Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/GAP/tst/teststandard/   (GAP Algebra Version 4.15.1©)  Datei vom 18.9.2025 mit Größe 105 kB image not shown  

Quelle  grpprmcs.tst   Sprache: unbekannt

 
Spracherkennung für: .tst vermutete Sprache: Unknown {[0] [0] [0]} [Methode: Schwerpunktbildung, einfache Gewichte, sechs Dimensionen]

#############################################################################
##
##  Exclude from testinstall.g as it takes considerable time.
##
gap> START_TEST("grpprmcs.tst");

# we don't want `DisplayCompositionSeries' to display the number of
# generators as this may differ, so we provide our own version of it.
gap> CustomDisplayCompositionSeries := function( S )
>   local   f,  i;
>   S := CompositionSeries( S );
>   Perform( S, Size );
>   Print( "Group\n" );
>   for i  in [2..Length(S)]  do
>     f:=Image(NaturalHomomorphismByNormalSubgroup(S[i-1],S[i]));
>     Print( " | ",IsomorphismTypeInfoFiniteSimpleGroup(f).name,"\n");
>     Print( "Group\n" );;
>   od;
> end;;

# missing (?):
# bbox
# dim8p3
# fi23.grp
# gl83.gen
# proba
# agl10.2
gap> g:=
> Group( (   1,   2)(   3,   4)(   5,   6)(   7,   8)(   9,  10)
> (  11,  12)(  13,  14)(  15,  16)(  17,  18)(  19,  20)(  21,  22)
> (  23,  24)(  25,  26)(  27,  28)(  29,  30)(  31,  32)(  33,  34)
> (  35,  36)(  37,  38)(  39,  40)(  41,  42)(  43,  44)(  45,  46)
> (  47,  48)(  49,  50)(  51,  52)(  53,  54)(  55,  56)(  57,  58)
> (  59,  60)(  61,  62)(  63,  64)(  65,  66)(  67,  68)(  69,  70)
> (  71,  72)(  73,  74)(  75,  76)(  77,  78)(  79,  80)(  81,  82)
> (  83,  84)(  85,  86)(  87,  88)(  89,  90)(  91,  92)(  93,  94)
> (  95,  96)(  97,  98)(  99100)( 101102)( 103104)( 105106)
> ( 107108)( 109110)( 111112)( 113114)( 115116)( 117118)
> ( 119120)( 121122)( 123124)( 125126)( 127128)( 129130)
> ( 131132)( 133134)( 135136)( 137138)( 139140)( 141142)
> ( 143144)( 145146)( 147148)( 149150)( 151152)( 153154)
> ( 155156)( 157158)( 159160)( 161162)( 163164)( 165166)
> ( 167168)( 169170)( 171172)( 173174)( 175176)( 177178)
> ( 179180)( 181182)( 183184)( 185186)( 187188)( 189190)
> ( 191192)( 193194)( 195196)( 197198)( 199200)( 201202)
> ( 203204)( 205206)( 207208)( 209210)( 211212)( 213214)
> ( 215216)( 217218)( 219220)( 221222)( 223224)( 225226)
> ( 227228)( 229230)( 231232)( 233234)( 235236)( 237238)
> ( 239240)( 241242)( 243244)( 245246)( 247248)( 249250)
> ( 251252)( 253254)( 255256)( 257258)( 259260)( 261262)
> ( 263264)( 265266)( 267268)( 269270)( 271272)( 273274)
> ( 275276)( 277278)( 279280)( 281282)( 283284)( 285286)
> ( 287288)( 289290)( 291292)( 293294)( 295296)( 297298)
> ( 299300)( 301302)( 303304)( 305306)( 307308)( 309310)
> ( 311312)( 313314)( 315316)( 317318)( 319320)( 321322)
> ( 323324)( 325326)( 327328)( 329330)( 331332)( 333334)
> ( 335336)( 337338)( 339340)( 341342)( 343344)( 345346)
> ( 347348)( 349350)( 351352)( 353354)( 355356)( 357358)
> ( 359360)( 361362)( 363364)( 365366)( 367368)( 369370)
> ( 371372)( 373374)( 375376)( 377378)( 379380)( 381382)
> ( 383384)( 385386)( 387388)( 389390)( 391392)( 393394)
> ( 395396)( 397398)( 399400)( 401402)( 403404)( 405406)
> ( 407408)( 409410)( 411412)( 413414)( 415416)( 417418)
> ( 419420)( 421422)( 423424)( 425426)( 427428)( 429430)
> ( 431432)( 433434)( 435436)( 437438)( 439440)( 441442)
> ( 443444)( 445446)( 447448)( 449450)( 451452)( 453454)
> ( 455456)( 457458)( 459460)( 461462)( 463464)( 465466)
> ( 467468)( 469470)( 471472)( 473474)( 475476)( 477478)
> ( 479480)( 481482)( 483484)( 485486)( 487488)( 489490)
> ( 491492)( 493494)( 495496)( 497498)( 499500)( 501502)
> ( 503504)( 505506)( 507508)( 509510)( 511512)( 513514)
> ( 515516)( 517518)( 519520)( 521522)( 523524)( 525526)
> ( 527528)( 529530)( 531532)( 533534)( 535536)( 537538)
> ( 539540)( 541542)( 543544)( 545546)( 547548)( 549550)
> ( 551552)( 553554)( 555556)( 557558)( 559560)( 561562)
> ( 563564)( 565566)( 567568)( 569570)( 571572)( 573574)
> ( 575576)( 577578)( 579580)( 581582)( 583584)( 585586)
> ( 587588)( 589590)( 591592)( 593594)( 595596)( 597598)
> ( 599600)( 601602)( 603604)( 605606)( 607608)( 609610)
> ( 611612)( 613614)( 615616)( 617618)( 619620)( 621622)
> ( 623624)( 625626)( 627628)( 629630)( 631632)( 633634)
> ( 635636)( 637638)( 639640)( 641642)( 643644)( 645646)
> ( 647648)( 649650)( 651652)( 653654)( 655656)( 657658)
> ( 659660)( 661662)( 663664)( 665666)( 667668)( 669670)
> ( 671672)( 673674)( 675676)( 677678)( 679680)( 681682)
> ( 683684)( 685686)( 687688)( 689690)( 691692)( 693694)
> ( 695696)( 697698)( 699700)( 701702)( 703704)( 705706)
> ( 707708)( 709710)( 711712)( 713714)( 715716)( 717718)
> ( 719720)( 721722)( 723724)( 725726)( 727728)( 729730)
> ( 731732)( 733734)( 735736)( 737738)( 739740)( 741742)
> ( 743744)( 745746)( 747748)( 749750)( 751752)( 753754)
> ( 755756)( 757758)( 759760)( 761762)( 763764)( 765766)
> ( 767768)( 769770)( 771772)( 773774)( 775776)( 777778)
> ( 779780)( 781782)( 783784)( 785786)( 787788)( 789790)
> ( 791792)( 793794)( 795796)( 797798)( 799800)( 801802)
> ( 803804)( 805806)( 807808)( 809810)( 811812)( 813814)
> ( 815816)( 817818)( 819820)( 821822)( 823824)( 825826)
> ( 827828)( 829830)( 831832)( 833834)( 835836)( 837838)
> ( 839840)( 841842)( 843844)( 845846)( 847848)( 849850)
> ( 851852)( 853854)( 855856)( 857858)( 859860)( 861862)
> ( 863864)( 865866)( 867868)( 869870)( 871872)( 873874)
> ( 875876)( 877878)( 879880)( 881882)( 883884)( 885886)
> ( 887888)( 889890)( 891892)( 893894)( 895896)( 897898)
> ( 899900)( 901902)( 903904)( 905906)( 907908)( 909910)
> ( 911912)( 913914)( 915916)( 917918)( 919920)( 921922)
> ( 923924)( 925926)( 927928)( 929930)( 931932)( 933934)
> ( 935936)( 937938)( 939940)( 941942)( 943944)( 945946)
> ( 947948)( 949950)( 951952)( 953954)( 955956)( 957958)
> ( 959960)( 961962)( 963964)( 965966)( 967968)( 969970)
> ( 971972)( 973974)( 975976)( 977978)( 979980)( 981982)
> ( 983984)( 985986)( 987988)( 989990)( 991992)( 993994)
> ( 995996)( 997998)( 999,1000)(1001,1002)(1003,1004)(1005,1006)
> (1007,1008)(1009,1010)(1011,1012)(1013,1014)(1015,1016)(1017,1018)
> (1019,1020)(1021,1022)(1023,1024), (257,513)(258,514)(259,515)(260,516)
> (261,517)(262,518)(263,519)(264,520)(265,521)(266,522)(267,523)
> (268,524)(269,525)(270,526)(271,527)(272,528)(273,529)(274,530)
> (275,531)(276,532)(277,533)(278,534)(279,535)(280,536)(281,537)
> (282,538)(283,539)(284,540)(285,541)(286,542)(287,543)(288,544)
> (289,545)(290,546)(291,547)(292,548)(293,549)(294,550)(295,551)
> (296,552)(297,553)(298,554)(299,555)(300,556)(301,557)(302,558)
> (303,559)(304,560)(305,561)(306,562)(307,563)(308,564)(309,565)
> (310,566)(311,567)(312,568)(313,569)(314,570)(315,571)(316,572)
> (317,573)(318,574)(319,575)(320,576)(321,577)(322,578)(323,579)
> (324,580)(325,581)(326,582)(327,583)(328,584)(329,585)(330,586)
> (331,587)(332,588)(333,589)(334,590)(335,591)(336,592)(337,593)
> (338,594)(339,595)(340,596)(341,597)(342,598)(343,599)(344,600)
> (345,601)(346,602)(347,603)(348,604)(349,605)(350,606)(351,607)
> (352,608)(353,609)(354,610)(355,611)(356,612)(357,613)(358,614)
> (359,615)(360,616)(361,617)(362,618)(363,619)(364,620)(365,621)
> (366,622)(367,623)(368,624)(369,625)(370,626)(371,627)(372,628)
> (373,629)(374,630)(375,631)(376,632)(377,633)(378,634)(379,635)
> (380,636)(381,637)(382,638)(383,639)(384,640)(385,641)(386,642)
> (387,643)(388,644)(389,645)(390,646)(391,647)(392,648)(393,649)
> (394,650)(395,651)(396,652)(397,653)(398,654)(399,655)(400,656)
> (401,657)(402,658)(403,659)(404,660)(405,661)(406,662)(407,663)
> (408,664)(409,665)(410,666)(411,667)(412,668)(413,669)(414,670)
> (415,671)(416,672)(417,673)(418,674)(419,675)(420,676)(421,677)
> (422,678)(423,679)(424,680)(425,681)(426,682)(427,683)(428,684)
> (429,685)(430,686)(431,687)(432,688)(433,689)(434,690)(435,691)
> (436,692)(437,693)(438,694)(439,695)(440,696)(441,697)(442,698)
> (443,699)(444,700)(445,701)(446,702)(447,703)(448,704)(449,705)
> (450,706)(451,707)(452,708)(453,709)(454,710)(455,711)(456,712)
> (457,713)(458,714)(459,715)(460,716)(461,717)(462,718)(463,719)
> (464,720)(465,721)(466,722)(467,723)(468,724)(469,725)(470,726)
> (471,727)(472,728)(473,729)(474,730)(475,731)(476,732)(477,733)
> (478,734)(479,735)(480,736)(481,737)(482,738)(483,739)(484,740)
> (485,741)(486,742)(487,743)(488,744)(489,745)(490,746)(491,747)
> (492,748)(493,749)(494,750)(495,751)(496,752)(497,753)(498,754)
> (499,755)(500,756)(501,757)(502,758)(503,759)(504,760)(505,761)
> (506,762)(507,763)(508,764)(509,765)(510,766)(511,767)(512,768), 
> (   2,   3,   5,   9,  17,  33,  65129257513)(   4,   7,  13,
>    25,  49,  97193385769514)(   6,  11,  21,  41,  81161,
>   321641258515)(   8,  15,  29,  57113225449897770516
>  )(  10,  19,  37,  73145289577130259517)(  12,  23,  45,
>    89177353705386771518)(  14,  27,  53105209417,
>   833642260519)(  16,  31,  61121241481961898772520
>  )(  18,  35,  69137273545,  66131261521)(  20,  39,  77,
>   153305609194387773522)(  22,  43,  85169337673,
>   322643262523)(  24,  47,  93185369737450899774524
>  )(  26,  51101201401801578132263525)(  28,  55109,
>   217433865706388775526)(  30,  59117233465929,
>   834644264527)(  32,  63125249497993962900776528
>  )(  34,  67133265529)(  36,  71141281561,  98195389,
>   777530)(  38,  75149297593162323645266531)
> (  40,  79157313625226451901778532)(  42,  83165,
>   329657290579134267533)(  44,  87173345689354,
>   707390779534)(  46,  91181361721418835646268535
>  )(  48,  95189377753482963902780536)(  50,  99197,
>   393785546,  68135269537)(  52103205409817610,
>   196391781538)(  54107213425849674324647270539
>  )(  56111221441881738452903782540)(  58115229,
>   457913802580136271541)(  60119237473945866,
>   708392783542)(  62123245489977930836648272543
>  )(  64127253505,1009994964904784544)(  70139277,
>   553,  82163325649274547)(  72143285569114227,
>   453905786548)(  74147293585146291581138275549
>  )(  76151301601178355709394787550)(  78155309,
>   617210419837650276551)(  80159317633242483,
>   965906788552)(  84167333665306611198395789554
>  )(  86171341681338675326651278555)(  88175349,
>   697370739454907790556)(  90179357713402803,
>   582140279557)(  92183365729434867710396791558
>  )(  94187373745466931838652280559)(  96191381,
>   761498995966908792560)( 100199397793562)
> ( 102203405809594164327653282563)( 104207413,
>   825626228455909794564)( 106211421841658292,
>   583142283565)( 108215429857690356711398795566
>  )( 110219437873722420839654284567)( 112223445,
>   889754484967910796568)( 116231461921818612,
>   200399797570)( 118235469937850676328655286571
>  )( 120239477953882740456911798572)( 122243485,
>   969914804584144287573)( 124247493985946868,
>   712400799574)( 126251501,1001978932840656288575
>  )( 128255509,1017,1010996968912800576)( 148295589,
>   154307613202403805586)( 150299597170339677,
>   330659294587)( 152303605186371741458915806588
>  )( 156311621218435869714404807590)( 158315629,
>   234467933842660296591)( 160319637250499997,
>   970916808592)( 166331661298595)( 168335669314,
>   627230459917810596)( 172343685346691358715,
>   406811598)( 174347693362723422843662300599)
> ( 176351701378755486971918812600)( 180359717,
>   410819614204407813602)( 182363725426851678,
>   332663302603)( 184367733442883742460919814604
>  )( 188375749474947870716408815606)( 190379757,
>   490979934844664304607)( 192383765506,1011998,
>   972920816608)( 206411821618212423845666308615
>  )( 208415829634244487973922820616)( 214427853,
>   682340679334667310619)( 216431861698372743,
>   462923822620)( 220439877730436871718412823622
>  )( 222443885746468935846668312623)( 224447893,
>   762500999974924824624)( 232463925826628)
> ( 236471941858692360719414827630)( 238475949,
>   874724424847670316631)( 240479957890756488,
>   975926828632)( 246491981938852680336671318635
>  )( 248495989954884744464927830636)( 252503,1005,
>   986948872720416831638)( 254507,1013,1002980936,
>   848672320639)( 256511,1021,1018,1012,1000976928832640
>  )( 342683)( 344687350699374747470939854684)
> ( 348695366731438875726428855686)( 352703382,
>   763502,1003982940856688)( 364727430859694)
> ( 368735446891758492983942860696)( 376751478,
>   955886748472943862700)( 380759494987950876,
>   728432863702)( 384767510,1019,1014,1004984944864704
>  )( 440879734444887750476951878732)( 448895766,
>   508,1015,1006988952880736)( 480959894764504,1007,
>   990956888752)( 496991958892760)( 512,1023,1022,1020,
>  1016,1008992960896768), ( 257769)( 258770)( 259771)
> ( 260772)( 261773)( 262774)( 263775)( 264776)( 265777)
> ( 266778)( 267779)( 268780)( 269781)( 270782)( 271783)
> ( 272784)( 273785)( 274786)( 275787)( 276788)( 277789)
> ( 278790)( 279791)( 280792)( 281793)( 282794)( 283795)
> ( 284796)( 285797)( 286798)( 287799)( 288800)( 289801)
> ( 290802)( 291803)( 292804)( 293805)( 294806)( 295807)
> ( 296808)( 297809)( 298810)( 299811)( 300812)( 301813)
> ( 302814)( 303815)( 304816)( 305817)( 306818)( 307819)
> ( 308820)( 309821)( 310822)( 311823)( 312824)( 313825)
> ( 314826)( 315827)( 316828)( 317829)( 318830)( 319831)
> ( 320832)( 321833)( 322834)( 323835)( 324836)( 325837)
> ( 326838)( 327839)( 328840)( 329841)( 330842)( 331843)
> ( 332844)( 333845)( 334846)( 335847)( 336848)( 337849)
> ( 338850)( 339851)( 340852)( 341853)( 342854)( 343855)
> ( 344856)( 345857)( 346858)( 347859)( 348860)( 349861)
> ( 350862)( 351863)( 352864)( 353865)( 354866)( 355867)
> ( 356868)( 357869)( 358870)( 359871)( 360872)( 361873)
> ( 362874)( 363875)( 364876)( 365877)( 366878)( 367879)
> ( 368880)( 369881)( 370882)( 371883)( 372884)( 373885)
> ( 374886)( 375887)( 376888)( 377889)( 378890)( 379891)
> ( 380892)( 381893)( 382894)( 383895)( 384896)( 385897)
> ( 386898)( 387899)( 388900)( 389901)( 390902)( 391903)
> ( 392904)( 393905)( 394906)( 395907)( 396908)( 397909)
> ( 398910)( 399911)( 400912)( 401913)( 402914)( 403915)
> ( 404916)( 405917)( 406918)( 407919)( 408920)( 409921)
> ( 410922)( 411923)( 412924)( 413925)( 414926)( 415927)
> ( 416928)( 417929)( 418930)( 419931)( 420932)( 421933)
> ( 422934)( 423935)( 424936)( 425937)( 426938)( 427939)
> ( 428940)( 429941)( 430942)( 431943)( 432944)( 433945)
> ( 434946)( 435947)( 436948)( 437949)( 438950)( 439951)
> ( 440952)( 441953)( 442954)( 443955)( 444956)( 445957)
> ( 446958)( 447959)( 448960)( 449961)( 450962)( 451963)
> ( 452964)( 453965)( 454966)( 455967)( 456968)( 457969)
> ( 458970)( 459971)( 460972)( 461973)( 462974)( 463975)
> ( 464976)( 465977)( 466978)( 467979)( 468980)( 469981)
> ( 470982)( 471983)( 472984)( 473985)( 474986)( 475987)
> ( 476988)( 477989)( 478990)( 479991)( 480992)( 481993)
> ( 482994)( 483995)( 484996)( 485997)( 486998)( 487999)
> ( 488,1000)( 489,1001)( 490,1002)( 491,1003)( 492,1004)( 493,1005)
> ( 494,1006)( 495,1007)( 496,1008)( 497,1009)( 498,1010)( 499,1011)
> ( 500,1012)( 501,1013)( 502,1014)( 503,1015)( 504,1016)( 505,1017)
> ( 506,1018)( 507,1019)( 508,1020)( 509,1021)( 510,1022)( 511,1023)
> ( 512,1024) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | A(9,2) = L(10,2
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
37523470059514688350494948065280010241 ]

