) (1,1) (52,3); (sigma,sigma_0): (586077671936259733255329154747668682850,358367342753687827291176448730418608610) Tree 3. Subtrees: (1,1) (13,2) (40,2); (sigma,sigma_0): (581410723035394036326121399448138515490,395702933960613402724838491126659947490) Tree 4. Subtrees: (13,2) (13,2) (28,2); (sigma,sigma_0): (579388475080495515833718795256900879700,405679180299281961908936598483645402800) Tree 5. Subtrees: (4,1) (4,1) (46,5); (sigma,sigma_0): (555742321016353641702363716093895224660,439347239503890216287369904557534313980) Tree 6. Subtrees: (4,1) (4,1) (46,4); (sigma,sigma_0): (549543601709860117338367640433648456020,448173150391456191407200254472221607610) Tree 7. Subtrees: (0,1) (0,1) (54,5); (sigma,sigma_0): (537130610942092906940151823414544556150,460586141159223401805416071491325507480) Tree 8. Subtrees: (0,1) (0,1) (54,4); (sigma,sigma_0): (535979217300874206635934553384524972950,461737534800442102109633341521345090680) Tree 9. Subtrees: (0,1) (0,1) (54,3); (sigma,sigma_0): (534504475206242373003754888583957469590,463212276895073935741813006321912594040) Tree 10. Subtrees: (0,1) (0,1) (54,2); (sigma,sigma_0): (534080108530111927015140780260522022038,463636643571204381730427114645348041592) Tree 11. Subtrees: (0,1) (0,1) (54,1); (sigma,sigma_0): (533742304036909492861112208577414834070,463974448064406815884455686328455229560) List L(56): Tree 1. Subtrees: (1,1) (1,1) (53,8); (sigma,sigma_0): (3016237486147767478955415937051559036701,1788930499361049594527516800738777226781) Tree 2. Subtrees: (1,1) (1,1) (53,7); (sigma,sigma_0): (3011444444354222316899205603992310445405,1827274833709410890977199465212765957149) Tree 3. Subtrees: (1,1) (1,1) (53,6); (sigma,sigma_0): (3011332938189237654767304213525413754205,1828166883029288188032410588947939486749) Tree 4. Subtrees: (1,1) (5,2) (49,5); (sigma,sigma_0): (3009849478209108909363285329246066293309,1840034562870318151264561663182719173917) Tree 5. Subtrees: (13,2) (13,2) (29,5); (sigma,sigma_0): (2996322402158804784650611349050373348362,1906766954708246675288235571694976165200) Tree 6. Subtrees: (4,1) (4,1) (47,4); (sigma,sigma_0): (2782467384218564534331499519582017624170,2238616298651659416760958470930866883970) Tree 7. Subtrees: (4,1) (4,1) (47,3); (sigma,sigma_0): (2772966886361560814368688713189432181354,2252143374701963541473632451126559828917) Tree 8. Subtrees: (0,1) (0,1) (55,3); (sigma,sigma_0): (2721345826102189548029324088919214009450,2325642892141576145304485597792554061960) Tree 9. Subtrees: (0,1) (0,1) (55,2); (sigma,sigma_0): (2702678030498726760312493067721093340010,2344310687745038933021316618990674731400) Tree 10. Subtrees: (0,1) (0,1) (55,1); (sigma,sigma_0): (2701960370627440144889684732222677396586,2345028347616325548444124954489090674824) List L(57): Tree 1. Subtrees: (1,1) (1,1) (54,9); (sigma,sigma_0): (14738753388701992122681570550352570693800,8860769575974253066391568267916230250920) Tree 2. Subtrees: (1,1) (1,1) (54,8); (sigma,sigma_0): (14728095602073434238073216236328177693480,8946031869002716143258402780111374253480) Tree 3. Subtrees: (1,1) (1,1) (54,7); (sigma,sigma_0): (14708347387006706194250124385081139285032,9104017589536540493843137590087681521064) Tree 4. Subtrees: (1,1) (1,1) (54,6); (sigma,sigma_0): (14700992010219296979227241686169482770600,9162860603835814214026199181380933636520) Tree 5. Subtrees: (13,2) (13,2) (30,4); (sigma,sigma_0): (14636886283688578218996396517886563113610,9534408946628921554163976498578241289700) Tree 6. Subtrees: (4,1) (12,1) (40,2); (sigma,sigma_0): (14213466574533961577100373050472198676611,11623242471193333479762021778236273029611) Tree 7. Subtrees: (4,1) (4,1) (48,3); (sigma,sigma_0): (14198604592346623152705219822316437217411,11644403379424914947309027058168988076011) Tree 8. Subtrees: (0,1) (4,1) (52,1); (sigma,sigma_0): (14019705618212588687303478452118732128899,11899124770330600738867365845032517391490) Tree 9. Subtrees: (0,1) (0,1) (56,4); (sigma,sigma_0): (13879432475706753788717702980166984347153,12039397912836435637453141316984265173236) Tree 10. Subtrees: (0,1) (0,1) (56,3); (sigma,sigma_0): (13873498635786238807101627443049594503569,12045331752756950619069216854101655016820) Tree 11. Subtrees: (0,1) (0,1) (56,2); (sigma,sigma_0): (13873052611126300158574021881182007738769,12045777777416889267596822415969241781620) Tree 12. Subtrees: (0,1) (0,1) (56,1); (sigma,sigma_0): (13853880443952119510349180548945013373585,12064949944591069915821663748206236146804) List L(58): Tree 1. Subtrees: (1,1) (1,1) (55,6); (sigma,sigma_0): (73196113363551865754468595161347707824660,44513031738498669504407778875125524937620) Tree 2. Subtrees: (1,1) (1,1) (55,5); (sigma,sigma_0): (73133351330573618820283134895287709292180,45015128002324644977891461003605513197460) Tree 3. Subtrees: (1,1) (1,1) (55,4); (sigma,sigma_0): (72893934020674182344703164718762277034900,46930466481520136782531222415808971255700) Tree 4. Subtrees: (13,2) (13,2) (31,3); (sigma,sigma_0): (72670502254885288645457574909737959687000,48717920607831286376495940888003510038900) Tree 5. Subtrees: (4,1) (13,2) (40,2); (sigma,sigma_0): (71485660173341744434864079186148622824010,54563037893902359197947174165353888315010) Tree 6. Subtrees: (4,1) (4,1) (49,5); (sigma,sigma_0): (70962637630620580368779759430297555350602,55307732100237766627977387255227771494921) Tree 7. Subtrees: (4,1) (4,1) (49,4); (sigma,sigma_0): (69781906751253282478657469916803213851210,56988889934336907569186662753933581950110) Tree 8. Subtrees: (0,1) (0,1) (57,4); (sigma,sigma_0): (67966828644713002130935165926058864718920,58803968040877187916908966744677931082400) Tree 9. Subtrees: (0,1) (0,1) (57,3); (sigma,sigma_0): (67937407137563365270843635130412238661192,58833389548026824777000497540324557140128) Tree 10. Subtrees: (0,1) (0,1) (57,2); (sigma,sigma_0): (67858414277296453095551267725424085027400,58912382408293736952292864945312710773920) Tree 11. Subtrees: (0,1) (0,1) (57,1); (sigma,sigma_0): (67815783130782221557117850469326513026120,58955013554807968490726282201410282775200) List L(59): Tree 1. Subtrees: (1,1) (1,1) (56,8); (sigma,sigma_0): (369270157011338226689862329461179794730890,220429011914277353390375251202456334765450) Tree 2. Subtrees: (1,1) (1,1) (56,7); (sigma,sigma_0): (368747493776212092618176262640443835740362,224610317795286425963863785768344006689674) Tree 3. Subtrees: (1,1) (1,1) (56,6); (sigma,sigma_0): (368651301235409929953552803225718908131850,225379858121703727280851461086143427557770) Tree 4. Subtrees: (5,2) (13,2) (40,2); (sigma,sigma_0): (365535772347320505562096659056152460450730,250304089226419122412500614442675009006730) Tree 5. Subtrees: (13,2) (13,2) (32,3); (sigma,sigma_0): (364633921355916733085994308219489439743700,254753141890422426142240414193917947522400) Tree 6. Subtrees: (4,1) (4,1) (50,6); (sigma,sigma_0): (349456067875047188128968408451281498388180,276363796553613633708005806637323395272740) Tree 7. Subtrees: (4,1) (4,1) (50,5); (sigma,sigma_0): (345755380900469252682212738840736545520340,281632938749838858201530969032025095742770) Tree 8. Subtrees: (0,1) (0,1) (58,4); (sigma,sigma_0): (339399929627372440958326240526955348786900,290682009019541154581830299638951838748000) Tree 9. Subtrees: (0,1) (0,1) (58,3); (sigma,sigma_0): (338506202564216866161343881290858079395300,291575736082696729378812658875049108139600) Tree 10. Subtrees: (0,1) (0,1) (58,2); (sigma,sigma_0): (337548533324619120259024000584756350366180,292533405322294475281132539581150837168720) Tree 11. Subtrees: (0,1) (0,1) (58,1); (sigma,sigma_0): (337297485192706132522282159520516356236260,292784453454207463017874380645390831298640) List L(60): Tree 1. Subtrees: (1,1) (1,1) (57,8); (sigma,sigma_0): (1897140140376378130959093168703698415496179,1135596155075219683671581754621617302440819) Tree 2. Subtrees: (1,1) (1,1) (57,7); (sigma,sigma_0): (1895328788263271031996900537330446651474995,1150086971980076475369122805607631414610291) Tree 3. Subtrees: (1,1) (1,1) (57,6); (sigma,sigma_0): (1895178310693624230449899610895369566700595,1151290792537250887745130217088248092805491) Tree 4. Subtrees: (1,1) (9,2) (49,5); (sigma,sigma_0): (1893176381450440488527176126560390168221443,1167306226482720823126918091768083280638707) Tree 5. Subtrees: (13,2) (13,2) (33,5); (sigma,sigma_0): (1886334348026902242895792613926024790896006,1201059659500308724225126138885887022463600) Tree 6. Subtrees: (4,1) (4,1) (51,4); (sigma,sigma_0): (1753637309394983167572783723740910064034870,1411582773172197234209512304536517731682270) Tree 7. Subtrees: (4,1) (4,1) (51,3); (sigma,sigma_0): (1748831930639356855140316839695923681057334,1418424806595735479840895817170883109007707) Tree 8. Subtrees: (0,1) (4,1) (55,3); (sigma,sigma_0): (1731528853431135168747840573461614897166390,1443061414573847998161433313430279795446180) Tree 9. Subtrees: (0,1) (0,1) (59,4); (sigma,sigma_0): (1712447178615701144660887250667284850809650,1462143089389282022248386636224609841802920) Tree 10. Subtrees: (0,1) (0,1) (59,3); (sigma,sigma_0): (1699985063063343447095062673989019060085170,1474605204941639719814211212902875632527400) Tree 11. Subtrees: (0,1) (0,1) (59,2); (sigma,sigma_0): (1699600292900134796436568836330119349651122,1474989975104848370472705050561775342961448) Tree 12. Subtrees: (0,1) (0,1) (59,1); (sigma,sigma_0): (1697509639959630260149824569047175513689010,1477080628045352906759449317844719178923560) List L(61): Tree 1. Subtrees: (1,1) (1,1) (58,7); (sigma,sigma_0): (9299623402649077965199201479512809566755050,5652334446851515880771255063261060321948010) Tree 2. Subtrees: (1,1) (1,1) (58,6); (sigma,sigma_0): (9287668502495484074061713298188679359073706,5747973648080267009871160513854101983398762) Tree 3. Subtrees: (1,1) (1,1) (58,5); (sigma,sigma_0): (9282372899250432287892609560660687300905450,5790338474040681299223990414078038448744810) Tree 4. Subtrees: (13,2) (13,2) (34,3); (sigma,sigma_0): (9235639824609538311684323432982438870959740,6020884220743804403779481239398967847543000) Tree 5. Subtrees: (4,1) (16,1) (40,2); (sigma,sigma_0): (8971675184056521262229956497632464050336754,7323086689276969756634753246562892503846754) Tree 6. Subtrees: (4,1) (4,1) (52,2); (sigma,sigma_0): (8956600588521562823913523736735340537197554,7344550322372643001815767861199617193453154) Tree 7. Subtrees: (4,1) (4,1) (52,1); (sigma,sigma_0): (8929310358096106972877126597408527584990706,7383406919990137758467200506842677041419545) Tree 8. Subtrees: (0,1) (0,1) (60,4); (sigma,sigma_0): (8740011752284482777235622598009643953524479,7572705525801761954108704506241560672885772) Tree 9. Subtrees: (0,1) (0,1) (60,3); (sigma,sigma_0): (8732004035311747809544728660669726359607871,7580713242774496921799598443581478266802380) Tree 10. Subtrees: (0,1) (0,1) (60,2); (sigma,sigma_0): (8731402125033160603356724954929418020510271,7581315153053084127987602149321786605899980) Tree 11. Subtrees: (0,1) (0,1) (60,1); (sigma,sigma_0): (8724156716580732207507954429436410964425535,7588560561505512523836372674814793661984716) List L(62): Tree 1. Subtrees: (1,1) (1,1) (59,8); (sigma,sigma_0): (46095042877067801610861564659576300931610900,27491394299817167717624425482683383251738900) Tree 2. Subtrees: (1,1) (1,1) (59,7); (sigma,sigma_0): (46030693932927696392157213864149266314684820,28006185852938009467259231846099660187147540) Tree 3. Subtrees: (1,1) (1,1) (59,6); (sigma,sigma_0): (45993224477310094795758812709342498666897940,28305941497878822238446441084553801369442580) Tree 4. Subtrees: (1,1) (1,1) (59,5); (sigma,sigma_0): (45839548710816290653068925474189393260673300,29535347629829255379965538965778644619239700) Tree 5. Subtrees: (13,2) (13,2) (35,4); (sigma,sigma_0): (45676666953556187146318890503410665914054200,30644462915205323703020646777775355934215300) Tree 6. Subtrees: (8,1) (13,2) (40,2); (sigma,sigma_0): (44947267665606555109394575276563318200380690,34242768928178952870087026356187271138187690) Tree 7. Subtrees: (4,1) (4,1) (53,6); (sigma,sigma_0): (44584302523462427220500944152212056251569938,34759568905958384961890653484413970280146749) Tree 8. Subtrees: (4,1) (4,1) (53,5); (sigma,sigma_0): (43849150061591033988828248299981894408099090,35806299657333864778080878633390118686182390) Tree 9. Subtrees: (0,1) (0,1) (61,3); (sigma,sigma_0): (42919830071042410450794428656720787652366610,37129491597001729151570438242642749203621800) Tree 10. Subtrees: (0,1) (0,1) (61,2); (sigma,sigma_0): (42898647658062203306118013706608819419693586,37150674009981936296246853192754717436294824) Tree 