# agl1103.gen
gap> perm1:= PermList( Concatenation( [ 2 .. 1103 ], [ 1 ] ) );;
gap> perm2:= PermList( List( [1 .. 1103 ], x -> (5*x mod 1103) +1 ) );;
gap> g:= Group( perm1, perm2 );;
gap> CustomDisplayCompositionSeries( g );
Group
 | Z(2)
Group
 | Z(19)
Group
 | Z(29)
Group
 | Z(1103)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
12155066077533198711031 ]
gap> u:=NormalClosure(g,SylowSubgroup(g,2));;
gap> cs:=ChiefSeriesThrough(g,[u]);;
gap> List(cs,Size);
121550663974220611031 ]
gap> cs:=CompositionSeriesThrough(g,[u]);;
gap> List(cs,Size);
121550663974220611031 ]

# $Co_2$ on 2300 points
gap> g:=
> Group( (   1,   4)(   2,   7)(   5,  10)(   6,  12)(   8,  17)
> (  11,  18)(  13,  24)(  15,  25)(  16,  23)(  20,  30)(  21,  31)
> (  22,  33)(  26,  42)(  27,  45)(  28,  40)(  29,  41)(  34,  46)
> (  36,  60)(  37,  63)(  38,  52)(  43,  72)(  47,  49)(  48,  80)
> (  50,  84)(  51,  87)(  53,  69)(  54,  76)(  56,  77)(  57,  78)
> (  58104)(  59106)(  61109)(  62110)(  64116)(  65117)
> (  67,  82)(  68124)(  71129)(  73131)(  74,  90)(  79142)
> (  81146)(  83148)(  85151)(  86152)(  88155)(  89156)
> (  91126)(  92159)(  93164)(  94136)(  95137)(  97138)
> (  98171)( 100140)( 101141)( 103128)( 107178)( 108179)
> ( 111183)( 112193)( 113186)( 114187)( 115199)( 118201)
> ( 119204)( 120209)( 121130)( 122165)( 123215)( 125219)
> ( 127132)( 133224)( 134135)( 139228)( 143232)( 144233)
> ( 147241)( 149243)( 150244)( 153250)( 154251)( 157258)
> ( 158259)( 160265)( 161246)( 162264)( 163225)( 166271)
> ( 167276)( 168277)( 169279)( 170227)( 172281)( 173284)
> ( 175222)( 180290)( 181295)( 182296)( 184303)( 185292)
> ( 188312)( 189298)( 190317)( 191301)( 192320)( 194321)
> ( 195324)( 196309)( 197328)( 198332)( 200334)( 202256)
> ( 205345)( 206335)( 207338)( 208349)( 210351)( 211223)
> ( 212269)( 213273)( 214216)( 217357)( 218356)( 220364)
> ( 221366)( 226280)( 229370)( 230371)( 234375)( 235380)
> ( 236381)( 238272)( 240388)( 242392)( 245291)( 247395)
> ( 248336)( 249257)( 252260)( 253405)( 254310)( 255267)
> ( 261414)( 262409)( 263416)( 266419)( 268421)( 270353)
> ( 274352)( 275427)( 278430)( 282434)( 283385)( 285439)
> ( 287358)( 289443)( 293447)( 294450)( 297453)( 299456)
> ( 300444)( 302462)( 304455)( 305464)( 306468)( 307446)
> ( 308472)( 311477)( 313480)( 314481)( 315454)( 316486)
> ( 318487)( 319488)( 322491)( 323494)( 325497)( 326498)
> ( 327425)( 329501)( 330502)( 331504)( 333507)( 339399)
> ( 340517)( 341406)( 342523)( 344527)( 346530)( 347531)
> ( 348536)( 350539)( 354544)( 355359)( 360547)( 361545)
> ( 362436)( 363551)( 365555)( 367557)( 368433)( 369432)
> ( 376461)( 377393)( 378572)( 379575)( 383580)( 386583)
> ( 387586)( 389590)( 390591)( 391576)( 394600)( 396511)
> ( 397516)( 398512)( 400407)( 401607)( 402411)( 403412)
> ( 404413)( 408615)( 410619)( 415629)( 417435)( 420632)
> ( 422633)( 423634)( 424637)( 426639)( 428429)( 431642)
> ( 437649)( 438651)( 440654)( 445570)( 448663)( 449664)
> ( 451638)( 452656)( 457674)( 458657)( 459658)( 460680)
> ( 463617)( 465673)( 466685)( 467690)( 469693)( 470695)
> ( 471697)( 473701)( 474702)( 475705)( 476618)( 478711)
> ( 479712)( 482716)( 483727)( 484719)( 485720)( 489736)
> ( 490738)( 492742)( 493743)( 495746)( 496744)( 499753)
> ( 500754)( 503755)( 505758)( 506757)( 509672)( 515773)
> ( 518520)( 519777)( 521781)( 522784)( 524786)( 525789)
> ( 526791)( 528795)( 529796)( 532799)( 533810)( 534802)
> ( 535803)( 537816)( 538614)( 542825)( 543826)( 546828)
> ( 548648)( 549831)( 550834)( 552838)( 553839)( 554827)
> ( 558847)( 559647)( 560643)( 561644)( 567683)( 571599)
> ( 573574)( 578865)( 581869)( 582871)( 584873)( 585876)
> ( 587588)( 589878)( 592884)( 593892)( 594886)( 595887)
> ( 596861)( 597862)( 598820)( 601602)( 603829)( 604776)
> ( 605904)( 606907)( 608902)( 609623)( 610624)( 611625)
> ( 612916)( 613627)( 616860)( 620925)( 621761)( 622710)
> ( 626934)( 628815)( 631739)( 635942)( 636944)( 640641)
> ( 645950)( 650955)( 652956)( 653957)( 659676)( 660858)
> ( 661969)( 665972)( 666981)( 667975)( 668976)( 669965)
> ( 670947)( 675966)( 677849)( 678848)( 679998)( 681,1001)
> ( 682,1002)( 684752)( 686,1009)( 687,1012)( 689,1016)( 691,1020)
> ( 692,1021)( 694,1027)( 696983)( 698,1032)( 699,1034)( 700,1031)
> ( 703,1043)( 704,1048)( 706,1050)( 707,1051)( 708918)( 709924)
> ( 713,1060)( 714,1065)( 715730)( 717,1072)( 718974)( 722,1066)
> ( 723,1082)( 724,1068)( 725,1070)( 726,1089)( 728,1094)( 729,1093)
> ( 731,1076)( 732,1102)( 734745)( 735741)( 737,1033)( 740,1112)
> ( 747,1121)( 748,1122)( 749,1019)( 750,1123)( 751763)( 756,1140)
> ( 759,1141)( 760,1142)( 762,1143)( 765,1158)( 766993)( 772,1167)
> ( 774,1170)( 775,1171)( 778,1144)( 779,1176)( 780,1179)( 782,1182)
> ( 783,1183)( 785787)( 788,1189)( 790812)( 792,1194)( 793,1195)
> ( 794,1193)( 797,1204)( 798,1208)( 800,1215)( 805,1209)( 806,1221)
> ( 807,1211)( 808,1213)( 809,1225)( 811,1228)( 813,1218)( 814,1197)
> ( 817920)( 818921)( 819,1181)( 823,1245)( 832,1255)( 833,1256)
> ( 835,1261)( 836,1262)( 837,1260)( 840,1266)( 841,1269)( 842843)
> ( 844,1254)( 846,1113)( 850,1279)( 855,1285)( 856,1287)( 859897)
> ( 863,1293)( 866,1296)( 867,1298)( 868,1295)( 870,1303)( 872874)
> ( 875,1249)( 877881)( 879883)( 880,1313)( 882894)( 885,1316)
> ( 888,1315)( 889,1318)( 890891)( 893,1321)( 895,1267)( 896,1322)
> ( 898,1292)( 899,1240)( 900,1328)( 901,1331)( 903,1251)( 905,1333)
> ( 906,1332)( 908,1237)( 909,1336)( 910,1320)( 911,1338)( 912931)
> ( 913,1340)( 914,1341)( 915,1342)( 917,1344)( 919,1348)( 922,1290)
> ( 923,1351)( 926,1353)( 927,1150)( 928,1151)( 929,1058)( 930,1059)
> ( 932,1358)( 933,1359)( 935,1362)( 936,1235)( 937,1236)( 938,1365)
> ( 939,1368)( 940,1115)( 941,1276)( 943,1374)( 945,1375)( 946990)
> ( 948,1120)( 949,1378)( 951,1379)( 954,1250)( 958,1384)( 959,1393)
> ( 960,1387)( 961,1388)( 962,1396)( 967968)( 973,1414)( 977,1408)
> ( 978,1410)( 979,1412)( 980,1422)( 982,1425)( 984,1418)( 985,1430)
> ( 986,1399)( 987,1392)( 988,1302)( 992,1441)( 994,1445)( 995,1278)
> ( 996,1446)( 997,1447)( 999,1169)(1000,1168)(1003,1452)(1004,1456)
> (1005,1454)(1006,1137)(1007,1138)(1008,1458)(1010,1461)(1011,1462)
> (1013,1467)(1014,1468)(1015,1470)(1017,1474)(1018,1475)(1022,1419)
> (1023,1428)(1024,1481)(1025,1482)(1026,1490)(1028,1493)(1029,1494)
> (1030,1466)(1035,1501)(1036,1512)(1037,1513)(1038,1504)(1039,1507)
> (1040,1498)(1041,1499)(1042,1500)(1044,1485)(1045,1523)(1046,1486)
> (1047,1457)(1049,1527)(1052,1528)(1053,1532)(1054,1530)(1055,1531)
> (1056,1086)(1057,1539)(1061,1548)(1062,1545)(1063,1547)(1064,1550)
> (1067,1556)(1069,1411)(1071,1559)(1073,1564)(1074,1563)(1075,1565)
> (1077,1571)(1079,1553)(1080,1555)(1081,1576)(1083,1579)(1084,1581)
> (1085,1557)(1087,1584)(1088,1587)(1090,1591)(1091,1590)(1092,1593)
> (1095,1360)(1096,1598)(1097,1596)(1098,1319)(1099,1600)(1100,1568)
> (1101,1603)(1103,1104)(1105,1116)(1106,1117)(1107,1119)(1108,1139)
> (1109,1505)(1110,1506)(1111,1126)(1114,1611)(1118,1460)(1124,1273)
> (1125,1618)(1127,1131)(1128,1613)(1129,1614)(1130,1311)(1132,1478)
> (1133,1479)(1134,1602)(1135,1636)(1136,1639)(1146,1645)(1147,1646)
> (1148,1324)(1149,1650)(1152,1196)(1153,1655)(1154,1656)(1156,1659)
> (1157,1663)(1159,1665)(1160,1443)(1161,1669)(1162,1670)(1164,1633)
> (1165,1671)(1166,1449)(1172,1536)(1173,1519)(1174,1647)(1175,1217)
> (1177,1524)(1178,1678)(1180,1680)(1184,1683)(1185,1364)(1186,1688)
> (1187,1690)(1188,1691)(1190,1693)(1191,1694)(1192,1677)(1198,1701)
> (1199,1205)(1200,1543)(1201,1697)(1202,1203)(1206,1708)(1207,1709)
> (1210,1712)(1214,1714)(1216,1716)(1220,1401)(1222,1719)(1223,1721)
> (1224,1713)(1226,1722)(1227,1720)(1229,1724)(1230,1727)(1231,1728)
> (1232,1699)(1233,1717)(1234,1700)(1238,1732)(1239,1681)(1241,1735)
> (1242,1682)(1244,1736)(1246,1738)(1248,1742)(1257,1747)(1258,1617)
> (1259,1749)(1263,1753)(1264,1756)(1265,1752)(1268,1757)(1270,1642)
> (1271,1746)(1272,1381)(1274,1275)(1277,1758)(1281,1759)(1284,1761)
> (1286,1763)(1288,1766)(1289,1767)(1291,1770)(1294,1433)(1297,1773)
> (1299,1300)(1301,1771)(1304,1407)(1305,1403)(1306,1687)(1307,1755)
> (1308,1776)(1309,1310)(1312,1782)(1314,1785)(1317,1786)(1323,1787)
> (1325,1788)(1326,1790)(1327,1791)(1329,1793)(1330,1794)(1334,1797)
> (1335,1540)(1337,1651)(1339,1626)(1343,1784)(1345,1804)(1346,1805)
> (1347,1806)(1349,1808)(1350,1809)(1352,1811)(1354,1814)(1355,1815)
> (1356,1816)(1357,1817)(1361,1820)(1363,1821)(1366,1824)(1367,1825)
> (1369,1432)(1370,1826)(1371,1823)(1372,1827)(1373,1605)(1376,1607)
> (1377,1437)(1380,1829)(1382,1644)(1385,1772)(1389,1836)(1390,1777)
> (1391,1832)(1394,1838)(1395,1840)(1400,1779)(1406,1854)(1409,1597)
> (1413,1862)(1415,1867)(1416,1866)(1417,1871)(1420,1453)(1421,1875)
> (1423,1879)(1424,1580)(1426,1883)(1427,1884)(1429,1873)(1431,1455)
> (1434,1775)(1436,1890)(1439,1896)(1440,1899)(1442,1739)(1444,1905)
> (1448,1535)(1450,1492)(1451,1673)(1459,1910)(1463,1911)(1464,1914)
> (1465,1915)(1469,1916)(1471,1921)(1472,1922)(1473,1765)(1476,1926)
> (1477,1929)(1480,1641)(1483,1919)(1484,1723)(1487,1939)(1488,1934)
> (1489,1940)(1491,1941)(1495,1943)(1496,1948)(1497,1946)(1502,1511)
> (1503,1958)(1508,1947)(1509,1953)(1510,1715)(1514,1963)(1515,1949)
> (1516,1965)(1517,1951)(1518,1818)(1520,1674)(1521,1952)(1522,1972)
> (1525,1974)(1526,1970)(1529,1977)(1533,1609)(1534,1898)(1537,1583)
> (1538,1979)(1541,1981)(1542,1913)(1544,1982)(1546,1975)(1549,1984)
> (1551,1679)(1554,1857)(1558,1989)(1560,1994)(1561,1993)(1562,1938)
> (1566,1996)(1567,1997)(1570,1998)(1572,1999)(1573,1734)(1574,2000)
> (1575,1582)(1577,2002)(1578,2004)(1585,1942)(1586,2010)(1588,2011)
> (1589,1594)(1592,1961)(1595,2021)(1599,1819)(1601,1606)(1604,1638)
> (1608,1908)(1610,1643)(1612,2034)(1615,2036)(1616,1628)(1619,2008)
> (1620,2045)(1621,2042)(1622,2050)(1623,1631)(1624,1632)(1625,2055)
> (1627,1780)(1629,2059)(1630,2063)(1634,1930)(1635,1931)(1637,2072)
> (1640,2076)(1649,2077)(1652,2079)(1653,1945)(1654,2080)(1657,2081)
> (1658,2082)(1660,2084)(1661,2086)(1662,1705)(1664,2087)(1666,2085)
> (1667,1902)(1668,1903)(1675,1845)(1676,1686)(1684,1703)(1685,2092)
> (1689,1955)(1692,2096)(1695,2043)(1696,2091)(1698,1933)(1702,2099)
> (1704,2100)(1706,2101)(1707,2102)(1711,2103)(1725,2107)(1726,2030)
> (1729,1987)(1730,1874)(1731,2093)(1733,1894)(1737,2111)(1744,2115)
> (1748,2037)(1750,2039)(1751,2117)(1754,2122)(1760,2126)(1764,2129)
> (1768,1886)(1769,2132)(1774,2133)(1778,1852)(1781,2134)(1783,2135)
> (1789,2016)(1792,2137)(1795,1799)(1796,1928)(1798,2139)(1800,1976)
> (1801,2125)(1802,1851)(1803,2024)(1807,1980)(1810,1950)(1812,2114)
> (1813,1920)(1822,2146)(1830,2152)(1831,2105)(1834,2136)(1835,2163)
> (1839,1846)(1841,1859)(1844,2168)(1849,2170)(1853,2173)(1855,2175)
> (1856,2179)(1858,2025)(1860,2184)(1861,2071)(1863,1868)(1864,2067)
> (1865,2176)(1869,2171)(1870,2195)(1872,2073)(1876,2199)(1877,2165)
> (1878,2003)(1880,2196)(1881,2006)(1882,2007)(1885,2119)(1888,2121)
> (1889,2213)(1891,2142)(1892,2141)(1893,2215)(1895,2144)(1897,2161)
> (1900,2218)(1901,2220)(1904,2150)(1906,2217)(1907,2029)(1909,1924)
> (1912,2147)(1917,2018)(1918,1959)(1923,2130)(1925,1995)(1927,2145)
> (1932,2191)(1935,2204)(1936,1957)(1937,2178)(1944,2224)(1954,2222)
> (1956,2223)(1960,2233)(1962,2118)(1964,1967)(1966,2185)(1968,2237)
> (1969,2090)(1971,2239)(1973,1986)(1978,2031)(1983,2019)(1985,2221)
> (1988,2032)(1990,2026)(1991,2028)(1992,2227)(2001,2154)(2005,2253)
> (2009,2022)(2012,2097)(2013,2151)(2014,2015)(2017,2023)(2020,2225)
> (2027,2075)(2033,2180)(2035,2260)(2038,2058)(2040,2263)(2041,2206)
> (2044,2047)(2046,2203)(2048,2054)(2049,2265)(2051,2198)(2052,2066)
> (2053,2188)(2056,2194)(2057,2269)(2060,2274)(2061,2201)(2062,2249)
> (2064,2271)(2065,2200)(2068,2162)(2069,2259)(2070,2229)(2074,2192)
> (2078,2261)(2083,2284)(2088,2283)(2098,2286)(2104,2110)(2106,2109)
> (2108,2287)(2112,2235)(2113,2276)(2116,2242)(2120,2252)(2123,2143)
> (2124,2254)(2138,2140)(2148,2228)(2149,2244)(2153,2278)(2155,2226)
> (2158,2257)(2159,2246)(2160,2258)(2166,2183)(2167,2181)(2169,2255)
> (2172,2272)(2174,2294)(2177,2197)(2182,2211)(2186,2281)(2187,2264)
> (2189,2193)(2190,2298)(2202,2238)(2205,2256)(2207,2266)(2208,2216)
> (2209,2299)(2210,2289)(2212,2268)(2214,2295)(2219,2290)(2230,2292)
> (2231,2241)(2232,2240)(2234,2248)(2236,2262)(2243,2247)(2245,2282)
> (2250,2277)(2267,2273)(2270,2279)(2275,2280)(2288,2297)(2291,2293)
> (2296,2300), (   2,  21,  26,  27,  11,  22,  39,  15,   5,   3,   8,
>    13,  14,   6,   9)(   4,  20208,  81,  28,  23,  76331114,
>   223222278559194,  19)(   7,  79154,  90,  69,  70268,
>   426224,  71128163359,  82,  16)(  10,  36,  95215648,
>   175164282245638211169140118,  89)(  12,  83423,
>   273168,  33,  34195352121127286546283,  72)
> (  17,  48147365196,  53,  54424943431134,  98102210,
>  65)(  18,  37,  52,  85229,  25,  68451358263,  47,  50227,
>   180172)(  24123220197,  35104105198367126,  74,
>    97323113135)(  29,  30261489264,  67,  51,  66297,
>   108103212542503207)(  31221558492191133,  56,
>   322499217,  40,  93174440173)(  32,  55,  94437353,
>   132,  43,  46253119,  41,  44159354157)(  38,  64,  86,
>    77348125269501235236153189137112115)
> (  42160255,  49,  73)(  45122158295262,  91,  92141,
>   111166,  96167100161230)(  57107355441636271,
>   192254421422318139,  78,  88120)(  58,  59288190,
>   315,  75226274379425129214655356329)
> (  60401,1495,1674459376378,1307,1427307248252812,1486,
>  305)(  61162136326213143328234420267206170181,
>  182177)(  62,  99225543635436130176330537150131,
>  287289200)(  63408,1463603407299646,1112,1122569486,
>  1294,1055,1364341)(  80582,1298,1687579556846,1263,1083,
>   433643949,1140,1273362)(  84308,1025,1780857279460,
>  1487811117257694,1167,1750406)(  87344,1702,1699776,
>   256260730896219372585745,1538398)( 101272275,
>   138319368294415450500357545442165285)
> ( 106311627,1345673659,1233797814204399838,1335,1350,
>  310)( 109605902842463366867960,1575849675884484,
>  883599)( 110249778936,1675371145240586893858184,
>  188591729)( 116606860,1798787683757,1113980581577,
>  850,1115,1585524)( 124830,1764,1363617570687667723561,
>  575855,1314897239)( 142856,1038,1049995291293983726,
>  693151467,1451,1534309)( 144149417505325270316493,
>  756650327216360242350)( 146383,1672,1054919251510,
>  870961889660513772,1088894)( 148438,1079,1760848733,
>  948532,1644629361549395,1272410)( 152185598572878,
>  374377,1141,1465,1208512369825,1259914)( 155521,1537,1308,
>  384238402485,1116968183737,1379,1098446)( 156203,1187,
>  937844244428,1166,1257744639863,1162873933)
> ( 171515,1184,1686518462618,1270945427300994611806,
>  644)( 178476,1535,1696568455,1315703,1907678298734,1035,
>  1526469)( 179292555,1022,1489466418504,1327,1514465,
>   458,1266,1469982)( 186397590998,1789620218363,1395,
>  1876688456634,1003985)( 187445,1080,1283,1390864228,
>   490921596233373621910732)( 193526535,1700685,
>   468392,1349,1276434567387595,1578630)( 199509,1664,
>  1235,1685,1202,1698,1218820821,1697,2088,1158,1652,1074)
> ( 201686494,1781866276475922,1726771382939742,1047,
>  770)( 202205839,1455786336562544,1430777339,1026592,
>  1450514)( 209541,1737781,1332,1572752,1145,1654803,1566,
>  1067,1378,1171,1216)( 231411,1476,1431457432645665,1783,
>   565564754,1768,2116548)( 232926,1778898619317471,
>   668,1064464280997,1005903520)( 237386381900785,
>   511622613,1046,1163966885625728768)( 241,1091930,
>   616,1347,1143739,1292,1011746,1121,1370491,1053,1056)
> ( 243563874,1394284444,1401,1280,1118487306661840862,
>  604)( 246247495333266)( 250304996931,1533454380,
>  1352,1196,1207925303435,1052,1330)( 258340,1164713,1291)
> ( 259396938847,1268674430,1277958,1536338461502920,
>  935)( 265,1015,1039892658676679,1024,1376370320689,1745,
>  1613845)( 277429,1302,1845,1301)( 281337779534917571,
>   523788,1316576400517,1173,1464,1119)( 290394881,1602,
>   419566684637915677375,1008,1199,1206,1278)
> ( 296990,2214,1948,1916,1548,1807,2064,2189,2172,2190,1634,1454,1633,
>  1416)( 301302631,1743,1457)( 312796,1704,1183,1570,1138773,
>   538527,1336,1711,1441,2083,1666508)( 313859602,1252,2098,
>  1300871,1306,1305,1304,1081,1367951666449)( 314573,1312,
>  1253832554615,1017,2090,1391,1085,1284978,1377483)
> ( 321342525,1337,1339409522,1186,1324,1371557578946482,
>  1612)( 324,1629,1351,1895,1012,2011,1027,1619,1656,2270,1128,2043,
>  2218,2081,1419)( 332,1214,1560,1152,1667,1552,1531,1213,1203824,
>  1150,1733498,1681,1077)( 334765711,1540,1333,1058,1573,1076,
>  1574720,1543,1549,1741,1060,1161)( 335550594,1095640560,
>   875,1605,1231343516780600,1751,1165)( 345712,1542,1181,
>  1201,1657,1658,1156,1157,1683,1210,1279,1051,1653540)
> ( 346901574583391607,1180837624,1010741950,1086626,
>  404)( 347601,1614,1249547,1271628551,1356,1357891,1084852,
>  1373533)( 349,1649760761,1713,1899,1710,1247,1061719,1147,
>  1643753,1641,1194)( 351823795904,1796791815,1139762,
>   763,1195,1706,1211,1212,1248)( 364,1023,1014969841390880,
>  1599653774,1185,1178789,1355,1317)( 385393470,1497,1323)
> ( 388,1030474,1037612413448,1426775,1174,1676,1484,1488,1334,
>  614)( 389861836)( 403,1230682,1006,1250633,1288,1512,1646,
>  1812,1197,1191979879833)( 405,1326,1423872,1392,1582977,
>   984,1117807942,1004,1000927911)( 412882707918843,
>   909609,1099,1063,1290,1281724,1274,1264584)( 414908,1226,
>   888731913886725,1577940,1309,1361743706923)
> ( 416784,1188,1200809967769,1429,1282,1222642767,1297,1310,
>  827)( 439964974,1860,2275,2154,2156,2261,1790727,1998,2271,2252,
>  2253986)( 443641580,1393,1399,2126,1771,1293,1772,1846,1838,
>  1296868947656)( 447,1261,2139,1820,2106,1961,2280,1840,1827,
>   831,2040,1787,2241,1900671)( 452672,1901,1989,2258,1985,1639,
>  1694,1527,1986,2109,1506,1127,2004,1844)( 453,1436,1262,2119,2027,
>  1102,1926,1382,1383,2289,1824,1624,1621,1019,1444)( 472810,1786,
>  2124,1637,1930,1842,2283,1973,2092,2185,1130,1135,1408496)
> ( 473,1885,1586792,1232,1045,1673,1258588552,1421,1472899589,
>  610)( 477,1541,1544,1068,1069717721481801,1703,1182907,1731,
>  1238506)( 478,1057890695,1329,1459,1645,1234,1509,1190,1318,
>   479608,1496699)( 480,1242,1170536,2093,1237822,1561,2000,
>  1567,1740,1553,1554716,1075)( 488,2031,1880,2045,2067,2068,2177,
>  1850,2018,1595,2010,1475,1021,1132,1452)( 497,1131,2071747,2078,
>  1941,2017,2046,1340,1912,1655,1413,2117,1106,1136)( 507,1149,1240,
>   759,1209,1528,1529,1070,1059766,2086,2082,1155,1236,1154)
> ( 519657,1100912,1729)( 528,1709,1692,1511,1251,1110632,1325,
>  1018877,1111,1275,1471,1695793)( 529,1198,1708,1510,1177,1223,
>   953738,1744,1286587,1097924,1028,1192)( 530,1151,1050,1243,
>  1680710,1078,1990,1148,1153,1066,1988,1545799,1217)
> ( 531718,1682,1684,1647,1179705,1239,1244,1193,1707,1668,1204800,
>  804)( 539,1241,1734817,1976,1555,1547,1160,1205802,1073,1648,1718,
>  1137,1144)( 553835,1319709851829,1104929,1346,1267,1142,
>  1114758,1491593)( 597906623,1477,1354,1366941740,1013,
>  1096854652,1172,1169,1689)( 647681,1679783853,1776,1775,
>  2089,1229805,1320704696,1109,1380)( 649,1630,2230,1805,1439,
>  1440,1518,2053,2001,1611,1747,2016,1598,2121,1834)( 651,1403955,
>  1628,2298,2033972,1342,1891,1331,1255,2054,2074973963)
> ( 654664,1407,2024,1285,1753,2057,2266,2237,2206,1550,2240,1502,1508,
>  1406)( 662702,1520,2097,1996,2153,1931,2292,2229,1794,2262,2300,
>  2183,2138989)( 663,2120,1365,2003,1626,1978,2164957,1386,2163,
>  2061,1338,1381,2142,1417)( 669,1832,1833,1432,1792,1588,1093,1715,
>  1460,2222,1815,1438,2030,1607,1831)( 670992701,1712,2152,1806,
>  1821,1983,2107,1678,1065,1911,2264,1615,1795)( 680,2069,1523,1126,
>  1735,1819,2216,2212,2251,1915,1925,1928,1810,1640,1107)
> ( 690,2180736,1608,1896,2165988,1433,1434,1826,2009,1590,2110,1992,
>  2221)( 691,1908,1758,1299,1779,1837,1420714715895,1090692,
>   952,1101755)( 697,1221,1723735,1108,2193,1348,1927,1904,1742,
>  1493,1587,1793,2035,2044)( 698,1428,1062813798790,1485,1265,
>   928708,1906,1449,1224932887)( 700,1397,1701,1016,1564,2060,
>  1722,1893,2209,2039,2276,1962,1563,1360,1609)( 722,1583959962,
>  1168,1087,1007828,1769,1289905,1601,1220,1448,1456)
> ( 748749,1453,1412,2182,1442,1481,1873,1932,2096,1374,2029,2263,2293,
>  1862)( 750751,1861,1635,1617,2042,1368,1788,1094,1759,1260,1835,
>  1632,2278,2192)( 764,1558818819,1557,1446,1530,1739,1705,1159,
>  1546,1717816,1730,1662)( 782,1839,1447,1774,1311876,1103,1036,
>  1029808,1372,1120999,1048,1175)( 794,1219,1071,1660,1661,2087,
>  1663,2284,1665,1651,1246,1146,1568,1569,1642)( 826,1369,1123)
> ( 834,2145,1951,1125,1636,1462,1940,1972934,1725,2101,2105,2200,2037,
>  954)( 865,1777869,1295,1671)( 916,1596,1650,2255,2238,1358,1604,
>  1997,1040,2244,1868,2259,2032,1864,2143)( 944,2125,1341,1092,1909,
>  2080,2227,2111,1515,2108,1228,1562,1618,2157,2036)( 956,1402,2133,
>  2265,2094,1714,2135,1521,2052,2134,1579,1580,1920,1405,1849)
> ( 965,1761,1400)( 970971,1133,1001,1857,2272,2132981,2269,2287,
>  1727,1917,1919,2256987)( 975,1855,1470,1565,2149,1853,2115,1968,
>  1225,1801,1859,1002,1478,1443,1044)( 976,1176,2249,1501,1033,1625,
>  1875,1414,1882,2118,1784,1763,1852,1479,1480)( 991,2065,1623,2122,
>  1581,1817,1589,2198,2282,1603,1913,1967,1969,2215,1724)
> ( 993,1923,2297,2159,2225,2226,2217,1517,2294,2171,2210,2211,2295,2181,
>  1042)(1009,2148,1752,2161,1921,1867,1938,1816,1993,1803,1359,1227,
>  1525,1903,1043)(1020,1902,2273,1606,1638,1791,2034,1886,2002,2155,
>  2025,2075,2023,2150,1933)(1031,1957,1934,1892,1836,1841,1404,1851,
>  2128,1256,1616,2205,2059,1881,2147)(1032,1215,1799,2021,2239,1422,
>  1719,1720,1956,2224,1041,1874,1418,1483,2231)(1034,1677,2103,1939,
>  1946,1884,1918,1445,2051,1631,2070,2197,2008,2257,1922)
> (1072,1782,2187,2274,2286,2260,2137,1691,1785,1856,1387,1773,1847,2006,
>  1287)(1082,1592,2104,1571,1498,1124,2207,1385,1389,1396,1800,1965,
>  1129,1254,1766)(1089,1963,1693,2130,1935,1458,1813,2233,2007,1953,
>  1825,2254,1966,1854,2191)(1105,1970,1507,1955,2169,1384,1303,1437,
>  2268,2299,2079,1949,2091,1425,1971)(1134,1959,1321,2012,1269,1999,
>  1818,2136,1492,1905,1659,2247,1435,2058,2072)(1189,2236,2084,2288,
>  1482,1500,1503,1559,2141,1593,2201,1879,2195,2250,1504)
> (1245,2113,1914,2246,2144,1375,1828,1979,1474,1871,1716,1343,2013,2186,
>  2112)(1313,1754,1755,1532,1732,2146,2076,1728,1974,2099,2020,2077,
>  2049,1584,1748)(1322,1958,2028,2243,2208,1894,1980,2245,2196,1924,
>  2102,2019,1490,1328,1829)(1344,1398,1415,1610,2291,1362,1551,2235,
>  2114,1353,1556,2158,2047,1823,1843)(1388,2204,2063,1756,1797,1461,
>  1929,1597,2151,1600,2026,2170,1952,1576,2162)(1409,1670,2296,2277,
>  1738,2219,2167,2160,2095,1981,1822,2184,2242,2055,1872)
> (1410,1977,1950,2179,1878,2194,1863,2176,1765,2129,1883,1945,2234,1519,
>  1522)(1411,2056,1877,2203,2066,1770,2228,1688,2127,1942,1984,1524,
>  2290,1858,1890)(1424,1804,2123,1762,1848,2232,1994,2166,2248,1499,
>  1954,1513,2038,2199,1866)(1466,1960,1690,1937,1910,1814,1494,2022,
>  1995,1749,1622,1869,2168,1865,2015)(1467,1505,2048,2279,2267,2175,
>  1757,2041,2131,2223,1987,1669,1944,1947,1591)(1468,1594,1811,1473,
>  1936,2281,2213,1887,2140,2178,2202,2173,1627,1830,1767)
> (1516,1802,1870,2014,1982,2005,2050,2073,1721,2100,2188,2174,1539,1746,
>  1736)(1620,1809,2062,2285,2085,1943,1975,1964,1897,1898,2220,1888,
>  1889,1991,1808) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | Co(2)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
423054213120001 ]