11. Subtrees: (0,1) (0,1) (61,1); (sigma,sigma_0): (42850828057447827741568060981312298588968210,37198493610596311860796805918051238267020200) List L(63): Tree 1. Subtrees: (1,1) (1,1) (60,8); (sigma,sigma_0): (232609767660648220550906818509928713579033110,140253837127921948668575086450390806670477590) Tree 2. Subtrees: (1,1) (1,1) (60,7); (sigma,sigma_0): (232434574003914975976182996314306337142137302,141655386381787905266365664015369818165644054) Tree 3. Subtrees: (1,1) (1,1) (60,6); (sigma,sigma_0): (232385919544014259562804269113350850014489750,142044622060993636573395481623013715186824470) Tree 4. Subtrees: (9,2) (13,2) (40,2); (sigma,sigma_0): (230292581976625224591128220023609252658193830,158791322600105916346803874340946494037191830) Tree 5. Subtrees: (13,2) (13,2) (36,3); (sigma,sigma_0): (229990286803760427437503707361115798956666500,160282619008236514660236467781906932274614200) Tree 6. Subtrees: (4,1) (4,1) (54,6); (sigma,sigma_0): (220203981268394200501008003230369393623633540,174216636069334130747551640264942341430436520) Tree 7. Subtrees: (4,1) (4,1) (54,5); (sigma,sigma_0): (218013860781537436647280849937435474165559940,177334991215659483968971747199608019721326470) Tree 8. Subtrees: (0,1) (4,1) (58,4); (sigma,sigma_0): (215883550719734294186491241833324174761492100,180368186596625286418025700925969615943134000) Tree 9. Subtrees: (0,1) (0,1) (62,4); (sigma,sigma_0): (212893542473094417992241240862536217661932900,183358194843265162612275701896757573042693200) Tree 10. Subtrees: (0,1) (0,1) (62,3); (sigma,sigma_0): (212278839407119201421481691921923796037034340,183972897909240379183035250837369994667591760) Tree 11. Subtrees: (0,1) (0,1) (62,2); (sigma,sigma_0): (212128961584648795035888087302696725445886820,184122775731710785568628855456597065258739280) Tree 12. Subtrees: (0,1) (0,1) (62,1); (sigma,sigma_0): (211871565808088374161070684120988586978182500,184380171508271206443446258638305203726443600) List L(64): Tree 1. Subtrees: (1,1) (1,1) (61,7); (sigma,sigma_0): (1195812181885153481344948086828022065035098066,723274139005784664803047254390090734384247186) Tree 2. Subtrees: (1,1) (1,1) (61,6); (sigma,sigma_0): (1195535868302095740853204565792338083894003730,725484647670246588736995422675562583513001874) Tree 3. Subtrees: (1,1) (1,1) (61,5); (sigma,sigma_0): (1195383238022304286665250684088254708323469330,726705689908578222240626476308229588077277074) Tree 4. Subtrees: (1,1) (13,2) (49,5); (sigma,sigma_0): (1193352669471609174215943562178099297601124378,742950238314139121835083451589472873856036690) Tree 5. Subtrees: (13,2) (13,2) (37,5); (sigma,sigma_0): (1190238243818981105877483667112653848236025388,758314465751642135131888448865926390855316800) Tree 6. Subtrees: (4,1) (4,1) (55,4); (sigma,sigma_0): (1107899731347875319639556650752790160218690500,892305182090444614520709475918043163709255700) Tree 7. Subtrees: (4,1) (4,1) (55,3); (sigma,sigma_0): (1105712370670035030216660263546331902228387780,895419607743072682859169370983488613074354690) Tree 8. Subtrees: (0,1) (0,1) (63,4); (sigma,sigma_0): (1079961650506606814711316754435383504669967150,921170327906500898364512880094437010632775320) Tree 9. Subtrees: (0,1) (0,1) (63,3); (sigma,sigma_0): (1071588300237050674824612558076417115244783470,929543678176057038251217076453403400057959000) Tree 10. Subtrees: (0,1) (0,1) (63,2); (sigma,sigma_0): (1071393682397447809171097649272595166734193262,929738296015659903904731985257225348568549208) Tree 11. Subtrees: (0,1) (0,1) (63,1); (sigma,sigma_0): (1070692907770514830872202360490105660986610030,930439070642592882203627274039714854316132440) List L(65): Tree 1. Subtrees: (1,1) (1,1) (62,9); (sigma,sigma_0): (5852793697962545912214856768723519748873490610,3476506235754435246514348721194383799841695410) Tree 2. Subtrees: (1,1) (1,1) (62,8); (sigma,sigma_0): (5843384333058241098892264344835501042971699250,3551781154988873753095088112298533447056026290) Tree 3. Subtrees: (1,1) (1,1) (62,7); (sigma,sigma_0): (5835940914381793242421578299331670654306556914,3611328504400456604860576476329176556377164978) Tree 4. Subtrees: (1,1) (1,1) (62,6); (sigma,sigma_0): (5832265892317583947546530284197614127074848050,3640728680914130963860960597401628774230835890) Tree 5. Subtrees: (1,1) (5,2) (58,5); (sigma,sigma_0): (5829518131144161448078009005715230600399477490,3662710770301510959609130825260696987633800370) Tree 6. Subtrees: (13,2) (13,2) (38,5); (sigma,sigma_0): (5804462400043324308578249834790692693484291820,3786316851866288185507654218049925233372835000) Tree 7. Subtrees: (4,1) (20,3) (40,2); (sigma,sigma_0): (5640079908397531690121270039324639627706248122,4597256097199755387748659805064742870576518122) Tree 8. Subtrees: (4,1) (4,1) (56,5); (sigma,sigma_0): (5627913338616239552911353377513997864928750522,4614579201439134231549498177056848036718697322) Tree 9. Subtrees: (4,1) (4,1) (56,4); (sigma,sigma_0): (5613281802376127406867307747994098483571242426,4635411994249762658241117833150611023065618029) Tree 10. Subtrees: (0,1) (0,1) (64,4); (sigma,sigma_0): (5516360916200575818698857700301870064260534202,4773410677886436696863774248712397190404497512) Tree 11. Subtrees: (0,1) (0,1) (64,3); (sigma,sigma_0): (5508238641997795368901629212661248421371154394,4781532952089217146661002736353018833293877320) Tree 12. Subtrees: (0,1) (0,1) (64,2); (sigma,sigma_0): (5507628120878629552149813685844914919089016794,4782143473208382963412818263169352335576014920) Tree 13. Subtrees: (0,1) (0,1) (64,1); (sigma,sigma_0): (5506522866546398590182839601702178994524639450,4783248727540613925379792347312088260140392264) List L(66): Tree 1. Subtrees: (1,1) (1,1) (63,8); (sigma,sigma_0): (29030131550482496159859435447761313576041436100,17486567608298477829105790588499258155680860100) Tree 2. Subtrees: (1,1) (1,1) (63,7); (sigma,sigma_0): (29008562161106739342443940665707186669575249220,17659122723304532368429748844932273407410355140) Tree 3. Subtrees: (1,1) (1,1) (63,6); (sigma,sigma_0): (28986387191177314608424953238616230735062254020,17836522482739930240581648261659920883514316740) Tree 4. Subtrees: (1,1) (1,1) (63,5); (sigma,sigma_0): (28887300847631731560692934234292423381065295300,18629213231104594622437800296250379715489986500) Tree 5. Subtrees: (13,2) (13,2) (39,4); (sigma,sigma_0): (28768560046589116104272158740594731145379971400,19317419265680445016893494693594339086432346300) Tree 6. Subtrees: (12,1) (13,2) (40,2); (sigma,sigma_0): (28320192506455861404611604868303392194398349710,21529326573979181177966626543434800468075246710) Tree 7. Subtrees: (4,1) (4,1) (57,6); (sigma,sigma_0): (28066957417708294417440528243791937385203244942,21889889815574838079622319627944274210073745491) Tree 8. Subtrees: (4,1) (4,1) (57,5); (sigma,sigma_0): (27608966289674809931756647180044175135811060110,22541990464669389232090189345663256006571602410) Tree 9. Subtrees: (0,1) (4,1) (61,3); (sigma,sigma_0): (27260006283515229605683745941422715909982293390,23038849535939572938549456929559825880847326900) Tree 10. Subtrees: (0,1) (0,1) (65,5); (sigma,sigma_0): (26980783294878156751921166848121619389231710330,23318072524576645792312036022860922401597909960) Tree 11. Subtrees: (0,1) (0,1) (65,4); (sigma,sigma_0): (26969792250184466754047081734192085282530228090,23329063569270335790186121136790456508299392200) Tree 12. Subtrees: (0,1) (0,1) (65,3); (sigma,sigma_0): (26955092161927629574546889673655859173603392634,23343763657527172969686313197326682617226227656) Tree 13. Subtrees: (0,1) (0,1) (65,2); (sigma,sigma_0): (26925318487221838148664145491640537618942823290,23373537332232964395569057379342004171886797000) Tree 14. Subtrees: (0,1) (0,1) (65,1); (sigma,sigma_0): (26887681027604618895373775796088462795335657850,23411174791850183648859427074894078995493962440) List L(67): Tree 1. Subtrees: (1,1) (1,1) (64,7); (sigma,sigma_0): (146869556919829489150536321090196155317258110340,89562702024272837447549481347252884080499410180) Tree 2. Subtrees: (1,1) (1,1) (64,6); (sigma,sigma_0): (146847409892966356220129495169730765455106295300,89739878239177900890804088710976002977713930500) Tree 3. Subtrees: (13,2) (13,2) (40,2); (sigma,sigma_0): (145431743202893220157493700729434929815877337100,101065211759762989391890444233342688091545596100) Tree 4. Subtrees: (4,1) (4,1) (58,5); (sigma,sigma_0): (139090742426793690785506150122692792947441374220,110093707005420327110989905937082957187424144810) Tree 5. Subtrees: (4,1) (4,1) (58,4); (sigma,sigma_0): (137809160228952456885596326746025620071297701900,111918459783205990222384947424564146692714647000) Tree 6. Subtrees: (0,1) (0,1) (66,4); (sigma,sigma_0): (134178416621631520865209537233420073239751167700,115549203390526926242771736937169693524261181200) Tree 7. Subtrees: (0,1) (0,1) (66,3); (sigma,sigma_0): (133782071247449188674281461216124843823763332820,115945548764709258433699812954464922940249016080) Tree 8. Subtrees: (0,1) (0,1) (66,2); (sigma,sigma_0): (133693371367731489738205511507761020085711352020,116034248644426957369775762662828746678300996880) Tree 9. Subtrees: (0,1) (0,1) (66,1); (sigma,sigma_0): (133607093810228462468543532379544512459846604500,116120526201929984639437741791045254304165744400) List L(68): Tree 1. Subtrees: (1,1) (1,1) (65,10); (sigma,sigma_0): (752323517596978589913889025642044895390991111130,446825234212246641314607473724451475205103270362) Tree 2. Subtrees: (1,1) (1,1) (65,9); (sigma,sigma_0): (751342193624451130083683468909161082645470190362,454675825992466319956251927587521977169270636506) Tree 3. Subtrees: (1,1) (1,1) (65,8); (sigma,sigma_0): (751194049320019994604987506910272101409225420890,455860980427915403785819623578633827059228792282) Tree 4. Subtrees: (1,1) (1,1) (65,7); (sigma,sigma_0): (751070862800984411715737100709439353561103257690,456846472580200066899822873185295809844206097882) Tree 5. Subtrees: (5,2) (13,2) (49,5); (sigma,sigma_0): (749432009280142836458671486386783703807428785534,469957300746932668956347787766541007873601875130) Tree 6. Subtrees: (13,2) (13,2) (41,6); (sigma,sigma_0): (748043085703450723139903301807904882213925316104,476809202222763540967749188307234983865753444400) Tree 7. Subtrees: (4,1) (4,1) (59,5); (sigma,sigma_0): (696952038715129582779269588156609463799169018100,561565774235741598207811200196979515849917239700) Tree 8. Subtrees: (4,1) (4,1) (59,4); (sigma,sigma_0): (695976553295011116360601123815887986904966307060,562954697812433711526579384775858337443420709130) Tree 9. Subtrees: (0,1) (0,1) (67,3); (sigma,sigma_0): (682792184571335870021865247151082407355054944500,581726972811572880629974802917739719263509348400) Tree 10. Subtrees: (0,1) (0,1) (67,2); (sigma,sigma_0): (677129517811043325771322069389899064798139111700,587389639571865424880517980678923061820425181200) Tree 11. Subtrees: (0,1) (0,1) (67,1); (sigma,sigma_0): (677040929703590794049694765708037505349531851540,587478227679317956602145284360784621269032441360) List L(69): Tree 1. Subtrees: (1,1) (1,1) (66,9); (sigma,sigma_0): (3682546879264866266127548664747068845082794686190,2208060508964733598060383421255239988708565764590) Tree 2. Subtrees: (1,1) (1,1) (66,8); (sigma,sigma_0): (3679013659202500515326060539706026570421278423150,2236326269463659604472288421583578186000695868910) Tree 3. Subtrees: (1,1) (1,1) (66,7); (sigma,sigma_0): (3674376499031161484908511243935580477646182551726,2273423550834371847812682787747146928201462840302) Tree 4. Subtrees: (1,1) (1,1) (66,6); (sigma,sigma_0): (3671812493757592369163404093112401997703082115950,2293935593022924773773539994332574767746266326510) Tree 5. Subtrees: (1,1) (9,2) (58,5); (sigma,sigma_0): (3668104390054058706130634627800425428454669545230,2323600422651194078035695716828387321733566892270) Tree 6. Subtrees: (13,2) (13,2) (42,5); (sigma,sigma_0): (3655431130215376851596658710919314969992203700660,2386120729203310075217151815763067690923726269000) Tree 7. Subtrees: (4,1) (24,3) (40,2); (sigma,sigma_0): (3552999911088013933715875361125293042972028020886,2891439116253423649686747266995002175636703190886) Tree 8. Subtrees: (4,1) (4,1) (60,5); (sigma,sigma_0): (3543400035548123201852120445023460871092989864086,2905107689043619633141195184647806185987911816486) Tree 9. Subtrees: (4,1) (4,1) (60,4); (sigma,sigma_0): (3535999363028779474974814413776574197410563243670,2915644974720575838011421936169252250664648156883) Tree 10. Subtrees: (0,1) (4,1) (64,4); (sigma,sigma_0): (3503512049359541390221747757534768181687041453206,2961901325628533970403971921326042456645990706196) Tree 