# $Co_3$ on 276 points
gap> g:= Group(
> (4,6)(5,10)(7,13)(8,16)(9,11)(12,21)(14,24)(15,27)
> (17,29)(20,34)(22,37)(23,40)(25,46)(26,47)(28,44)(31,53)
> (33,50)(35,57)(36,59)(38,63)(41,66)(42,45)(43,72)(48,81)
> (49,83)(52,89)(54,92)(55,56)(58,99)(60,62)(61,73)(64,109)
> (67,112)(68,75)(69,116)(70,78)(71,120)(74,123)(77,102)(82,91)
> (84,136)(85,135)(86,138)(87,141)(90,145)(93,151)(94,153)(95,147)
> (96,155)(97,149)(98,150)(101,159)(103,127)(104,163)(105,131)(106,165)
> (107,167)(110,170)(114,175)(115,130)(117,179)(118,178)(119,129)(121,183)
> (124,160)(125,182)(128,161)(133,188)(134,193)(137,196)(139,202)(140,204)
> (142,190)(143,208)(146,209)(148,194)(152,216)(154,219)(156,222)(157,215)
> (158,205)(162,224)(164,185)(166,226)(171,228)(173,232)(176,177)(180,195)
> (181,241)(184,242)(187,244)(191,245)(192,211)(197,250)(198,217)(200,252)
> (201,253)(203,256)(206,257)(207,237)(212,249)(213,238)(214,259)(218,240)
> (220,263)(221,261)(223,262)(225,235)(229,265)(230,266)(233,243)(236,239)
> (246,270)(247,272)(248,271)(251,260)(254,255)(258,269)(268,276)(273,274),