11. Subtrees: (0,1) (0,1) (68,5); (sigma,sigma_0): (3467685337867504014791033733313675823103317017266,2997728037120571345834685945547134815229715142136) Tree 12. Subtrees: (0,1) (0,1) (68,4); (sigma,sigma_0): (3461129923784137713762771276023053224088619128642,3004283451203937646862948402837757414244413030760) Tree 13. Subtrees: (0,1) (0,1) (68,3); (sigma,sigma_0): (3460637177707995382205769651219722232696130475842,3004776197280079978419950027641088405636901683560) Tree 14. Subtrees: (0,1) (0,1) (68,2); (sigma,sigma_0): (3460044600490270840290985803224166307751151397954,3005368774497804520334733875636644330581880761448) Tree 15. Subtrees: (0,1) (0,1) (68,1); (sigma,sigma_0): (3456119304600161000970163576292631056769067714882,3009294070387914359655556102568179581563964444520) List L(70): Tree 1. Subtrees: (1,1) (1,1) (67,5); (sigma,sigma_0): (18325323404670332381965939101600180614108851261900,11162541978545149007733302466428075225775113853900) Tree 2. Subtrees: (1,1) (1,1) (67,4); (sigma,sigma_0): (18312347384917189888729352139911425488737896579660,11266350136570288953625998159938116228742751311820) Tree 3. Subtrees: (1,1) (1,1) (67,3); (sigma,sigma_0): (18248144752059182153837978190018161352944982455500,11779971199434350832756989759084229315086064305100) Tree 4. Subtrees: (13,2) (13,2) (43,3); (sigma,sigma_0): (18161582708099115486107232855112543713130381332400,12207003043888666002516748132636156104755798561000) Tree 5. Subtrees: (13,2) (16,1) (40,2); (sigma,sigma_0): (17886450468897220597841826313586031876648469905940,13564298022152260653122881626788910162299603895940) Tree 6. Subtrees: (4,1) (4,1) (61,5); (sigma,sigma_0): (17708895002372993406492103532936933022243501229588,13817106489136951322056373632830302867106678437074) Tree 7. Subtrees: (4,1) (4,1) (61,4); (sigma,sigma_0): (17423378147880790528746075806338454310692646801940,14223633416724482372597104516991027438826547338940) Tree 8. Subtrees: (4,1) (4,1) (61,3); (sigma,sigma_0): (17372829406033158718710834714439918790305156912660,14295606137050505008369938024791871959065766341450) Tree 9. Subtrees: (0,1) (0,1) (69,5); (sigma,sigma_0): (16996017982867428902558234228030089035552245073190,14672417560216234824522538511201701713818678180920) Tree 10. Subtrees: (0,1) (0,1) (69,4); (sigma,sigma_0): (16981185568053294250427156366782182758558594790310,14687249975030369476653616372449607990812328463800) Tree 11. Subtrees: (0,1) (0,1) (69,3); (sigma,sigma_0): (16970929546959017787446727763489468838786193047206,14697505996124645939634044975742321910584730206904) Tree 12. Subtrees: (0,1) (0,1) (69,2); (sigma,sigma_0): (16952380906273661665776530580407684467685809561510,14716054636810002061304242158824106281685113692600) Tree 13. Subtrees: (0,1) (0,1) (69,1); (sigma,sigma_0): (16938248026024198662570578080243515369039744509350,14730187517059465064510194658988275380331178744760) List L(71): Tree 1. Subtrees: (1,1) (1,1) (68,9); (sigma,sigma_0): (92536693210218869832089472405973017028624048802100,55306166950278205471771085019237674995759450504500) Tree 2. Subtrees: (1,1) (1,1) (68,8); (sigma,sigma_0): (92403201476891657962909771654741860535681196256180,56374100816895900425208691029086926939302270871860) Tree 3. Subtrees: (1,1) (1,1) (68,7); (sigma,sigma_0): (92393324687012958490420753453292055582127393806900,56453115135925496205120836640685366567732690466100) Tree 4. Subtrees: (13,2) (13,2) (44,3); (sigma,sigma_0): (91361303669949642300759259306316391401129483279100,63480484585448543620044920242313894680865238970900) Tree 5. Subtrees: (13,2) (17,3) (40,2); (sigma,sigma_0): (91355035277245117866981701411746927145174612564220,63511408107767539706672258499905650328156429235220) Tree 6. Subtrees: (4,1) (4,1) (62,6); (sigma,sigma_0): (87420444295675359891663426260263431218310097597180,69222432933715008999431506886504911657360493435890) Tree 7. Subtrees: (4,1) (4,1) (62,5); (sigma,sigma_0): (86631490934619398690546938749610914704617819637500,70345766918499766256489943205383201771582506390200) Tree 8. Subtrees: (0,1) (0,1) (70,3); (sigma,sigma_0): (84772550207671079448108902519156874726865994127100,72992579008236728615351912760072645411779929822000) Tree 9. Subtrees: (0,1) (0,1) (70,2); (sigma,sigma_0): (84515739676239048508543406719583818183694337630460,73249389539668759554917408559645701954951586318640) Tree 10. Subtrees: (0,1) (0,1) (70,1); (sigma,sigma_0): (84463835597226478535597058872828797682210518901500,73301293618681329527863756406400722456435405047600) List L(72): Tree 1. Subtrees: (1,1) (1,1) (69,10); (sigma,sigma_0): (473346160838349026713815771325182939941993762906230,283784475998122852607961568360316222716650357709686) Tree 2. Subtrees: (1,1) (1,1) (69,9); (sigma,sigma_0): (473017226787447991105690971430734654032793104777782,286415948405331137472959967515902509990255622737270) Tree 3. Subtrees: (1,1) (1,1) (69,8); (sigma,sigma_0): (472942294978189635871058247864359926461758535246070,287015402879397979350021756046900330558532178990966) Tree 4. Subtrees: (1,1) (1,1) (69,7); (sigma,sigma_0): (472845096238348242210937729338828875721483273908470,287792992798129128630985904251148736480734269691766) Tree 5. Subtrees: (9,2) (13,2) (49,5); (sigma,sigma_0): (471551979927752441694853288217293370564393339873912,298137923282895532759661433223432777737453741968230) Tree 6. Subtrees: (13,2) (13,2) (45,6); (sigma,sigma_0): (471086420875631652029702095131527789894291427960182,300434640546425712740811015162580570418581422980200) Tree 7. Subtrees: (4,1) (4,1) (63,5); (sigma,sigma_0): (439384426219378384435928875810898982767935145048700,354203670891022162848378147136414580772981899986500) Tree 8. Subtrees: (4,1) (4,1) (63,4); (sigma,sigma_0): (439057449217065840802791138005807107180703075227260,354669229943142952513529340222180161443083811900230) Tree 9. Subtrees: (0,1) (4,1) (67,3); (sigma,sigma_0): (434638126002448191697587499056564315421744290239100,360961586629580972430899365210457495803007550682200) Tree 10. Subtrees: (0,1) (0,1) (71,3); (sigma,sigma_0): (426026413883977330166803850453853588896242265693700,369573298748051833961683013813168222328509575227600) Tree 11. Subtrees: (0,1) (0,1) (71,2); (sigma,sigma_0): (425986906724462532276847777648054369082027055896580,369612805907566631851639086618967442142724785024720) Tree 12. Subtrees: (0,1) (0,1) (71,1); (sigma,sigma_0): (425452939791153684800128974643129743110255645712900,370146772840875479328357889623892068114496195208400) List L(73): Tree 1. Subtrees: (1,1) (1,1) (70,8); (sigma,sigma_0): (2322117974659918176751253645456313227394926755778260,1407199181888685856215577611869633422014717709925460) Tree 2. Subtrees: (1,1) (1,1) (70,7); (sigma,sigma_0): (2321606168648710904674646829400840555251003420649300,1411293629978344032828432140313414799166104390957140) Tree 3. Subtrees: (1,1) (1,1) (70,6); (sigma,sigma_0): (2318715310496977350537468298669030958296551019569364,1434420495192212465925860386167891574801723599596628) Tree 4. Subtrees: (1,1) (1,1) (70,5); (sigma,sigma_0): (2316917561398419550225052355514958832395700711721300,1448802487980674868425187931400468582008526062381140) Tree 5. Subtrees: (1,1) (13,2) (58,5); (sigma,sigma_0): (2313156410104612085773168485530920987377175105812580,1478891698331134584040258891272771342156730909650900) Tree 6. Subtrees: (13,2) (13,2) (46,5); (sigma,sigma_0): (2307387668109253548528016797992137060916673652868680,1507350320860836750376179281935575444174150238358000) Tree 7. Subtrees: (4,1) (28,2) (40,2); (sigma,sigma_0): (2243514253889147529947512964535298511415782860563628,1822453576724220464258791791617646854602231154463628) Tree 8. Subtrees: (4,1) (4,1) (64,5); (sigma,sigma_0): (2236062702772498688457526852684279838327726631085228,1833063304778980240520900923530523051245186215576428) Tree 9. Subtrees: (4,1) (4,1) (64,4); (sigma,sigma_0): (2232693990152409737682823161778970397903763227764908,1837859772552505328635664577182809344348837233194618) Tree 10. Subtrees: (0,1) (0,1) (72,5); (sigma,sigma_0): (2184345842993905299539074586092606259995027101463878,1886207919711009766779413152869173482257573359495648) Tree 11. Subtrees: (0,1) (0,1) (72,4); (sigma,sigma_0): (2179173377751522097474736821606464239366667365325646,1891380384953392968843750917355315502885933095633880) Tree 12. Subtrees: (0,1) (0,1) (72,3); (sigma,sigma_0): (2178784582792156522834254747504340036405566319975246,1891769179912758543484232991457439705847034140984280) Tree 13. Subtrees: (0,1) (0,1) (72,2); (sigma,sigma_0): (2178484855555123101895723853238841126121428041848398,1892068907149791964422763885722938616131172419111128) Tree 14. Subtrees: (0,1) (0,1) (72,1); (sigma,sigma_0): (2177169119351518959463224653661047982484625409334606,1893384643353396106855263085300731759767975051624920) List L(74): Tree 1. Subtrees: (1,1) (1,1) (71,8); (sigma,sigma_0): (11538101623348508066679343520696356159230061032903100,6866576566821357435296821104051706852876145524295100) Tree 2. Subtrees: (1,1) (1,1) (71,7); (sigma,sigma_0): (11519279848488156334349658403863009004455323799610300,7017150765704171293934302038718484091074043390637500) Tree 3. Subtrees: (1,1) (1,1) (71,6); (sigma,sigma_0): (11511291695707464727188353967817652274754189485268540,7081055987949704151224737527081337928683117905371580) Tree 4. Subtrees: (1,1) (5,2) (67,3); (sigma,sigma_0): (11464987915890347755940258065668562328467565833315900,7451486226486639921209504744274057498976107120992700) Tree 5. Subtrees: (13,2) (13,2) (47,4); (sigma,sigma_0): (11418578059195312533596964503545950774162209929577200,7680437459598511958686457153280918189121971374837000) Tree 6. Subtrees: (13,2) (20,3) (40,2); (sigma,sigma_0): (11249338644175448179435590412875934992826975624792420,8515337102028886294403929068216377890628298492022420) Tree 7. Subtrees: (4,1) (4,1) (65,7); (sigma,sigma_0): (11129350282956714205874191198896542338359521681251684,8686179905404779002853655683433130322477466313977882) Tree 8. Subtrees: (4,1) (4,1) (65,6); (sigma,sigma_0): (10951546271593795004073872849108955110022874435672420,8939342257521122944479499583814284794073981630437420) Tree 9. Subtrees: (4,1) (4,1) (65,5); (sigma,sigma_0): (10924444787410436593003064282438288126098922194709860,8977930112930631307117428187530918058293827692276690) Tree 10. Subtrees: (0,1) (0,1) (73,5); (sigma,sigma_0): (10731517338749582927132932833396455291665431332901220,9252625640418448343092673942123683949508700423250320) Tree 11. Subtrees: (0,1) (0,1) (73,4); (sigma,sigma_0): (10716472733574353069325397353460303911591328909266340,9267670245593678200900209422059835329582802846885200) Tree 12. Subtrees: (0,1) (0,1) (73,3); (sigma,sigma_0): (10709281737180121868075733580844015407987927677874084,9274861241987909402149873194676123833186204078277456) Tree 13. Subtrees: (0,1) (0,1) (73,2); (sigma,sigma_0): (10697718304573187651527019457916777020170118073554340,9286424674594843618698587317603362221004013682597200) Tree 14. Subtrees: (0,1) (0,1) (73,1); (sigma,sigma_0): (10695671080528358563220592193694886331594424733038500,9288471898639672707005014581825252909579707023113040) List L(75): Tree 1. Subtrees: (1,1) (1,1) (72,9); (sigma,sigma_0): (58307229750491485763082146797050989280553770753027900,35205688206198303527504587423581709549161287509367100) Tree 2. Subtrees: (1,1) (1,1) (72,8); (sigma,sigma_0): (58262484102943482065891959952689906013994313055022780,35563653386582333105026082178470375681636949093408060) Tree 3. Subtrees: (1,1) (1,1) (72,7); (sigma,sigma_0): (58259173460795067561606440357413350773673588348080700,35590138523769649139310238940682817604202746748944700) Tree 4. Subtrees: (13,2) (13,2) (48,3); (sigma,sigma_0): (57506830139355910059343211124268091585726111573314500,39950621267198700060270632815493319298401493096173100) Tree 5. Subtrees: (13,2) (21,3) (40,2); (sigma,sigma_0): (57498370943401154335960396745546599572315013543583940,39992352560568185279174225794113393544420954357872940) Tree 6. Subtrees: (4,1) (4,1) (66,6); (sigma,sigma_0): (55056957239337119512275407014051090349695582006535620,43615390395535049487875645037181556554141204819726510) Tree 7. Subtrees: (4,1) (4,1) (66,5); (sigma,sigma_0): (54571981337083493899206466218832343295540624283701700,44305912725111012518983570505373874137107931733683400) Tree 8. Subtrees: (0,1) (4,1) (70,3); (sigma,sigma_0): (53879494278998531862905707401997479648707187332968900,45291895274610890105825861867625076478009446454551000) Tree 9. Subtrees: (0,1) (0,1) (74,4); (sigma,sigma_0): (53311437890048030944970537006948306812846370454256300,45859951663561391023761032262674249313870263333263600) Tree 10. Subtrees: (0,1) (0,1) (74,3); (sigma,sigma_0): (53126222770779563059978153398351947027699875846445740,46045166782829858908753415871270609099016757941074160) Tree 11. Subtrees: (0,1) (0,1) (74,2); (sigma,sigma_0): (53094270159656796631332935654170520108895338589078700,46077119393952625337398633615452036017821295198441200) Tree 12. Subtrees: (0,1) (0,1) (74,1); (sigma,sigma_0): (53018983060215389702014195186837131489796389655907500,46152406493394032266717374082785424636920244131612400) List L(76): Tree 1. Subtrees: (1,1) (1,1) (73,9); (sigma,sigma_0): (298471238645705529784991209043796400268530404373413100,180848213202345188752308676104096602230204821448957548) Tree 2. Subtrees: (1,1) (1,1) (73,8); (sigma,sigma_0): (298437130430427129158397334173380142184237774914794860,181121078924572393765059675067426666904545857117903468) Tree 3. Subtrees: (1,1) (1,1) (73,7); (sigma,sigma_0): (298361683475371059638311224790888578119221205591326060,181724654565020949925748550127359179424678411705653868) Tree 4. Subtrees: (13,2) (13,2) (49,5); (sigma,sigma_0): (297357949390680348780724988275350922469729341881859781,189754527242546636786438442251660424620613321381384100) Tree 5. Subtrees: (4,1) (4,1) (67,3); (sigma,sigma_0): (277686861706475196238788705686900747647825268335285200,223976664503654993393373056113088876145766185198305100) Tree 6. Subtrees: (0,1) (0,1) (75,3); (sigma,sigma_0): (268626832366949919385736000370336220698897100141267500,233036693843180270246425761429653403094694353392322800) Tree 7. Subtrees: (0,1) (0,1) (75,2); (sigma,sigma_0): (268613589798356261368593921989229999737614201313499180,233049936411773928263567839810759624055977252220091120) Tree 8. Subtrees: (0,1) (0,1) (75,1); (sigma,sigma_0): (268434607208164246579833174611785666671376370521478700,233228919001965943052328587188203957122215083012111600) List L(77): Tree 1. Subtrees: (1,1) (1,1) (74,10); (sigma,sigma_0): (1461420945425496911055698691801028651393456765053019300,869252904438716217097767559505112878624899937964998820) Tree 2. Subtrees: (1,1) (1,1) (74,9); (sigma,sigma_0): (1459467555007805767688763610879480093944817670077206820,884880027780245364033248206877501338214012697771498660) Tree 3. Subtrees: (1,1) (1,1) (74,8); (sigma,sigma_0): (1459193152480449263776671674141939590732587653637460900,887075247999097395329983700777825363911852829289466020) Tree 4. Subtrees: (1,1) (1,1) (74,7); (sigma,sigma_0): (1457392886865399706858443450850340270045679100275970852,901477372919493850675809487110619929407121256181386404) Tree 5. Subtrees: (1,1) (1,1) (74,6); (sigma,sigma_0): (1456178004708060025376134283808798919419196129097620900,911196430178211302534282823442950734418985025608186020) Tree 6. Subtrees: (5,2) (13,2) (58,5); (sigma,sigma_0): (1453142413499792699485403055238947104959093298011941740,935481159844349909660132652001765250099807674293619300) Tree 7. Subtrees: (13,2) (13,2) (50,6); (sigma,sigma_0): (1450569758808727505560863065617712603176875333081669440,948172697932064561430405556822302043778320871949754000) Tree 8. Subtrees: (4,1) (32,3) (40,2); (sigma,sigma_0): (1410784994089672109945924226892457658689240004410852024,1144440723523013244949714267179103116218178908541152024) Tree 9. Subtrees: (4,1) (4,1) (68,6); (sigma,sigma_0): (1405442902711723772119467013334805225965504190996144824,1152046943473256093144025416951619958904904314750764424) Tree 10. Subtrees: (4,1) (4,1) (68,5); (sigma,sigma_0): (1403940576150422304238937666104482553108803585574950584,1154185998284171659716107241426044233343448731453988254) Tree 11. Subtrees: (0,1) (0,1) (76,4); (sigma,sigma_0): (1379186324805268031909338395353064114499530688908823224,1189431797562721395122899953101403689878917367527439124) Tree 12. Subtrees: (0,1) (0,1) (76,3); (sigma,sigma_0): (1375171388466505188478993449290913491901563234070958108,1193446733901484238553244899163554312476884822365304240) Tree 13. Subtrees: (0,1) (0,1) (76,2); (sigma,sigma_0): (1374869600646280910398649011760947235641496956777082908,1193748521721708516633589336693520568736951099659179440) Tree 14. Subtrees: (0,1) (0,1) (76,1); (sigma,sigma_0): (1374733167785167307892273512279282203304326438942609948,1193884954582822119139964836175185601074121617493652400) List L(78): Tree 1. Subtrees: (1,1) (1,1) (75,8); (sigma,sigma_0): (7262920334173978047668217459089800746137886747061744900,4364239036598881080895362299561795851545282173970480900) Tree 2. Subtrees: (1,1) (1,1) (75,7); (sigma,sigma_0): (7255908902710867807050672276069347751713698197935575300,4420330488303763005835723763725419806938790566979837700) Tree 3. Subtrees: (1,1) (1,1) (75,6); (sigma,sigma_0): (7250998521700549847718349250517757937790379250991881860,4459613536386306680494307968138138318325342142529385220) Tree 4. Subtrees: (1,1) (9,2) (67,3); (sigma,sigma_0): (7217553278696189574854614934245054674149758475717887300,4727175480421188863404182498319764427450308344721341700) Tree 5. Subtrees: (13,2) (13,2) (51,4); (sigma,sigma_0): (7194079041580333919083670405305804540087796521350619600,4842979663341895209671936752669363381092391048166267000) Tree 6. Subtrees: (13,2) (24,3) (40,2); (sigma,sigma_0): (7090145006186688515427867259270157476593389810289894460,5355711812506528785291558949528985790492555640477224460) Tree 7. Subtrees: (4,1) (4,1) (69,7); (sigma,sigma_0): (7008536951449175304864253696356293386135949066901778492,5471907656068339587051079042037202434913403886434131766) Tree 8. Subtrees: (4,1) (4,1) (69,6); (sigma,sigma_0): (6897742416901764106667312122292269975032759079639782460,5629660030453227796983833744171329518300563067516153460) Tree 9. Subtrees: (4,1) (4,1) (69,5); (sigma,sigma_0): (6884034409353018018221742075664501980929304450682224700,5649177877138844786196373908217506994279895927887363630) Tree 10. Subtrees: (0,1) (4,1) (73,5); (sigma,sigma_0): (6819366257963044308654352912825596199102405445762329660,5741254209879647196889004181087745890670148612626823560) Tree 11. Subtrees: (0,1) (0,1) (77,6); (sigma,sigma_0): (6748050813843520707601744872957553669936180866341386260,5812569653999170797941612220955788419836373192047766960) Tree 12. Subtrees: (0,1) (0,1) (77,5); (sigma,sigma_0): (6735908449010451404038819958678146412095769541998669620,5824712018832240101504537135235195677676784516390483600) Tree 13. Subtrees: (0,1) (0,1) (77,4); (sigma,sigma_0): (6731048920381092678109583290511981009589837657285269812,5829571547461598827433773803401361080182716401103883408) Tree 14. Subtrees: (0,1) (0,1) (77,3); (sigma,sigma_0): (6723847857920894450436670397345583726842203443839309620,5836772609921797055106686696567758362930350614549843600) Tree 15. Subtrees: (0,1) (0,1) (77,2); (sigma,sigma_0): (6722750247811468434788302650395421713993283378080325940,5837870220031223070755054443517920375779270680308827280) Tree 16. Subtrees: (0,1) (0,1) (77,1); (sigma,sigma_0): (6714936686140703861320562326709227484198726998177076020,5845683781701987644222794767204114605573827060212077200) List L(79): Tree 1. Subtrees: (1,1) (1,1) (76,5); (sigma,sigma_0): (36827142326458410472517760751876648632802882587849627600,22492635798224490895341885160638960559473846735158101200) Tree 2. Subtrees: (13,2) (13,2) (52,2); (sigma,sigma_0): (36278684045129264653367866640913754684789172019045067800,25198315340522216991797809559958876860724168843613323400) Tree 3. Subtrees: (13,2) (25,2) (40,2); (sigma,sigma_0): (36270103833152053557397651173869178236818673244010713240,25240643635682712169400808274145453143331322001758559240) Tree 4. Subtrees: (4,1) (4,1) (70,5); (sigma,sigma_0): (34755206629780319949301115045476214764183315975272230680,27546582524589700395544837710853889558620652181209981140) Tree 5. Subtrees: (4,1) (4,1) (70,4); (sigma,sigma_0): (34457610363319230426003016427090872870729077155840325400,27970308458671993876959513282734581434261550812783924400) Tree 6. Subtrees: (4,1) (4,1) (70,3); (sigma,sigma_0): (34363980692094648151576154683418841866043514625415544600,28103621017896057310664947288861359954604861525048895500) Tree 7. Subtrees: (0,1) (0,1) (78,4); (sigma,sigma_0): (33597388595205947162822642235299983124049342247592890900,28870213114784758299418459736980218696599033902871549200) Tree 8. Subtrees: (0,1) (0,1) (78,3); (sigma,sigma_0): (33463607623188506071367704970209170069486859146496912660,29003994086802199390873397002071031751161517003967527440) Tree 9. Subtrees: (0,1) (0,1) (78,2); (sigma,sigma_0): (33443966099147234234038412868002810813793583358722138900,29023635610843471228202689104277391006854792791742301200) Tree 10. Subtrees: (0,1) (0,1) (78,1); (sigma,sigma_0): (33415920373294793271568232135920998836096829162217460500,29051681336695912190672869836359202984551546988246979600) List L(80): Tree 1. Subtrees: (1,1) (1,1) (77,11); (sigma,sigma_0): (187837727353240879872522007022088029426712697323370785080,111714092309226710584656410023598193274461985801614681144) Tree 2. Subtrees: (1,1) (1,1) (77,10); (sigma,sigma_0): (187587090558371192865184814405729917735793809244626245560,113719186668184206643353950954463086801813090431570997304) Tree 3. Subtrees: (1,1) (1,1) (77,9); (sigma,sigma_0): (187571879501938015502894454765022900673119715614736653880,113840875119649625541676828080119223303205839470687730744) Tree 4. Subtrees: (1,1) (1,1) (77,8); (sigma,sigma_0): (187517790826736288582401575477751669791791890503912743480,114273584521263440905619862378289070353828440357279013944) Tree 5. Subtrees: (13,2) (13,2) (53,6); (sigma,sigma_0): (186786068678996760367221209057924718823312321859711826089,119256120517668129602677940441417992997906051811069622900) Tree 6. Subtrees: (4,1) (8,1) (67,3); (sigma,sigma_0): (174538359407193339010798160078604476550627212767225539600,140563675776564959588692460853747700499380283845133571900) Tree 7. Subtrees: (4,1) (4,1) (71,5); (sigma,sigma_0): (174446720321015027438952657421352978020713443401711053840,140694154084814938369699045691904619304667662492516501820) Tree 8. Subtrees: (4,1) (4,1) (71,4); (sigma,sigma_0): (174439940125895074534175913290226592888536599201893674000,140703807917319715064195620831731054385442895737959607100) Tree 9. Subtrees: (0,1) (0,1) (79,1); (sigma,sigma_0): (169801205104058132785412928168145555090685377086556611600,147308569305833641890071043007506594531211530351398510400) List L(81): Tree 1. Subtrees: (1,1) (1,1) (78,10); (sigma,sigma_0): (919808936327304009601898853528489029130184352314865410300,552368666895006589001002585938873292127294841106748702460) Tree 2. Subtrees: (1,1) (1,1) (78,9); (sigma,sigma_0): (919154171294480525792529038254745108089186999890051473020,557606787157594459475961108128824660455273660505260200700) Tree 3. Subtrees: (1,1) (1,1) (78,8); (sigma,sigma_0): (919015377718049471647017641532638957148889521771856200700,558717135769042892640052281905673867977653485450822379260) Tree 4. Subtrees: (1,1) (1,1) (78,7); (sigma,sigma_0): (917893583055756933265273608095240720111469723150828490876,567691493067383199694004549404859764277011874419044057852) Tree 5. Subtrees: (1,1) (1,1) (78,6); (sigma,sigma_0): (917067301501539612008317020770737846195588135624023816700,574301745501121769749657248000882755604064574633481451260) Tree 6. Subtrees: (9,2) (13,2) (58,5); (sigma,sigma_0): (914672107267404546322530411041717429567661821015876784320,593463299374202295235950125833046088627475091498657710300) Tree 7. Subtrees: (13,2) (13,2) (54,6); (sigma,sigma_0): (913809768475331526972253212571748915235370976823656289020,597717428644686356219794669734189701571610114201262692000) Tree 8. Subtrees: (4,1) (36,3) (40,2); (sigma,sigma_0): (889013016105653017511681966005134272904012795782220780542,720045904457777230264728359974810997714813486626012080542) Tree 9. Subtrees: (4,1) (4,1) (72,6); (sigma,sigma_0): (885174531955196697494244979081275431112011566674365522942,725511246148563670289555632372258450188190236664345054742) Tree 10. Subtrees: (4,1) (4,1) (72,5); (sigma,sigma_0): (884670960886498192983178578704671730265751613351692386302,726228244799112908157851346970977391432181459266354266872) Tree 11. Subtrees: (0,1) (4,1) (76,4); (sigma,sigma_0): (876373480747485123891073045300881439118295337837804985342,738042430387668625673759420899420989569868226550775976442) Tree 12. Subtrees: (0,1) (0,1) (80,4); (sigma,sigma_0): (864344747828208595235226164289295749520996002372929987864,750071163306945154329606301911006679167167562015650973920) Tree 13. Subtrees: (0,1) (0,1) (80,3); (sigma,sigma_0): (864128393127401687553254647140210825995684701929634346264,750287518007752062011577819060091602692478862458946615520) Tree 14. Subtrees: (0,1) (0,1) (80,2); (sigma,sigma_0): (864067548901668978104093208577382757744988327410075979544,750348362233484771460739257622919670943175236978504982240) Tree 15. Subtrees: (0,1) (0,1) (80,1); (sigma,sigma_0): (863065001722190230074744438111950310981312775095097821464,751350909412963519490088028088352117706850789293483140320) List L(82): Tree 1. Subtrees: (1,1) (1,1) (79,6); (sigma,sigma_0): (4582114181205014168160225155844053228244235822261788424600,2783482436059666500277668529356926191149524684658659112600) Tree 2. Subtrees: (1,1) (1,1) (79,5); (sigma,sigma_0): (4581166180783865272631653180689373914321794501641237519000,2791066439428857664506244330594360702529055249623066357400) Tree 3. Subtrees: (1,1) (1,1) (79,4); (sigma,sigma_0): (4578153018585946741208259932178222327650570333594489478040,2815171737012205915893390318683573395898848593997050685080) Tree 4. Subtrees: (1,1) (13,2) (67,3); (sigma,sigma_0): (4553963923281046420779384789177888290575602229892924783800,3008684499451408479324391462686245692498593423609568239000) Tree 5. Subtrees: (13,2) (13,2) (55,4); (sigma,sigma_0): (4543278683714986573449761102085941896885463636073027404800,3061397413236528492756232529955025584984898138935421970000) Tree 6. Subtrees: (13,2) (28,2) (40,2); (sigma,sigma_0): (4479574221518715132567204438867919138299957673477297745080,3375667187228855039351960709991562975522391469599378845080) Tree 7. Subtrees: (4,1) (4,1) (73,7); (sigma,sigma_0): (4423720226911748664815252282463560928816394610638997701816,3455193675643852217069095713934487066759730283679692773868) Tree 8. Subtrees: (4,1) (4,1) (73,6); (sigma,sigma_0): (4354631669157971257727243732039652586540966252806863441080,3553563907289367314270576638268528436913611675983649563080) Tree 9. Subtrees: (4,1) (4,1) (73,5); (sigma,sigma_0): (4348391920283117580146566319801839200007942445490727965880,3562448237230321085669627094364946325160827214134944018980) Tree 10. Subtrees: (0,1) (0,1) (81,6); (sigma,sigma_0): (4252151728443820480526071769999915806898122375562164847580,3658688429069618185290121644166869718270647284063507137280) Tree 11. Subtrees: (0,1) (0,1) (81,5); (sigma,sigma_0): (4242570951507280217782925331083834140386417117129576718060,3668269206006158448033268083082951384782352542496095266800) Tree 12. Subtrees: (0,1) (0,1) (81,4); (sigma,sigma_0): (4239265825290410932755098981785822644722890767022358021356,3671574332223027733061094432380962880445878892603313963504) Tree 13. Subtrees: (0,1) (0,1) (81,3); (sigma,sigma_0): (4234778646641240779228122848036229696573211572538247182060,3676061510872197886588070566130555828595558087087424802800) Tree 14. Subtrees: (0,1) (0,1) (81,2); (sigma,sigma_0): (4234223472335516562646077261147805092812021660065466092780,3676616685177922103170116153018980432356747999560205892080) Tree 15. Subtrees: (0,1) (0,1) (81,1); (sigma,sigma_0): (4231604412204222627408598000052829408648032250366210343660,3679235745309216038407595414113956116520737409259461641200) List L(83): Tree 1. Subtrees: (1,1) (1,1) (80,9); (sigma,sigma_0): (23181646049002061836582993934100212012343053486500590205200,13753897613428708755618447181619789962345515544011085539600) Tree 2. Subtrees: (1,1) (1,1) (80,8); (sigma,sigma_0): (23134678856905962801376768709739141504639809862582802448400,14129635150197501037268248976508354023971464535353387594000) Tree 3. Subtrees: (1,1) (1,1) (80,7); (sigma,sigma_0): (23134610207430373278215904175411486855176519315059651477520,14130184346002217222555165251129591219677788915538595361040) Tree 4. Subtrees: (1,1) (1,1) (80,6); (sigma,sigma_0): (23133682361682817873550968461006815432561142400233817309200,14137607111982660459874650966366962600600804234145268707600) Tree 5. Subtrees: (1,1) (5,2) (76,5); (sigma,sigma_0): (23122403034023816727324447717642719056732290020290099923600,14227841733254669629686816913279733607231623273695007792400) Tree 6. Subtrees: (13,2) (13,2) (56,5); (sigma,sigma_0): (22797210699513195153970725723259414023191968882586476529400,15832095469136167254585037879167541843428253147165602476200) Tree 7. Subtrees: (13,2) (29,5) (40,2); (sigma,sigma_0): (22790285687991862472641562654262196757031594211357050321720,15866258253510647966362459120521146338327721812581829999720) Tree 8. Subtrees: (4,1) (4,1) (74,6); (sigma,sigma_0): (21850291973299701768817661986594362922261355026104821893240,17324892708460368407633343518652382839687961447205934986020) Tree 9. Subtrees: (4,1) (4,1) (74,5); (sigma,sigma_0): (21667234479950068915890836165582315857567680019967933870200,17585535115983576122054546689585551414222510430553183753200) Tree 10. Subtrees: (4,1) (4,1) (74,4); (sigma,sigma_0): (21617035346182609068683728992834654530702018600626466068600,17657010054492322662316228582032905139388657256138984587900) Tree 11. Subtrees: (0,1) (0,1) (82,4); (sigma,sigma_0): (21224540192575594162441930619397798854801002343181267374200,18215855693124185683117539156711553162302408919571699135200) Tree 12. Subtrees: (0,1) (0,1) (82,3); (sigma,sigma_0): (21127783811355992880726430047396462706501129928375008597240,18312612074343786964833039728712889310602281334377957912160) Tree 13. Subtrees: (0,1) (0,1) (82,2); (sigma,sigma_0): (21115731162564318755032857053351856359816233256188016433400,18324664723135461090526612722757495657287178006564950076000) Tree 14. Subtrees: (0,1) (0,1) (82,1); (sigma,sigma_0): (21111939160879723172918569152733139104126467973705812811000,18328456724820056672640900623376212912976943289047153698400) List L(84): Tree 1. Subtrees: (1,1) (1,1) (81,11); (sigma,sigma_0): (118220967485357087078297519606934339901053488864111866304990,70986251940546295035176916669371396568581922364862203812702) Tree 2. Subtrees: (1,1) (1,1) (81,10); (sigma,sigma_0): (118136955498949579753739951081220963203185494074533756370270,71658347831806353631637464875078410151525880681487083290462) Tree 3. Subtrees: (1,1) (1,1) (81,9); (sigma,sigma_0): (118131856841879007395565403777407850732117112047141690861790,71699137088370932497033843305583309920072936900623607358302) Tree 4. Subtrees: (1,1) (1,1) (81,8); (sigma,sigma_0): (118092992189855637155388854284803779958973099602424656378590,72010054304557894418446239246415876105225036458359883223902) Tree 5. Subtrees: (13,2) (13,2) (57,6); (sigma,sigma_0): (117559566744153521086522367164749932702951494060802187600551,75101717890327003754970776684587372605875194365436956081100) Tree 6. Subtrees: (4,1) (12,1) (67,3); (sigma,sigma_0): (109929391404822741590035359346488465860689726536880449538800,88376068143900846805911837541185390688195160888573033972100) Tree 7. Subtrees: (4,1) (4,1) (75,5); (sigma,sigma_0): (109805724458025110123829853510527568594571094778118651005680,88552148620884193170880223780278152615930478373216297899140) Tree 8. Subtrees: (4,1) (4,1) (75,4); (sigma,sigma_0): (109796574584710733678833637305572511858698443530465096911600,88565176467849389320103351931473926757436655637941768474500) Tree 9. Subtrees: (0,1) (4,1) (79,1); (sigma,sigma_0): (107802098751175428655493316468263644154473188852973031478000,91404967254269774792789082186157841906616754583042775703200) Tree 10. Subtrees: (0,1) (0,1) (83,5); (sigma,sigma_0): (106717453869349936538984607783850609834160783354855407486800,92489612136095266909297790870570876226929160081160399694400) Tree 11. Subtrees: (0,1) (0,1) (83,4); (sigma,sigma_0): (106672336558713931954078524810394224330845373835080537944400,92534729446731271494203873844027261730244569600935269236800) Tree 12. Subtrees: (0,1) (0,1) (83,3); (sigma,sigma_0): (106668625175723710335418781952775538640383866175777201271120,92538440829721493112863616701645947420706077260238605910080) Tree 13. Subtrees: (0,1) (0,1) (83,2); (sigma,sigma_0): (106668350577821352242775323815464920042530703985684597387600,92538715427623851205507074838956566018559239450331209793600) Tree 14. Subtrees: (0,1) (0,1) (83,1); (sigma,sigma_0): (106480481809436956101950422918020638011717729490013446360400,92726584196008247346331975736400848049372213946002360820800) List L(85): Tree 1. Subtrees: (1,1) (1,1) (82,9); (sigma,sigma_0): (580216432725673073474728005943305540010936279789385382451000,352219745542932523991871871903948975200643338084748965236280) Tree 2. Subtrees: (1,1) (1,1) (82,8); (sigma,sigma_0): (580153255268315179989223647144397679472289413740309510764600,352725165201795671875906742295211859509818266477355938727480) Tree 3. Subtrees: (1,1) (1,1) (82,7); (sigma,sigma_0): (579453733621058183742457560571355607506750701617259151374648,358321338379851641850035434879548435234127963461758813847096) Tree 4. Subtrees: (1,1) (1,1) (82,6); (sigma,sigma_0): (578888211925662648256469044987761480635729625606021363436600,362845511943015925737943559548301450202296571551661117351480) Tree 5. Subtrees: (13,2) (13,2) (58,5); (sigma,sigma_0): (577029030294005456509879887380263762482391049118362940030410,377718964996273459710656820408283195429005183452928504601000) Tree 6. Subtrees: (4,1) (40,2) (40,2); (sigma,sigma_0): (561562232475583061394580691672373387893010342732882289971161,454020481204114707462094896456009631861986770907210160971161) Tree 7. Subtrees: (4,1) (4,1) (76,4); (sigma,sigma_0): (558798663767854609430989352856755391748906598703000640870361,457955328055548382230567720668090724028103234574756493382261) Tree 8. Subtrees: (0,1) (0,1) (84,4); (sigma,sigma_0): (544382023063980443040001656385630995941117434868058508738262,472371968759422548621555417139215119835892398409698625514360) Tree 9. Subtrees: (0,1) (0,1) (84,3); (sigma,sigma_0): (544226564455886962079295458415214712848541385089190370805462,472527427367516029582261615109631402928468448188566763447160) Tree 10. Subtrees: (0,1) (0,1) (84,2); (sigma,sigma_0): (544206169827604672646597269199962262964267856979622108771542,472547821995798319014959804324883852812741976298135025481080) Tree 11. Subtrees: (0,1) (0,1) (84,1); (sigma,sigma_0): (543870121881974643348366995097108756172795877821309669032662,472883869941428348313190078427737359604213955456447465219960) List L(86): Tree 1. Subtrees: (1,1) (1,1) (83,11); (sigma,sigma_0): (2885002519958571010877318886200761109626235360650271401963000,1719187755598623127157796380171221707238881189797682657310200) Tree 2. Subtrees: (1,1) (1,1) (83,10); (sigma,sigma_0): (2881028506528299984951620677669712945907737571043638765182200,1750979863040791334563382048419607016986863506650743751556600) Tree 3. Subtrees: (1,1) (1,1) (83,9); (sigma,sigma_0): (2880520240298904453998648717545642874973222749172806403691000,1755045992875955582187157729412167584462982081617402643486200) Tree 4. Subtrees: (1,1) (1,1) (83,8); (sigma,sigma_0): (2878666783178739421362764606107895898443199289735670412457720,1769873649837275843274230620914143396703169757114490573352440) Tree 5. Subtrees: (5,2) (13,2) (67,3); (sigma,sigma_0): (2862005977528164617427685647651708312928394226588741845451400,1903160095041874274754862288563644080821610262289919109403000) Tree 6. Subtrees: (13,2) (13,2) (59,5); (sigma,sigma_0): (2857240738986226537941441524905425946035920457606659408148400,1926668188320810318292375425848421659306068571897155388370000) Tree 7. Subtrees: (13,2) (32,3) (40,2); (sigma,sigma_0): (2818090157831155052525946558521611143597068666055086998290640,2119807630474246884673237386466822739742325955090976742990640) Tree 8. Subtrees: (4,1) (4,1) (77,8); (sigma,sigma_0): (2780925887032409994666950029140692822637888652567087768760528,2172723164482616312757628929276763083451783435233069395973944) Tree 9. Subtrees: (4,1) (4,1) (77,7); (sigma,sigma_0): (2737892771477618188082815710482793464060839962357599768338640,2233994924715903865491679550959592443613245339847750552824640) Tree 10. Subtrees: (4,1) (4,1) (77,6); (sigma,sigma_0): (2735110064394015400755869579427923022630797255729804581292240,2237957021325174240416179022715452896352505365495529246880940) Tree 11. Subtrees: (0,1) (0,1) (85,5); (sigma,sigma_0): (2685835086172295285750176369929338245358569379926380264722640,2308116121176021826039519549521055049929564196473451760121640) Tree 12. Subtrees: (0,1) (0,1) (85,4); (sigma,sigma_0): (2678398359645666518763819739499347372745215073975746571097880,2315552847702650593025876179951045922542918502424085453746400) Tree 13. Subtrees: (0,1) (0,1) (85,3); (sigma,sigma_0): (2676136272864084376819865677164970865261130769930795419345688,2317814934484232734969830242285422430027002806469036605498592) Tree 