> (4,8)(6,12)(7,14)(9,17)(10,19)(11,20)(13,22)(15,27)
> (16,21)(18,31)(23,41)(24,37)(26,32)(28,33)(29,34)(35,54)
> (36,50)(39,48)(40,67)(42,69)(43,61)(44,59)(45,77)(46,80)
> (49,84)(51,87)(55,94)(56,96)(57,98)(58,93)(60,101)(62,105)
> (63,108)(65,110)(66,112)(68,114)(70,118)(71,76)(72,123)(73,74)
> (75,104)(78,128)(79,130)(82,117)(83,134)(85,137)(86,139)(88,142)
> (89,144)(91,148)(92,150)(95,154)(97,156)(99,157)(102,116)(103,127)
> (106,107)(109,169)(111,171)(119,181)(121,126)(122,145)(124,162)(125,132)
> (129,187)(131,159)(135,195)(136,193)(138,200)(143,206)(146,211)(147,212)
> (149,214)(151,215)(152,176)(153,155)(160,225)(161,178)(163,175)(164,192)
> (165,226)(166,167)(168,205)(172,204)(177,238)(179,194)(180,196)(184,189)
> (185,209)(186,232)(188,234)(198,223)(199,243)(202,252)(203,220)(207,258)
> (208,254)(210,250)(213,216)(217,236)(218,221)(219,249)(222,259)(224,235)
> (230,246)(231,253)(237,247)(239,262)(240,248)(241,244)(245,267)(251,266)
> (255,257)(256,273)(260,270)(261,271)(263,274)(265,275)(268,276)(269,272),

> (2,4)(3,6)(5,10)(9,13)(12,19)(14,25)(16,27)(17,30)
> (20,35)(21,32)(22,38)(23,42)(24,45)(28,49)(29,51)(31,54)
> (33,55)(34,56)(36,60)(37,62)(39,65)(40,46)(41,68)(43,71)
> (44,75)(48,82)(50,57)(52,64)(53,91)(58,100)(59,63)(61,103)
> (66,83)(67,113)(69,117)(70,119)(73,124)(74,106)(76,105)(77,127)
> (78,129)(79,131)(80,133)(81,92)(85,86)(87,101)(89,135)(90,146)
> (95,97)(96,98)(99,111)(102,160)(104,107)(108,162)(109,138)(110,114)
> (112,172)(115,176)(116,177)(118,180)(123,185)(125,164)(128,186)(130,179)
> (132,188)(134,194)(137,198)(139,203)(140,158)(141,205)(142,207)(144,161)
> (145,209)(148,211)(151,208)(153,216)(154,220)(156,223)(157,196)(159,204)
> (165,182)(168,224)(169,199)(170,175)(171,221)(173,230)(174,235)(178,195)
> (181,218)(183,242)(189,227)(190,240)(191,247)(192,238)(193,213)(197,215)
> (201,254)(202,255)(206,258)(212,236)(214,229)(217,250)(219,262)(222,263)
> (225,234)(228,259)(231,268)(233,244)(237,241)(239,269)(245,271)(246,248)
> (249,257)(252,260)(253,256)(261,265)(264,274)(267,276)(270,272)(273,275),

> (1,2)(4,9)(6,11)(7,13)(8,17)(12,20)(14,22)(15,27)
> (16,29)(21,34)(23,41)(24,37)(26,48)(28,36)(32,39)(33,50)
> (35,58)(38,64)(40,66)(42,70)(43,74)(44,59)(45,78)(47,81)
> (49,85)(51,88)(54,93)(55,56)(57,99)(60,68)(61,73)(62,75)
> (63,109)(65,111)(67,112)(69,118)(71,121)(72,123)(76,126)(77,128)
> (82,95)(83,135)(84,137)(86,119)(87,142)(91,147)(92,151)(94,96)
> (97,143)(98,157)(101,114)(102,161)(103,127)(104,105)(106,166)(107,167)
> (108,169)(110,171)(113,174)(116,178)(117,154)(120,183)(124,162)(125,184)
> (129,138)(131,163)(132,189)(133,191)(134,195)(136,196)(139,181)(140,201)
> (141,190)(148,212)(149,208)(150,215)(152,217)(153,155)(156,206)(159,175)
> (160,224)(165,226)(170,228)(172,231)(173,233)(176,236)(177,239)(179,219)
> (180,193)(182,242)(186,199)(187,200)(188,245)(194,249)(198,216)(202,241)
> (203,207)(204,253)(213,223)(214,254)(218,221)(220,258)(222,257)(225,235)
> (227,264)(230,260)(232,243)(234,267)(237,256)(238,262)(240,261)(244,252)
> (246,270)(247,273)(248,271)(251,266)(255,259)(263,269)(268,276)(272,274)
> );;
gap> CustomDisplayCompositionSeries( g );
Group
 | Co(3)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
4957666560001 ]

# cube
gap> g := Group(
>   (1,3,8,6)(2,5,7,4)(9,48,15,12)(10,47,16,13)(11,46,17,14),
>   (9,11,26,24)(10,19,25,18)(1,12,33,41)(4,20,36,44)(6,27,38,46),
>   (12,14,29,27)(13,21,28,20)(6,15,35,26)(7,22,34,19)(8,30,33,11),
>   (15,17,32,30)(16,23,31,22)(3,43,35,14)(5,45,37,21)(8,48,40,29),
>   (33,35,40,38)(34,37,39,36)(24,27,30,43)(25,28,31,42)(26,29,32,41),
>   (41,43,48,46)(42,45,47,44)(1,24,40,17)(2,18,39,23)(3,9,38,32) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | Z(2)
Group
 | A(8) ~ A(3,2) = L(4,2) ~ D(3,2) = O+(6,2)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | A(12)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
43252003274489856000216260016372449280001072718335180800490497638400
  204821 ]

# gl10.2
gap> g:=
> Group( (257,513)(258,514)(259,515)(260,516)(261,517)(262,518)(263,519)
> (264,520)(265,521)(266,522)(267,523)(268,524)(269,525)(270,526)
> (271,527)(272,528)(273,529)(274,530)(275,531)(276,532)(277,533)
> (278,534)(279,535)(280,536)(281,537)(282,538)(283,539)(284,540)
> (285,541)(286,542)(287,543)(288,544)(289,545)(290,546)(291,547)
> (292,548)(293,549)(294,550)(295,551)(296,552)(297,553)(298,554)
> (299,555)(300,556)(301,557)(302,558)(303,559)(304,560)(305,561)
> (306,562)(307,563)(308,564)(309,565)(310,566)(311,567)(312,568)
> (313,569)(314,570)(315,571)(316,572)(317,573)(318,574)(319,575)
> (320,576)(321,577)(322,578)(323,579)(324,580)(325,581)(326,582)
> (327,583)(328,584)(329,585)(330,586)(331,587)(332,588)(333,589)
> (334,590)(335,591)(336,592)(337,593)(338,594)(339,595)(340,596)
> (341,597)(342,598)(343,599)(344,600)(345,601)(346,602)(347,603)
> (348,604)(349,605)(350,606)(351,607)(352,608)(353,609)(354,610)
> (355,611)(356,612)(357,613)(358,614)(359,615)(360,616)(361,617)
> (362,618)(363,619)(364,620)(365,621)(366,622)(367,623)(368,624)
> (369,625)(370,626)(371,627)(372,628)(373,629)(374,630)(375,631)
> (376,632)(377,633)(378,634)(379,635)(380,636)(381,637)(382,638)
> (383,639)(384,640)(385,641)(386,642)(387,643)(388,644)(389,645)
> (390,646)(391,647)(392,648)(393,649)(394,650)(395,651)(396,652)
> (397,653)(398,654)(399,655)(400,656)(401,657)(402,658)(403,659)
> (404,660)(405,661)(406,662)(407,663)(408,664)(409,665)(410,666)
> (411,667)(412,668)(413,669)(414,670)(415,671)(416,672)(417,673)
> (418,674)(419,675)(420,676)(421,677)(422,678)(423,679)(424,680)
> (425,681)(426,682)(427,683)(428,684)(429,685)(430,686)(431,687)
> (432,688)(433,689)(434,690)(435,691)(436,692)(437,693)(438,694)
> (439,695)(440,696)(441,697)(442,698)(443,699)(444,700)(445,701)
> (446,702)(447,703)(448,704)(449,705)(450,706)(451,707)(452,708)
> (453,709)(454,710)(455,711)(456,712)(457,713)(458,714)(459,715)
> (460,716)(461,717)(462,718)(463,719)(464,720)(465,721)(466,722)
> (467,723)(468,724)(469,725)(470,726)(471,727)(472,728)(473,729)
> (474,730)(475,731)(476,732)(477,733)(478,734)(479,735)(480,736)
> (481,737)(482,738)(483,739)(484,740)(485,741)(486,742)(487,743)
> (488,744)(489,745)(490,746)(491,747)(492,748)(493,749)(494,750)
> (495,751)(496,752)(497,753)(498,754)(499,755)(500,756)(501,757)
> (502,758)(503,759)(504,760)(505,761)(506,762)(507,763)(508,764)
> (509,765)(510,766)(511,767)(512,768), (   2,   3,   5,   9,  17,  33,
>    65129257513)(   4,   7,  13,  25,  49,  97193385769514
>  )(   6,  11,  21,  41,  81161321641258515)(   8,  15,  29,
>    57113225449897770516)(  10,  19,  37,  73145289,
>   577130259517)(  12,  23,  45,  89177353705386771518
>  )(  14,  27,  53105209417833642260519)(  16,  31,  61,
>   121241481961898772520)(  18,  35,  69137273545,
>    66131261521)(  20,  39,  77153305609194387773522
>  )(  22,  43,  85169337673322643262523)(  24,  47,  93,
>   185369737450899774524)(  26,  51101201401801,
>   578132263525)(  28,  55109217433865706388775526
>  )(  30,  59117233465929834644264527)(  32,  63125,
>   249497993962900776528)(  34,  67133265529)
> (  36,  71141281561,  98195389777530)(  38,  75149,
>   297593162323645266531)(  40,  79157313625226,
>   451901778532)(  42,  83165329657290579134267533
>  )(  44,  87173345689354707390779534)(  46,  91181,
>   361721418835646268535)(  48,  95189377753482,
>   963902780536)(  50,  99197393785546,  68135269537
>  )(  52103205409817610196391781538)(  54107213,
>   425849674324647270539)(  56111221441881738,
>   452903782540)(  58115229457913802580136271541
>  )(  60119237473945866708392783542)(  62123245,
>   489977930836648272543)(  64127253505,1009994,
>   964904784544)(  70139277553,  82163325649274547
>  )(  72143285569114227453905786548)(  74147293,
>   585146291581138275549)(  76151301601178355,
>   709394787550)(  78155309617210419837650276551
>  )(  80159317633242483965906788552)(  84167333,
>   665306611198395789554)(  86171341681338675,
>   326651278555)(  88175349697370739454907790556
>  )(  90179357713402803582140279557)(  92183365,
>   729434867710396791558)(  94187373745466931,
>   838652280559)(  96191381761498995966908792560
>  )( 100199397793562)( 102203405809594164327653,
>   282563)( 104207413825626228455909794564)
> ( 106211421841658292583142283565)( 108215429,
>   857690356711398795566)( 110219437873722420,
>   839654284567)( 112223445889754484967910796568
>  )( 116231461921818612200399797570)( 118235469,
>   937850676328655286571)( 120239477953882740,
>   456911798572)( 122243485969914804584144287573
>  )( 124247493985946868712400799574)( 126251501,
>  1001978932840656288575)( 128255509,1017,1010996,
>   968912800576)( 148295589154307613202403805586
>  )( 150299597170339677330659294587)( 152303605,
>   186371741458915806588)( 156311621218435869,
>   714404807590)( 158315629234467933842660296591
>  )( 160319637250499997970916808592)( 166331661,
>   298595)( 168335669314627230459917810596)
> ( 172343685346691358715406811598)( 174347693,
>   362723422843662300599)( 176351701378755486,
>   971918812600)( 180359717410819614204407813602
>  )( 182363725426851678332663302603)( 184367733,
>   442883742460919814604)( 188375749474947870,
>   716408815606)( 190379757490979934844664304607
>  )( 192383765506,1011998972920816608)( 206411821,
>   618212423845666308615)( 208415829634244487,
>   973922820616)( 214427853682340679334667310619
>  )( 216431861698372743462923822620)( 220439877,
>   730436871718412823622)( 222443885746468935,
>   846668312623)( 224447893762500999974924824624
>  )( 232463925826628)( 236471941858692360719414,
>   827630)( 238475949874724424847670316631)
> ( 240479957890756488975926828632)( 246491981,
>   938852680336671318635)( 248495989954884744,
>   464927830636)( 252503,1005986948872720416831638
>  )( 254507,1013,1002980936848672320639)( 256511,1021,
>  1018,1012,1000976928832640)( 342683)( 344687350699,
>   374747470939854684)( 348695366731438875726,
>   428855686)( 352703382763502,1003982940856688)
> ( 364727430859694)( 368735446891758492983942,
>   860696)( 376751478955886748472943862700)
> ( 380759494987950876728432863702)( 384767510,
>  1019,1014,1004984944864704)( 440879734444887750,
>   476951878732)( 448895766508,1015,1006988952880736
>  )( 480959894764504,1007990956888752)( 496991958,
>   892760)( 512,1023,1022,1020,1016,1008992960896768), 
> ( 257769)( 258770)( 259771)( 260772)( 261773)( 262774)
> ( 263775)( 264776)( 265777)( 266778)( 267779)( 268780)
> ( 269781)( 270782)( 271783)( 272784)( 273785)( 274786)
> ( 275787)( 276788)( 277789)( 278790)( 279791)( 280792)
> ( 281793)( 282794)( 283795)( 284796)( 285797)( 286798)
> ( 287799)( 288800)( 289801)( 290802)( 291803)( 292804)
> ( 293805)( 294806)( 295807)( 296808)( 297809)( 298810)
> ( 299811)( 300812)( 301813)( 302814)( 303815)( 304816)
> ( 305817)( 306818)( 307819)( 308820)( 309821)( 310822)
> ( 311823)( 312824)( 313825)( 314826)( 315827)( 316828)
> ( 317829)( 318830)( 319831)( 320832)( 321833)( 322834)
> ( 323835)( 324836)( 325837)( 326838)( 327839)( 328840)
> ( 329841)( 330842)( 331843)( 332844)( 333845)( 334846)
> ( 335847)( 336848)( 337849)( 338850)( 339851)( 340852)
> ( 341853)( 342854)( 343855)( 344856)( 345857)( 346858)
> ( 347859)( 348860)( 349861)( 350862)( 351863)( 352864)
> ( 353865)( 354866)( 355867)( 356868)( 357869)( 358870)
> ( 359871)( 360872)( 361873)( 362874)( 363875)( 364876)
> ( 365877)( 366878)( 367879)( 368880)( 369881)( 370882)
> ( 371883)( 372884)( 373885)( 374886)( 375887)( 376888)
> ( 377889)( 378890)( 379891)( 380892)( 381893)( 382894)
> ( 383895)( 384896)( 385897)( 386898)( 387899)( 388900)
> ( 389901)( 390902)( 391903)( 392904)( 393905)( 394906)
> ( 395907)( 396908)( 397909)( 398910)( 399911)( 400912)
> ( 401913)( 402914)( 403915)( 404916)( 405917)( 406918)
> ( 407919)( 408920)( 409921)( 410922)( 411923)( 412924)
> ( 413925)( 414926)( 415927)( 416928)( 417929)( 418930)
> ( 419931)( 420932)( 421933)( 422934)( 423935)( 424936)
> ( 425937)( 426938)( 427939)( 428940)( 429941)( 430942)
> ( 431943)( 432944)( 433945)( 434946)( 435947)( 436948)
> ( 437949)( 438950)( 439951)( 440952)( 441953)( 442954)
> ( 443955)( 444956)( 445957)( 446958)( 447959)( 448960)
> ( 449961)( 450962)( 451963)( 452964)( 453965)( 454966)
> ( 455967)( 456968)( 457969)( 458970)( 459971)( 460972)
> ( 461973)( 462974)( 463975)( 464976)( 465977)( 466978)
> ( 467979)( 468980)( 469981)( 470982)( 471983)( 472984)
> ( 473985)( 474986)( 475987)( 476988)( 477989)( 478990)
> ( 479991)( 480992)( 481993)( 482994)( 483995)( 484996)
> ( 485997)( 486998)( 487999)( 488,1000)( 489,1001)( 490,1002)
> ( 491,1003)( 492,1004)( 493,1005)( 494,1006)( 495,1007)( 496,1008)
> ( 497,1009)( 498,1010)( 499,1011)( 500,1012)( 501,1013)( 502,1014)
> ( 503,1015)( 504,1016)( 505,1017)( 506,1018)( 507,1019)( 508,1020)
> ( 509,1021)( 510,1022)( 511,1023)( 512,1024) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | A(9,2) = L(10,2
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
3664401372999481284228022272001 ]