14. Subtrees: (0,1) (0,1) (85,2); (sigma,sigma_0): (2673338186275056391832801330872802577398975921438593981785880,2320613021073260719956894588577590717889157654961238043058400) Tree 15. Subtrees: (0,1) (0,1) (85,1); (sigma,sigma_0): (2673085476445624817890783895677171135244388457242290495040280,2320865730902692293898912023773222160043745119157541529804000) List L(87): Tree 1. Subtrees: (1,1) (1,1) (84,9); (sigma,sigma_0): (14581887903118475307833459893843457058535800590405553194722800,8731969998845209721094958633929355176512328297090815549718000) Tree 2. Subtrees: (1,1) (1,1) (84,8); (sigma,sigma_0): (14561693835303930344472139145365704773030519886795946032207600,8893522541361569427985524621751373460554573925967672849839600) Tree 3. Subtrees: (1,1) (1,1) (84,7); (sigma,sigma_0): (14561601192836622282966552456290534823579809292913453797005040,8894263681100033920030218134352733056160258677027610731460080) Tree 4. Subtrees: (1,1) (1,1) (84,6); (sigma,sigma_0): (14560349065000296264371221709701430738760358146355990586857200,8904280703790642068792864107065565734715867849487316412642800) Tree 5. Subtrees: (1,1) (9,2) (76,5); (sigma,sigma_0): (14545127612324474217538531966531582679579321859621943974990000,9026052325197218443454382052424350208164158143359689307580400) Tree 6. Subtrees: (13,2) (13,2) (60,5); (sigma,sigma_0): (14354372643941082205288133411787767318283946384681518404968200,9967093482048405726016224351441779543580583828620133574920600) Tree 7. Subtrees: (13,2) (33,5) (40,2); (sigma,sigma_0): (14348908552589769316435526980508568028669512049000935333969960,9994049188051540835694614664779099054179625400854704984483960) Tree 8. Subtrees: (4,1) (4,1) (78,6); (sigma,sigma_0): (13765642452623283599712796616220677134194578634551927594098120,10919397611273001435528665236524043396709424372421070949851260) Tree 9. Subtrees: (4,1) (4,1) (78,5); (sigma,sigma_0): (13653222399702162374559561941249127906514075145426712684934600,11079464444436082242436298201473768761902953754398183584187600) Tree 10. Subtrees: (4,1) (4,1) (78,4); (sigma,sigma_0): (13627831535498223367388052373636611974707853500069134145261000,11115616671007706336631670222547058047619234183042079590871300) Tree 11. Subtrees: (0,1) (4,1) (82,4); (sigma,sigma_0): (13496269457683633997801914423037791847040119340405614559622600,11302938457583557216374433046739518737208644734594239313391600) Tree 12. Subtrees: (0,1) (0,1) (86,5); (sigma,sigma_0): (13351184005154532744465604879170477332535187168644886491208600,11448023910112658469710742590606833251713576906354967381805600) Tree 13. Subtrees: (0,1) (0,1) (86,4); (sigma,sigma_0): (13284540782552233528725289045345726990475966916057172223183320,11514667132714957685451058424431583593772797158942681649830880) Tree 14. Subtrees: (0,1) (0,1) (86,3); (sigma,sigma_0): (13277126954071573398181752599594739084355873078308628258250200,11522080961195617815994594870182571499892890996691225614764000) Tree 15. Subtrees: (0,1) (0,1) (86,2); (sigma,sigma_0): (13275093889153991274369864759098458800617813790825298812285400,11524114026113199939806482710678851783630950284174555060728800) Tree 16. Subtrees: (0,1) (0,1) (86,1); (sigma,sigma_0): (13259197835432907170667071924974266145743822632398768265162200,11540010079834284043509275544803044438504941442601085607852000) List L(88): Tree 1. Subtrees: (1,1) (1,1) (85,7); (sigma,sigma_0): (74571832760751319826666471704154993069460041507727467486963945,45262691765196223363910137581397186731661434494943051910499241) Tree 2. Subtrees: (1,1) (1,1) (85,6); (sigma,sigma_0): (74543851627585569250535109398646860858500991099424915789818345,45486540830522227972961036025462244419333837761363465487664041) Tree 3. Subtrees: (13,2) (13,2) (61,5); (sigma,sigma_0): (74154984477668726636331440288127606208861240659582136050627914,47404918085491960316274511505847657997987260742704789195555400) Tree 4. Subtrees: (4,1) (16,1) (67,3); (sigma,sigma_0): (69398246783941122437582729116409882035945594715935913555018400,55680298322881804401910727903171608025177444813344286331029400) Tree 5. Subtrees: (4,1) (4,1) (79,3); (sigma,sigma_0): (69272810675855504032749066967523751652083080204245833738437280,55858897781464647794730532017503617888137939108309263257372440) Tree 6. Subtrees: (4,1) (4,1) (79,2); (sigma,sigma_0): (69263529905789190556961457134559201706444905846681655263511200,55872112002906723036623437424205096228704792832262947062491800) Tree 7. Subtrees: (4,1) (4,1) (79,1); (sigma,sigma_0): (68670291042518616924837012288166070741743036801557198783664800,56716782181274395258925625496510940903055696218778042323835600) Tree 8. Subtrees: (0,1) (0,1) (87,5); (sigma,sigma_0): (67206562774495115313608509918550680926481445581847465207540400,58180510449297896870154127866126330718317287438487775899960000) Tree 9. Subtrees: (0,1) (0,1) (87,4); (sigma,sigma_0): (67145676963791827126277750945871288689757300434911278760071600,58241396260001185057484886838805722955041432585423962347428800) Tree 10. Subtrees: (0,1) (0,1) (87,3); (sigma,sigma_0): (67140668452446523051896427959514872350479495848681425919480240,58246404771346489131866209825162139294319237171653815188020160) Tree 11. Subtrees: (0,1) (0,1) (87,2); (sigma,sigma_0): (67140297882577290805874081203214192552676653473151456978670000,58246775341215721377888556581462819092122079547183784128830400) Tree 12. Subtrees: (0,1) (0,1) (87,1); (sigma,sigma_0): (67059521611319110952428798209303183410655530658713028328609200,58327551612473901231333839575373828234143202361622212778891200) List L(89): Tree 1. Subtrees: (1,1) (1,1) (86,11); (sigma,sigma_0): (365272073735221315012293537133623921069536228348337714090318800,217552641979955918145764285964276397874044119774036801442533840) Tree 2. Subtrees: (1,1) (1,1) (86,10); (sigma,sigma_0): (364773164580726398847860893387450750199654921105828042885051600,221543915215915247461225435933661764833094577714114171084671440) Tree 3. Subtrees: (1,1) (1,1) (86,9); (sigma,sigma_0): (364744989671504920626175563810520186980175738701221616616206800,221769314489687073234708072549106270588928036950965581235429840) Tree 4. Subtrees: (1,1) (1,1) (86,8); (sigma,sigma_0): (364309279376512653584511203834108955974583120712850550611935184,225254996849625209568022952360396118633668980857934109269602768) Tree 5. Subtrees: (1,1) (1,1) (86,7); (sigma,sigma_0): (363932991134675359873688863974127157974871423076284558412942800,228265302784323559254601671240250502631362561950462046861541840) Tree 6. Subtrees: (13,2) (13,2) (62,6); (sigma,sigma_0): (362577647725197267090425368078261321441087600816781567749830290,237494280403869859084670249603869175544535255635198460649869000) Tree 7. Subtrees: (8,1) (40,2) (40,2); (sigma,sigma_0): (352961118003148494144827327471249483324287186985838621833087309,284934985782207456485089368341609609648218609829888462900087309) Tree 8. Subtrees: (4,1) (4,1) (80,5); (sigma,sigma_0): (351043267381248078167287174213265378506925854042553500298572109,287665675437218009703110406867137758890125663962026848834973209) Tree 9. Subtrees: (0,1) (0,1) (88,2); (sigma,sigma_0): (343661947340864504975101473620049687853337802159063128646937421,298175406510342277002140437594587443434003964397699663159273380) Tree 10. Subtrees: (0,1) (0,1) (88,1); (sigma,sigma_0): (343550022808201502670576024398017159009501600525852921858355021,298287331043005279306665886816619972277840166030909869947855780) List L(90): Tree 1. Subtrees: (1,1) (1,1) (87,11); (sigma,sigma_0): (1816585887357722015669918783257390338791602929586886095386493000,1093197826072374353821955068266061139610249666572854779329430600) Tree 2. Subtrees: (1,1) (1,1) (87,10); (sigma,sigma_0): (1815253821319849298302859136507577284998967121220292959581904200,1103854354375356092758432242264565569951336133505599865766141000) Tree 3. Subtrees: (1,1) (1,1) (87,9); (sigma,sigma_0): (1814996738819784415855247602135500561189429127061047476867709000,1105911014375875152339324517241179360427640086779563727479702600) Tree 4. Subtrees: (1,1) (1,1) (87,8); (sigma,sigma_0): (1813858485783958063450571101051413625259164029233654675912428360,1115017038662485971576736525913874847869760869398706135121947720) Tree 5. Subtrees: (9,2) (13,2) (67,3); (sigma,sigma_0): (1802316532779654848534421358737703078440592505901707005571045200,1207352662696911690905934464423559222418333056054287497853013000) Tree 6. Subtrees: (13,2) (13,2) (63,5); (sigma,sigma_0): (1800719252716198968878129877017357969799768051812551326385712200,1215232437947162661743989011536203958506338281567537213296650000) Tree 7. Subtrees: (13,2) (36,3) (40,2); (sigma,sigma_0): (1776701906547371306100219072427424789629518961011088394343878620,1333715911351553352518390861656198728901080468275076890677578620) Tree 8. Subtrees: (4,1) (4,1) (81,8); (sigma,sigma_0): (1751813970367955793891526178240526727584843124687092848013224924,1369152054857010204862408673887153196148284930541078361917903902) Tree 9. Subtrees: (4,1) (4,1) (81,7); (sigma,sigma_0): (1724992610039617815226758598948919150317523420058786647549382620,1407341062043257053390954699870711641124605369357553401250210620) Tree 10. Subtrees: (4,1) (4,1) (81,6); (sigma,sigma_0): (1724059862915217103087437528790379067032268175073090686091872220,1408669133632491661104948957967539220645994184971952533872329920) Tree 11. Subtrees: (0,1) (4,1) (85,5); (sigma,sigma_0): (1707543178672004895186590702555453107949039362648961697009606620,1432186053189721543057521880477814658481294583911776817155477620) Tree 12. Subtrees: (0,1) (0,1) (89,5); (sigma,sigma_0): (1683997267323024998749357127136759134530848254255600280513313040,1455731964538701439494755455896508631899485692305138233651771200) Tree 13. Subtrees: (0,1) (0,1) (89,4); (sigma,sigma_0): (1682492114355675823906067767696831942532001463709336311717343504,1457237117506050614338044815336435823898332482851402202447740736) Tree 14. Subtrees: (0,1) (0,1) (89,3); (sigma,sigma_0): (1680749273175706755739410327791187018509630991755852047700257040,1458979958686019682504702255242080747920702954804886466464827200) Tree 15. Subtrees: (0,1) (0,1) (89,2); (sigma,sigma_0): (1680636573538820842852669009483464765631714262137426342624877840,1459092658322905595391443573549803000798619684423312171540206400) Tree 16. Subtrees: (0,1) (0,1) (89,1); (sigma,sigma_0): (1678640936920841178194938434498772082152189033167387657803809040,1461088294940885260049174148534495684278144913393350856361275200) List L(91): Tree 1. Subtrees: (1,1) (1,1) (88,7); (sigma,sigma_0): (9192167634045569267483038027118151947876750538927927810202327200,5562293574444007970911797995341451730081185980926133101476848800) Tree 2. Subtrees: (1,1) (1,1) (88,6); (sigma,sigma_0): (9186161090554954709457778023048421496859144114846042688343882400,5610345922368924435113878027899295338222037373581214076344407200) Tree 3. Subtrees: (1,1) (1,1) (88,5); (sigma,sigma_0): (9186067122758033285515428473489655428659557599475705381285255840,5611097664744295826652674424369423883818729496543912532813419680) Tree 4. Subtrees: (1,1) (1,1) (88,4); (sigma,sigma_0): (9184797082163666399166487644232183358522949640044843323142372000,5621257989499230917444201058429200444911593171990808997956490400) Tree 5. Subtrees: (1,1) (13,2) (76,5); (sigma,sigma_0): (9169357873607891590955035248221133895734255486476698289358124800,5744771657945429383135820226517596147221146400535969268230468000) Tree 6. Subtrees: (13,2) (13,2) (64,5); (sigma,sigma_0): (9059033007732543930711025097282673989410426077918570655051407600,6289031345085658518567253095337579362667366420994819390059898800) Tree 7. Subtrees: (13,2) (37,5) (40,2); (sigma,sigma_0): (9054791707328058658273932322135406293728428542387562983939188480,6309954722720407058749639100476816493777720319002002776252760480) Tree 8. Subtrees: (4,1) (4,1) (82,6); (sigma,sigma_0): (8692875092298854271047478131094769993706732358721953681348711760,6898907146650764320079232779416143774432137113726590188540551480) Tree 9. Subtrees: (4,1) (4,1) (82,5); (sigma,sigma_0): (8623969281182294175743946499813448234407220973960963705770558800,6997017178494460237025081527861619482497261722106984118611788800) Tree 10. Subtrees: (4,1) (4,1) (82,4); (sigma,sigma_0): (8612411612003553226420969628823312473505109045452218048461886800,7013473312930597252760335705501871376437964057815725493959487800) Tree 11. Subtrees: (0,1) (0,1) (90,5); (sigma,sigma_0): (8416618793815531085043619899374371536180703079661115520137193800,7209266131118619394137685434950812313762370023606828022284180800) Tree 