# $J_2$ on 100 points
gap> g:= Group( (2,3,4,5,6,7,8)(9,10,11,12,13,14,15)
> (16,17,18,19,20,21,22)(23,24,25,26,27,28,29)(30,31,32,33,34,35,36)
> (37,38,39,40,41,42,43)(44,45,46,47,48,49,50)(51,52,53,54,55,56,57)
> (58,59,60,61,62,63,64)(65,66,67,68,69,70,71)(72,73,74,75,76,77,78)
> (79,80,81,82,83,84,85)(86,87,88,89,90,91,92)(93,94,95,96,97,98,99),
> (1,2,9,16,23,20,30,17)(3,35,13,29,31,24,25,11)(4,26,27,7)(5,21,14,10)
> (6,19,32,36)(8,18,28,22,15,12,33,34)(38,92,67,77,99,89,49,84)
> (39,59,82,46,88,54,52,68)(40,55,47,81,75,95,61,78)
> (41,44,63,58,72,65,50,51)(42,76,53,93,86,80,79,57)
> (43,85,48,70,96,83,66,94)(45,97)(56,87)(60,71,91,69,90,73,64,74)
> (62,98),
> (1,100)(2,74)(3,73)(4,72)(5,78)(6,77)(7,76)(8,75)(9,34)(10,33)(11,32)
> (12,31)(13,30)(14,36)(15,35)(16,71)(17,70)(18,69)(19,68)(20,67)(21,66)
> (22,65)(23,53)(24,52)(25,51)(26,57)(27,56)(28,55)(29,54)(37,91)(38,90)
> (39,89)(40,88)(41,87)(42,86)(43,92)(44,99)(45,98)(46,97)(47,96)(48,95)
> (49,94)(50,93)(58,85)(59,84)(60,83)(61,82)(62,81)(63,80)(64,79) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | HJ = J(2) = F(5-)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
6048001 ]

# neum on 240 points
gap> g:=
> Group( (  3,  8,  6)(  41623)(  586,119)(  791,149)
> (  98914)( 10,16418)( 111920)( 1274,120)( 13,10128)
> ( 155830)( 174535)( 213622)( 246725)( 26,13357)
> ( 27,13580)( 29,165,136)( 31,17732)( 339334)( 377949)
> ( 386663)( 399255)( 40,114,134)( 4168,115)( 425143)
> ( 448446)( 4778,116)( 48,15970)( 50,17575)( 52,21153)
> ( 54,212,188)( 59,141,142)( 60,129,110)( 61,231,230)( 62,140,139)
> ( 6472,107)( 65,184,172)( 69,14383)( 71,128,195)( 73,122,192)
> ( 76,225,228)( 7788,170)( 8187,137)( 82,227,154)( 85,109,108)
> ( 90,173,193)( 94,160,132)( 9599,118)( 96,213,148)( 97,218,150)
> ( 98,111,127)(100,124,117)(102,229,190)(103,167,138)(104,185,147)
> (105,180,174)(106,125,153)(112,113,186)(121,131,126)(123,168,205)
> (130,196,233)(144,197,223)(145,146,166)(151,155,152)(156,215,217)
> (157,207,187)(158,178,208)(161,226,232)(162,182,171)(163,181,198)
> (169,201,176)(179,238,210)(183,191,206)(189,209,236)(194,203,220)
> (200,222,221)(202,219,204)(214,224,234)(216,235,240), (  1,  3,  2)
> (  4,146,151)(  51141)(  766,109)(  92728)( 10,137,136)
> ( 124015)( 138632)( 1485,153)( 162617)( 18,129,133)
> ( 19,135,114)( 20,10873)( 219956)( 229495)( 23,14077)
> ( 24,15054)( 25,10296)( 293578)( 30,100,122)( 3137,192)
> ( 33,190,213)( 3497,105)( 36,160,118)( 386874)( 396065)
> ( 42,18475)( 436259)( 44,115,117)( 4592,141)( 468079)
> ( 476988)( 4867,212)( 49,106,120)( 5071,155)( 51,166,165)
> ( 52,148,159)( 53,173,180)( 5581,152)( 57,195,113)( 588972)
> ( 6364,177)( 7093,174)( 7698,182)( 82,161,147)( 83,110,145)
> ( 84,107,131)( 87,112,139)( 90,218,229)( 91,134,126)(101,124,149)
> (103,104,206)(111,181,228)(116,186,172)(119,121,125)(123,194,157)
> (127,223,225)(128,143,142)(130,220,222)(138,154,226)(144,198,171)
> (156,234,187)(158,237,236)(162,163,197)(164,170,175)(167,183,185)
> (168,221,240)(169,216,217)(176,224,202)(178,189,179)(188,211,193)
> (191,227,232)(196,207,215)(199,239,231)(200,201,233)(203,204,214)
> (205,219,235)(208,209,210), (  21116)(  31715)(  44710)
> (  512,  9)(  63943)(  7,162,147)(  83425)( 13,166,184)
> ( 1486,118)( 18,12619)( 202124)( 222393)( 262827)
> ( 29,185,182)( 304831)( 32,12833)( 353642)( 38,187,109)
> ( 406141)( 4473,201)( 455378)( 46,112,227)( 49,219,133)
> ( 506771)( 51,13152)( 54,17483)( 555658)( 57,139,220)
> ( 59,17060)( 62,23163)( 64,19965)( 66,189,114)( 68,135,194)
> ( 69,156,106)( 70,116,121)( 72,204,209)( 74,111,120)( 75,15992)
> ( 76,190,154)( 77,210,110)( 7980,222)( 81,208,158)( 82,235,228)
> ( 84,167,180)( 85,101,107)( 87,232,238)( 88,129,178)( 8994,119)
> ( 90,229,144)( 91,205,197)( 9599,117)( 96,16997)( 98,124,160)
> (100,127,132)(102,215,103)(104,196,105)(108,145,203)(113,130,191)
> (115,237,140)(122,225,155)(123,136,181)(125,233,214)(134,146,157)
> (137,179,161)(138,148,149)(141,226,142)(143,153,173)(150,152,186)
> (151,163,234)(164,175,177)(165,213,183)(168,218,176)(171,188,224)
> (172,236,200)(192,212,223)(193,198,240)(202,221,230)(206,217,216) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | A(2,4) = L(3,4)
Group
 | Z(2)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
4032021 ]