12. Subtrees: (0,1) (0,1) (90,4); (sigma,sigma_0): (8370450981798318225379020930119529348906416986333324838771661160,7255433943135832253802284404205654501036656116934618703649713440) Tree 13. Subtrees: (0,1) (0,1) (90,3); (sigma,sigma_0): (8365897969655012815760314925783181605185356595023753634950538600,7259986955279137663420990408542002244757716508244189907470836000) Tree 14. Subtrees: (0,1) (0,1) (90,2); (sigma,sigma_0): (8364869639654753285969868788294874709947204618386771704093757800,7261015285279397193211436546030309139995868484881171838327616800) Tree 15. Subtrees: (0,1) (0,1) (90,1); (sigma,sigma_0): (8359541375503262416501630201295622494776661384920399160875402600,7266343549430888062679675133029561355166411718347544381545972000) List L(92): Tree 1. Subtrees: (1,1) (1,1) (89,9); (sigma,sigma_0): (46919843751271930631120207369277621095896615696336891862595427421,27836617734610024902983219363224024716120361974884113420401931101) Tree 2. Subtrees: (1,1) (1,1) (89,8); (sigma,sigma_0): (46845107885863046952549327150771312228029036671016551849622626205,28434504657881094331550261111274495659060994177446833524184340829) Tree 3. Subtrees: (1,1) (1,1) (89,7); (sigma,sigma_0): (46825689648316305240776733099034223166753253174965789994085659805,28589850558255028025731013525171208149267262145852928368480072029) Tree 4. Subtrees: (1,1) (5,2) (85,6); (sigma,sigma_0): (46802825454929252579408843427278449775977389576871819803739121789,28772764105351449316674130899217395275474170930604689891252376157) Tree 5. Subtrees: (13,2) (13,2) (65,7); (sigma,sigma_0): (46594336053854422134877629262237717719197613441377535852048966002,29801293578745503338407863627934870830622677605132845402279652200) Tree 6. Subtrees: (4,1) (20,3) (67,3); (sigma,sigma_0): (43632104474040397892356217310777657726449343296107259704784887200,34954739964172542606013916987781491732749001363279022617432734200) Tree 7. Subtrees: (4,1) (4,1) (83,7); (sigma,sigma_0): (43530866125152147814619922091607656774953197452421277733406055840,35098885972648195548728290454138778243765974644620977416524859320) Tree 8. Subtrees: (4,1) (4,1) (83,6); (sigma,sigma_0): (43523375699530174967866316358145759213064864909445498305429085600,35109551051316981105922389242603081608251510628662663359874881400) Tree 9. Subtrees: (4,1) (4,1) (83,5); (sigma,sigma_0): (43171632025605028571904954432645211315572103050934146016638660000,35610373587042433689234562765434916407611321946738397380437811600) Tree 10. Subtrees: (0,1) (0,1) (91,5); (sigma,sigma_0): (42422203152376995746955961219402131730158168346442762425662967200,36677431494431566363820140992884535582937021945906793157432499200) Tree 11. Subtrees: (0,1) (0,1) (91,4); (sigma,sigma_0): (42360446318153896514110151635357933879003391732170182290525978400,36739188328654665596665950576928733434091798560179373292569488000) Tree 12. Subtrees: (0,1) (0,1) (91,3); (sigma,sigma_0): (42355366155776428968714388318328045598456959894446734057954443040,36744268491032133142061713893958621714638230397902821525141023360) Tree 13. Subtrees: (0,1) (0,1) (91,2); (sigma,sigma_0): (42354990284588743272944990120092981325658613832965384829719936800,36744644362219818837831112092193685987436576459384170753375529600) Tree 14. Subtrees: (0,1) (0,1) (91,1); (sigma,sigma_0): (42330964110626285040843950103814059521588188136637844342286157600,36768670536182277069932152108472607791507002155711711240809308800) List L(93): Tree 1. Subtrees: (1,1) (1,1) (90,11); (sigma,sigma_0): (229970904876574575265795247257571839886675041744919613755728703900,138310997472432396510113846906991701743872188374565897457778136220) Tree 2. Subtrees: (1,1) (1,1) (90,10); (sigma,sigma_0): (229803673448612051660799173141943214550957350019125307741270764700,139648848896132585350082439832020704429613722180920345573441649820) Tree 3. Subtrees: (1,1) (1,1) (90,9); (sigma,sigma_0): (229794229383977494450388547306587996207694140663645136131513471900,139724401413209043033367446514862451175719397024761718451499992220) Tree 4. Subtrees: (1,1) (1,1) (90,8); (sigma,sigma_0): (229522663110653072416407775566260469487862528654283535851817068572,141896931599804419305213620437482664934372293099654520689071218844) Tree 5. Subtrees: (1,1) (1,1) (90,7); (sigma,sigma_0): (229270672756836490355294760012618126609660185811503080945219199900,143912854430337075794117744866621407959991035841898159941854168220) Tree 6. Subtrees: (13,2) (13,2) (66,6); (sigma,sigma_0): (228282627411326960716295671504531931776531779384325400751810180110,149639435043265554838675297741246794502614692273277104697511171000) Tree 7. Subtrees: (12,1) (40,2) (40,2); (sigma,sigma_0): (222301441477197510733443572738257273786355741859054947147891486531,179146095753054297237040517687056719300476539072797954024248486531) Tree 8. Subtrees: (4,1) (4,1) (84,5); (sigma,sigma_0): (220963387168255972110997878277489038992133159093416475258740049731,181051255110902698908452453745455241107094239924654293882044184631) Tree 9. Subtrees: (0,1) (4,1) (88,2); (sigma,sigma_0): (218177528005118087072116736790003484832493827636806607330836218179,185017839739667382879828141527441508650799459908772640990329132290) Tree 10. Subtrees: (0,1) (0,1) (92,4); (sigma,sigma_0): (215984065925068459634309504608331194379383729238091969106208863313,187211301819717010317635373709113799103909558307487279214956487156) Tree 11. Subtrees: (0,1) (0,1) (92,3); (sigma,sigma_0): (215892609151520248988837945921308100816280274845716088344822711249,187302758593265220963106932396136892667013012699863159976342639220) Tree 12. Subtrees: (0,1) (0,1) (92,2); (sigma,sigma_0): (215814936201333282141747569714359744571177140861513040922674845649,187380431543452187810197308603085248912116146684066207398490504820) Tree 13. Subtrees: (0,1) (0,1) (92,1); (sigma,sigma_0): (215515992739697747427464048840334509099706824760231680870783640785,187679375005087722524480829477110484383586462785347567450381709684) List L(94): Tree 1. Subtrees: (1,1) (1,1) (91,10); (sigma,sigma_0): (1146467632599846035516760025086808078445943532381836093538820050000,697605340572287811340098539934688310353913832681629661925412830800) Tree 2. Subtrees: (1,1) (1,1) (91,9); (sigma,sigma_0): (1146350611199411283404864884268032953866809649105685043758569746000,698541511775765828235259666484889306986984898890838060167415262800) Tree 3. Subtrees: (1,1) (1,1) (91,8); (sigma,sigma_0): (1145652939861856112439916626501309571053902096334980020255840947280,704122882476207195954845728618676369490245321056478248189245652560) Tree 4. Subtrees: (13,2) (13,2) (67,3); (sigma,sigma_0): (1137613498084155358309183873172342133398141564485182468308334690100,768438416697813229000707755250415870736329575854858663769295710000) Tree 5. Subtrees: (13,2) (40,2) (40,2); (sigma,sigma_0): (1122911639486622660924922605199630821660191610672108487468783792210,840966299665863279299495238842398485854635528944565934649662792210) Tree 6. Subtrees: (4,1) (4,1) (85,6); (sigma,sigma_0): (1106136423104824361023990400078958694366021373164098765177750377042,864851324553228436775627226211480479599655261646400090021075604041) Tree 7. Subtrees: (4,1) (4,1) (85,5); (sigma,sigma_0): (1089406790480806781169283498131082425249629233016665292458633904210,888671446004222217467192326836483995587643289317257515044973863210) Tree 8. Subtrees: (0,1) (0,1) (93,5); (sigma,sigma_0): (1060995545457683037215296784917093914398631779087910483722730967820,917082691027345961421179040050472506438640743246012323780876799600) Tree 9. Subtrees: (0,1) (0,1) (93,4); (sigma,sigma_0): (1059987584042416708970844722702524542885822407716788664096339493132,918090652442612289665631102265041877951450114617134143407268274288) Tree 10. Subtrees: (0,1) (0,1) (93,3); (sigma,sigma_0): (1058901318949119020834921635741214436006495959679342262977553879820,919176917535909977801554189226351984830776562654580544526053887600) Tree 11. Subtrees: (0,1) (0,1) (93,2); (sigma,sigma_0): (1058863542690580791993279132399793562633443122257421576538524708620,919214693794448206643196692567772858203829400076501230965083058800) Tree 12. Subtrees: (0,1) (0,1) (93,1); (sigma,sigma_0): (1058194616978730697573294835937279061290572355354244352480692951820,919883619506298301063180989030287359546700166979678455022914815600) List L(95): Tree 1. Subtrees: (1,1) (1,1) (92,10); (sigma,sigma_0): (5783554070986156902787921882316182947450781040599898518554380292000,3436198455342536655503432858771572670142811636061863756478700343200) Tree 2. Subtrees: (1,1) (1,1) (92,9); (sigma,sigma_0): (5775966103644723070435313326032096766648464951716923259695751402400,3496902194074007314324301309044262116561340347125665827347731460000) Tree 3. Subtrees: (1,1) (1,1) (92,8); (sigma,sigma_0): (5772404698946230963176204536536403719186350737899495817771748343200,3525393431661944172397171625009806496258254057665085362739755933600) Tree 4. Subtrees: (1,1) (1,1) (92,7); (sigma,sigma_0): (5772328858386808488102824278485102006372231370901866051063481519520,3526000156137323972984213689420220198771208993646123496405890523040) Tree 5. Subtrees: (1,1) (1,1) (92,6); (sigma,sigma_0): (5771303820104314956065744289391005746738332894234545483603270852000,3534200462397272229280853602172990275842396806984688036087575863200) Tree 6. Subtrees: (5,2) (13,2) (76,5); (sigma,sigma_0): (5758842974450038853084292315363120158077938238743030473613717080400,3633887227631481053132469394396074985125554050916808116004006036000) Tree 7. Subtrees: (13,2) (13,2) (68,6); (sigma,sigma_0): (5694249685532476482100083763535838932419711569194612896740103870800,3952541802361279176870457953300166585042324864356704539111050490400) Tree 8. Subtrees: (13,2) (40,2) (41,6); (sigma,sigma_0): (5691209054935248665360857077236550979436981038150798782943526658840,3967541980647704894588170433549900277334828795801553757397292234840) Tree 9. Subtrees: (4,1) (4,1) (86,7); (sigma,sigma_0): (5466639795309627343086842251695836155273518556186288210686135854080,4340087108362763104449212301794521411642117108286784439414447141840) Tree 10. Subtrees: (4,1) (4,1) (86,6); (sigma,sigma_0): (5424292643208046509143011493806184351440222802188917784711337190400,4400382174538646752779393205117873296396946414271321627960596020400) Tree 11. Subtrees: (4,1) (4,1) (86,5); (sigma,sigma_0): (5419138331946701998622646309417642164238991688280633031504877286400,4407721027877553292172647539921090590283074308879016130084637563400) Tree 12. Subtrees: (0,1) (0,1) (94,4); (sigma,sigma_0): (5318892409034434662237443247939784404328895833795588537002634470400,4550453992336621433236735492689368533592566257940729873233338760400) Tree 13. Subtrees: (0,1) (0,1) (94,3); (sigma,sigma_0): (5286734641923631645714512234623914653705853706396398329212609441680,4582611759447424449759666506005238284215608385339920081023363789120) Tree 14. Subtrees: (0,1) (0,1) (94,2); (sigma,sigma_0): (5283943956573410961854719203557021122454223495313578235201694246800,4585402444797645133619459537072131815467238596422740175034278984000) Tree 15. Subtrees: (0,1) (0,1) (94,1); (sigma,sigma_0): (5283475870971671953407138640281920624137687962208974036080693030800,4585870530399384142067040100347232313783774129527344374155280200000) List L(96): Tree 1. Subtrees: (1,1) (1,1) (93,9); (sigma,sigma_0): (29513521511753277557150456737746538825083165472742784217178798139059,17672379768414565052841455679990282271432000038581335193797733672499) Tree 2. Subtrees: (1,1) (1,1) (93,8); (sigma,sigma_0): (29485314687726506471131785180185747589216817241744609304408771844595,17898034360628733740990828140476612158362785886566734495957944028211) Tree 3. Subtrees: (1,1) (1,1) (93,7); (sigma,sigma_0): (29471766887848473392579522523770469211925313591242519776531113546995,18006416759652998369408929391798839176694815090583450718979210409011) Tree 4. Subtrees: (1,1) (9,2) (85,6); (sigma,sigma_0): (29440911658872645826063555411736053021073285665614707004658460494403,18253258591459618901536666288074168703511038495605952893960434829747) Tree 5. Subtrees: (13,2) (13,2) (69,7); (sigma,sigma_0): (29335457128617721355069333497976862095312945863600633091586821175326,18773491715594238711896376196041202252654754961098348354107481008600) Tree 6. Subtrees: (4,1) (24,3) (67,3); (sigma,sigma_0): (27489609745359061897267574450096579217234596709114074122519184637600,21984744876936037875535673717014913646999898654375226493959146374600) Tree 7. Subtrees: (4,1) (4,1) (87,7); (sigma,sigma_0): (27409728927128303431887724539733485138613645088593034761734930153120,22098481432581004518625342827668615958161370785937409490075789966760) Tree 8. Subtrees: (4,1) (4,1) (87,6); (sigma,sigma_0): (27403818703046712611242142078514087241730067482532409953831209008800,22106896575853425823802353792959516479310058432066697546641830424200) Tree 9. Subtrees: (4,1) (4,1) (87,5); (sigma,sigma_0): (27197488952071423544228800101870375483726169956753639744256409546400,22400674678316288577420959849547926384749201588888423098946574190000) Tree 10. Subtrees: (0,1) (4,1) (91,5); (sigma,sigma_0): (26946284780937004949056410431216181920536637843425886750726876925600,22758346242294786928750397486084854329212422117435165154186865753600) Tree 11. Subtrees: (0,1) (0,1) (95,6); (sigma,sigma_0): (26669259125431636465469638655848555617437307005888930010458874357600,23035371897800155412337169261452480632311752954972121894454868321600) Tree 12. Subtrees: (0,1) (0,1) (95,5); (sigma,sigma_0): (26619415742814532053543830759737013262795728383922869970500659271200,23085215280417259824262977157564022986953331576938181934413083408000) Tree 13. Subtrees: (0,1) (0,1) (95,4); (sigma,sigma_0): (26615315589684557925395510803360628224260134477253587700659816601120,23089315433547233952411297113940408025488925483607464204253926078080) Tree 14. Subtrees: (0,1) (0,1) (95,3); (sigma,sigma_0): (26615012227446868025101989771155421373003657009263068633826749306400,23089618795784923852704818146145614876745402951597983271086993372800) Tree 15. Subtrees: (0,1) (0,1) (95,2); (sigma,sigma_0): (26600766608652899596065554613172649183155200153993358866130737069600,23103864414578892281741253304128387066593859806867693038783005609600) Tree 16. Subtrees: (0,1) (0,1) (95,1); (sigma,sigma_0): (26570414739287164266655120388036304459945935798461457830696221511200,23134216283944627611151687529264731789803124162399594074217521168000) List L(97): Tree 1. Subtrees: (1,1) (1,1) (94,7); (sigma,sigma_0): (145116922573215571192612272266152652162829138390654369652027673486450,88241950028945349274711963348617676445219967874349888689149346241010) Tree 2. Subtrees: (1,1) (1,1) (94,6); (sigma,sigma_0): (144947535042897393196583364883930404938025667971661605740746619199026,89597050271490773242943222406395654243647731226291999979397780540402) Tree 3. Subtrees: (1,1) (1,1) (94,5); (sigma,sigma_0): (144777685977031685410086426307083599649172194316893007302549905870450,90955842798416435534918731021170096554475520464440787484971487169010) Tree 4. Subtrees: (13,2) (13,2) (70,5); (sigma,sigma_0): (144057400920155238303256090784688763615821586031480478441554730443540,94509186068738556782066692579875148904173499280111422705856657394000) Tree 5. Subtrees: (16,1) (40,2) (40,2); (sigma,sigma_0): (140335774830902836725087256378959579065104048185278972702302598827634,112868882542587033321366670840881814624474466524544857149414788827634) Tree 6. Subtrees: (4,1) (4,1) (88,3); (sigma,sigma_0): (139397599721624463069249203559559037111857576212613691545862245752434,114204682649352530186807960890379851897749228376249915670987088421034) Tree 7. Subtrees: (4,1) (4,1) (88,2); (sigma,sigma_0): (138976982303977174433111747764185136754276258947130185196728892199026,114803569558463611076933361817777456117821064873393423734499226585945) Tree 8. Subtrees: (0,1) (0,1) (96,4); (sigma,sigma_0): (136016905226950202205790887935018380787804181158064780912594276807359,117763646635490583304254221646944212084293142662458828018633841977612) Tree 9. Subtrees: (0,1) (0,1) (96,3); (sigma,sigma_0): (135893484311046891939727019486880716024396069455553529825103664596991,117887067551393893570318090095081876847701254364970079106124454187980) Tree 10. Subtrees: (0,1) (0,1) (96,2); (sigma,sigma_0): (135839293111534759625517968861219602515230054853545171713593031406591,117941258750906025884527140720742990356867268966978437217635087378380) Tree 11. Subtrees: (0,1) (0,1) (96,1); (sigma,sigma_0): (135726465815427675281443282630976437571764661929552472062512926228735,118054086047013110228601826950986155300332661890971136868715192556236) List L(98): Tree 1. Subtrees: (1,1) (1,1) (95,12); (sigma,sigma_0): (722059340641332979368383974615242122900564803045649383384147072768000,430830285131789207641232903083122536750640562537442671497213392102400) Tree 2. Subtrees: (1,1) (1,1) (95,11); (sigma,sigma_0): (721044350671846272587483793617778813081475082518988307877311864256000,438950204887682861888434351062829015303358326750731275551895060198400) Tree 3. Subtrees: (1,1) (1,1) (95,10); (sigma,sigma_0): (720992163270325159418465096125844823436062617490666924751096457728000,439367704099851767240583930998300932466658046977302340561618312422400) Tree 4. Subtrees: (1,1) (1,1) (95,9); (sigma,sigma_0): (720563398355296653474783809702212098922250497981443549188101621258240,442797823420079814790034222387362728577155003051089345065577004180480) Tree 5. Subtrees: (13,2) (13,2) (71,5); (sigma,sigma_0): (714702645299352803713479632525394836871201070262941133818369559774020,482705612404586358294991609912357089100350283153484392932998064822000) Tree 6. Subtrees: (17,3) (40,2) (40,2); (sigma,sigma_0): (705423867119394893981480627597459783074643113820663117844994469626042,528480106388321398065324325975673398817507386523499347603605920626042) Tree 7. Subtrees: (4,1) (4,1) (89,7); (sigma,sigma_0): (695014845354489048892952194320082728088610481446943085163408235514298,543588711575406936011059815319249375527551535220337330551322935932029) Tree 8. Subtrees: (4,1) (4,1) (89,6); (sigma,sigma_0): (684613144158382534079705633415066612706874994143535278767953414082490,558398946286269532297889391295336774186311633353509773641726382853490) Tree 9. Subtrees: (0,1) (0,1) (97,3); (sigma,sigma_0): (670066586706543177175264436249504495151164297732012816695171110650810,579110743908126741640345705228334398596688777267572029210199623481800) Tree 10. Subtrees: (0,1) (0,1) (97,2); (sigma,sigma_0): (669387190443080346029276681942117273995750403112938422942384257336506,579790140171589572786333459535721619752102671886646422962986476796104) Tree 11. Subtrees: (0,1) (0,1) (97,1); (sigma,sigma_0): (668709640321807634045161052413228285096536521436967367297260040186810,580467690292862284770449089064610608651316553562617478608110693945800) List L(99): Tree 1. Subtrees: (1,1) (1,1) (96,10); (sigma,sigma_0): (3639183226762763764313594684037941412633062680833347396676836439204000,2182649067255897400873569244928510735563467665317496826808877030973600) Tree 2. Subtrees: (1,1) (1,1) (96,9); (sigma,sigma_0): (3636639784530027776037474238622567702805768668185903897617349921418400,2202996605117785307082532808251500414181819766497044819284769173258400) Tree 3. Subtrees: (1,1) (1,1) (96,8); (sigma,sigma_0): (3634550695801402974233964151109050121255979205737393849245405076861600,2219709314946783721510613508359641066580135466085125206260327929712800) Tree 4. Subtrees: (1,1) (1,1) (96,7); (sigma,sigma_0): (3634490854782576867174927628689203717550032982476030023065379900275360,2220188043097392577982905687718412296227705252176035815700529342402720) Tree 5. Subtrees: (1,1) (1,1) (96,6); (sigma,sigma_0): (3633682061497990437712956648346777390003995847318254499537439323620000,2226658389374084013678673530457822916596002333438240003924053955645600) Tree 6. Subtrees: (9,2) (13,2) (76,5); (sigma,sigma_0): (3623849991362102514472492537743565951827213722281160774791154916406200,2305314950461187399602386415283514422010259333734989801894329213356000) Tree 7. Subtrees: (13,2) (13,2) (72,6); (sigma,sigma_0): (3586586194259803294528549746773832114897536283625093220476868728526400,2489146423009446589434638190194645138498528874427681695943412744058200) Tree 8. Subtrees: (13,2) (40,2) (45,6); (sigma,sigma_0): (3584401392179661044156883846440546254516766766192471973393808982713220,2499924588812476584460159875989955105793715451095395350784979057971220) Tree 9. Subtrees: (4,1) (4,1) (90,7); (sigma,sigma_0): (3445056166581963013685857647192532706123338296133493163308097988359640,2736264848937382148470131489283100797437419190992918025449514928968220) Tree 10. Subtrees: (4,1) (4,1) (90,6); (sigma,sigma_0): (3419077849497494496308686403406581447399763503698059403463019003338200,2773253507442416424188799139126769679487196581003525859291434030688200) Tree 11. Subtrees: (4,1) (4,1) (90,5); (sigma,sigma_0): (3417350154536133064712480898293841231469087484724153428993363944394200,2775713448119823618785740180586120494747866147081606826846860862661200) Tree 12. Subtrees: (0,1) (4,1) (94,4); (sigma,sigma_0): (3383748308017579443264910326791306344860971623850414852229103273418200,2823556702244873599323394373213753175094187363052222886341286700828200) Tree 13. Subtrees: (0,1) (0,1) (98,4); (sigma,sigma_0): (3325051416841266428689169461196211124266156994976863541817983489213440,2882253593421186613899135238808848395689001991925774196752406485032960) Tree 14. Subtrees: (0,1) (0,1) (98,3); (sigma,sigma_0): (3323336357181152404914444315501680226210908516939970039566004143334400,2883968653081300637673860384503379293744250469962667699004385830912000) Tree 15. Subtrees: (0,1) (0,1) (98,2); (sigma,sigma_0): (3323127607575067952238369525533944267629258656826684507061142517222400,2884177402687385090349935174471115252325900330075953231509247457024000) Tree 16. Subtrees: (0,1) (0,1) (98,1); (sigma,sigma_0): (3319067647697121125114768801544091028352899774720040205033801683174400,2888237362565331917473535898460968491602259212182597533536588291072000) List L(100): Tree 1. Subtrees: (1,1) (1,1) (97,7); (sigma,sigma_0): (18604564018363822238005786725236753268636925126614724119942990769621586,11257135566622151129082051568898996077096376974717545000935040268121106) Tree 2. Subtrees: (1,1) (1,1) (97,6); (sigma,sigma_0): (18600305267010143440564894985308592527516414289301703618158015564893330,11291205577451581508609185488324282006060463673221709015214841905947154) Tree 3. Subtrees: (1,1) (1,1) (97,5); (sigma,sigma_0): (18590806244028699907299534700512162040239793760578467646449056990006930,11367197761303129774732067766695725904273427903007596788886510505038354) Tree 4. Subtrees: (1,1) (13,2) (85,6); (sigma,sigma_0): (18559509604651390248866364452447246827248794706291752209574121261112538,11617570876321607042197429751215047608201420337301320283885996336193490) Tree 5. Subtrees: (13,2) (13,2) (73,7); (sigma,sigma_0): (18511507749956863315275911785707486094793235589595853590869251674410748,11854375826963579806843723807711217261514992030047206716796557486522800) Tree 6. Subtrees: (4,1) (28,2) (67,3); (sigma,sigma_0): (17360485869104487265943664779070269458216223290343452690808572260400800,13856828839701536414189329408232100979521882586907600307226566597190800) Tree 7. Subtrees: (4,1) (4,1) (91,7); (sigma,sigma_0): (17298481315210759754202142917803118494521297422039523745282592615718560,13945112667413503906493175964606618660251571957988780387868049333466880) Tree 8. Subtrees: (4,1) (4,1) (91,6); (sigma,sigma_0): (17293893720645411438119265795087496354360506282646818024475049546186400,13951644613581743989353366242848197840285198404506910213002226868015600) Tree 9. Subtrees: (4,1) (4,1) (91,5); (sigma,sigma_0): (17174561038014092226092705077116389925351661188115756022050618344496800,14121553843343915289289621640115652111276307923868519978172950200108800) Tree 10. Subtrees: (0,1) (0,1) (99,6); (sigma,sigma_0): (16800714915909597457492356566257778229319114222859632901058948878980800,14495399965448410057889970150974263807308854889124643099164619665624800) Tree 11. Subtrees: (0,1) (0,1) (99,5); (sigma,sigma_0): (16761386635366045764530500123844932476611985722711258002073811250125600,14534728245991961750851826593387109560015983389273017998149757294480000) Tree 12. Subtrees: (0,1) (0,1) (99,4); (sigma,sigma_0): (16758151462227700046682616202475227166427837182080155907962048943504160,14537963419130307468699710514756814870200131929904120092261519601101440) Tree 13. Subtrees: (0,1) (0,1) (99,3); (sigma,sigma_0): (16757912098152395618446470112795841551604052289034700603241948237159200,14538202783205611896935856604436200485023916822949575396981620307446400) Tree 14. Subtrees: (0,1) (0,1) (99,2); (sigma,sigma_0): (16749555743237896411232429762741771225404894439240660409754168858932000,14546559138120111104149896954490270811223074672743615590469399685673600) Tree 15. Subtrees: (0,1) (0,1) (99,1); (sigma,sigma_0): (16739381974306952458127947981080276386095718388650886413516222787789600,14556732907051055057254378736151765650532250723333389586707345756816000)