# regular
gap> g:= PrimitiveGroup( 116 );;
gap> elms:= AsList( g );;
gap> gens:= Concatenation( List( GeneratorsOfGroup( g ),
>            x -> [ PermList( List( [ 1 .. 7920 ],
>                       i -> Position( elms, elms[i] * x ) ) ),
>                   PermList( List( [ 1 .. 7920 ],
>                       i -> Position( elms, x^-1 * elms[i] ) ) ) ] ) );;
gap> reg:= Group( gens );;
gap> CustomDisplayCompositionSeries( g );
Group
 | M(11)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
79201 ]
gap> # $S_5 \wr S_5$ on 3125 points. 
gap> l:= [ (1,2,3,4,5), (1,2), (1,6,11,16,21)(2,7,12,17,22)(3,8,13,18,23)
>          (4,9,14,19,24)(5,10,15,20,25), (1,6)(2,7)(3,8)(4,9)(5,10) ];;
gap> tuptonum:= tup -> tup * [ 1525125625 ] - 15430;;
gap> numtotup:= function( num )
>    local tup,i;
>    tup:= [];
>    num:= num-1
>    for i in [ 1 .. 5 ] do
>      tup[i]:= (num mod 5) + 1 + 5*(i-1);
>      num:= (num - tup[i] + 5*(i-1) + 1)/5;
>    od;
>    return tup;
>    end;;
gap> gens:= [];;
gap> for j in [ 1 .. 4 ] do
>      gens[j]:= [];
>      for i in [ 1 .. 3125 ] do
>        tup:= numtotup(i);
>        for k in [ 1 .. 5 ] do 
>          tup[k]:= tup[k]^l[j];
>        od;
>        Sort(tup);
>        gens[j][i]:=tuptonum(tup);
>      od;
>    od;
gap> g:= Group( List( gens, PermList ), () );;
gap> CustomDisplayCompositionSeries( g );
Group
 | Z(2)
Group
 | Z(2)
Group
 | A(5) ~ A(1,4) = L(2,4) ~ B(1,4) = O(3,4) ~ C(1,4) = S(2,4) ~ 2A(1,4) = U(2,\
4) ~ A(1,5) = L(2,5) ~ B(1,5) = O(3,5) ~ C(1,5) = S(2,5) ~ 2A(1,5) = U(2,5)
Group
 | Z(2)
Group
 | A(5) ~ A(1,4) = L(2,4) ~ B(1,4) = O(3,4) ~ C(1,4) = S(2,4) ~ 2A(1,4) = U(2,\
4) ~ A(1,5) = L(2,5) ~ B(1,5) = O(3,5) ~ C(1,5) = S(2,5) ~ 2A(1,5) = U(2,5)
Group
 | Z(2)
Group
 | A(5) ~ A(1,4) = L(2,4) ~ B(1,4) = O(3,4) ~ C(1,4) = S(2,4) ~ 2A(1,4) = U(2,\
4) ~ A(1,5) = L(2,5) ~ B(1,5) = O(3,5) ~ C(1,5) = S(2,5) ~ 2A(1,5) = U(2,5)
Group
 | Z(2)
Group
 | A(5) ~ A(1,4) = L(2,4) ~ B(1,4) = O(3,4) ~ C(1,4) = S(2,4) ~ 2A(1,4) = U(2,\
4) ~ A(1,5) = L(2,5) ~ B(1,5) = O(3,5) ~ C(1,5) = S(2,5) ~ 2A(1,5) = U(2,5)
Group
 | Z(2)
Group
 | A(5) ~ A(1,4) = L(2,4) ~ B(1,4) = O(3,4) ~ C(1,4) = S(2,4) ~ 2A(1,4) = U(2,\
4) ~ A(1,5) = L(2,5) ~ B(1,5) = O(3,5) ~ C(1,5) = S(2,5) ~ 2A(1,5) = U(2,5)
Group
 | A(5) ~ A(1,4) = L(2,4) ~ B(1,4) = O(3,4) ~ C(1,4) = S(2,4) ~ 2A(1,4) = U(2,\
4) ~ A(1,5) = L(2,5) ~ B(1,5) = O(3,5) ~ C(1,5) = S(2,5) ~ 2A(1,5) = U(2,5)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
29859840000001492992000000746496000000124416000007776000001 ]

# sol768.gen
gap> g:=
> Group( (  1,  4)(  2,  5)(  373)(  9,17528,18812,172)
> ( 10,177,132,22113,174)( 11,17675,55214,173)( 15,166)( 16,168)
> ( 17,167)( 18,482)( 19,217)( 20,612)( 21,39424,53042,164)
> ( 22,39525,209,141,165)( 23,16326,61486,388)( 29,43643,51233,
>  186)( 30,61947,49834,196)( 31,181,424,201,454,184)
> ( 32,437,445,62235,180)( 36,462,375,185,461,474)( 37,169)
> ( 38,17839,455,475,182)( 40,48941,434,444,191)( 44,52851,187,440,
>  62)( 45,446,467,41557,531)( 46,194,376,527,51565)( 48,47655,504,
>  404,481)( 496650645471)( 52,532,441,192,61169)
> ( 5370,373,193,20863)( 56,18358,179,435,190)( 59,49561,49460,
>  502)( 67,714,469,508,432,496)( 68,497,189,430,517,422)( 7274)
> ( 76,21987,386,443,218)( 77,66292,118,447,598)( 78,213,600,240,648,
>  576)( 79,397,110,59280,212)( 81,239,607,216,112,486)( 82,170)
> ( 83,222,458,214,452,210)( 84,65685,223,385,228)( 88,65797,220,574,
>  116)( 89,52398,492,398,591)( 90,234,381,522,580,121)
> ( 91,232,584,500,101,499)( 93,226,103,503,413,524)( 94,225,104,505,113,
>  661)( 95,16096,158,105,162)( 99,493,107,593,114,479)
> (100,605,411,231,596,161)(102,126,145,122,146,119)(106,215,108,211,401,
>  227)(109,590,115,511,111,408)(117,149,125,377,554,247)
> (120,233,389,660,765,159)(123,382,664,763,230,390)(124,148,588,246,595,
>  573)(127,550,425,752,448,575)(128,551,142,393,135,249)
> (129,556,380,248,154,487)(130,392,133,621,144,157)(131,549,138,623,412,
>  597)(134,403,152,750,136,546)(137,171)(139,755,140,643,599,553)
> (143,601,147,655,379,156)(150,626,151,606,391,744)(153,501,387,610,155,
>  427)(195,471,205,632,275,642)(197,206,266,268,625,261)
> (198,293,207,483,200,637)(199,490,263,202,260,635)(203,712,509,269,279,
>  711)(204,529,274,267,651,459)(224,609,229,384,518,383)
> (235,346,680,348,442,702)(236,699,243,478,748,710)(237,244,352,354,698,
>  350)(238,757,747,344,245,603)(241,737,615,340,544,733)
> (242,672,488,673,652,353)(250,466,477,506,252,484)(251,259,347,311,400,
>  730)(253,257,295,258,297,693)(254,296)(255,306)(256,351)
> (262,283,624,620,271,485)(264,287,641)(265,421)(270,280,423,289,405,272
>  )(273,277,450,692,281,420)(276,634,282,716,290,653)(278,534,520,713,
>  533,525)(284,291,438,706,439,721)(285,374,292,451,638,644)
> (286,719,491,288,473,433)(294,715,645)(298,308,312,726,302,307)
> (299,666,314,568,303,327)(300,301,725,640,463,304)(305,332,456)
> (309,650,310,313,723,318)(315,355,325,417,367,510)(316,322,317,399,326,
>  409)(319,756,372,470,557,631)(320,602,361,694,369,410)(321,670,604)
> (323,683,519,687,686,608)(324,617,449,671,682,564)(328,370,538,696,732,
>  669)(329,378,337,675,331,416)(330,768,753,366,722,762)
> (333,558,678,717,742,559)(334,407,341,572,745,419)(335,414,356,613,746,
>  583)(336,561,582,758,679,362)(338,342,586,339,359,700)
> (343,736,740,728,585,555)(345,365,457)(349,667,639,761,751,707)
> (357,571,406)(358,663,690,658,734,541)(360,543,565,676,739,542)
> (363,735,371,684,364,418)(368,727,759,743,685,741)(396,514,567,579,566,
>  581)(402,513,616,426,545,766)(429,563,691,594,537,535)
> (431,704,647,708,720,453)(460,709,464,472,465,636)(468,633,646)
> (507,630,526,627,516,654)(521,689,540,539,764,570)(547,677,695,665,697,
>  729)(548,560)(562,754,578,674,681,731)(569,659)(577,668,587,738,589,
>  760)(618,701,724,688,749,703)(628,767)(649,718,705), (  1,  985,514,
>  38,398,  310,140,513,13157)(  2114167,452,107)
> (  4,516,310,590,328,195)(  5,535,353,495,284,37273,521,459,610,362,
>  236)(  6,394,453,343,249,746,  7,163,562,293,218,282)(  8,395,741,344,
>  186,361)( 124691,611,4979314,120,377,573,38248)
> ( 1390,373,596,38394)( 15,46989,127,454,44716,5794578,448,
>   34)( 17,426,11431,648,130)( 18,103,380,247,14939)
> ( 1955,607,208,101,13820,104,375,5845383)( 21,422,153,12851,
>   8122,3906076,14736)( 23,384,1112997,129)( 2498,379,246,
>  14640)( 25,467,574,44196,1392699,440,4115084)
> ( 27,250,116,374,307,12374,25162,735,19768)( 28,387,13259)
> ( 30,112,137,15133,413,133,1548258,443,113)( 3287,141,41235,
>  155,134,14286,47580,115)( 37,108,135,40477,461)( 42,458,13661,
>  7943)( 4492,58054,376,385)( 47,515,105,389,599,143,144,765,102,
>  381,44488)( 49,106)( 52,432,401,445,600,763)( 5695,150,145)
> ( 63,460,520,118,273,568)( 64,670,699,121,764,269,158,571,47165,526,
>  564)( 66,438,421,194,705,534,160,538,255,233,703,683)( 69,317,267,175,
>  320,652,124,450,309,177,276,650)( 70,708,466,517,720,633,499,743,258,
>  229,685,665)( 71,322,266,169,325,457,126,277,308,171,280,456)
> ( 72,295,156,378,237,518)( 75,109)(100,766,391,152,425,609,148,581,435,
>  110,424,430)(117,360,690,498,316,485,500,589,519,157,338,235)
> (119,645,470,159,594,340)(122,561,256,234,724,663)(125,681,259,230,731,
>  547)(161,586,673,176,356,651)(162,342,352,170,745,641)
> (164,355,541,588,583,509)(165,572,608,532,694,615,388,270,525,605,716,
>  682)(166,684,243,180,719,303,168,675,205,212,768,262)(167,451,557,546,
>  742,346)(172,602,238,178,647,305,174,613,200,210,759,264)
> (173,634,728,549,674,345)(179,718,265,598,669,241)(181,706,506,386,559,
>  245)(182,367,348,462,628,327)(183,428,740,224,366,490,215,629,483,189,
>  288,463)(184,371,349,455,630,726)(185,627,756,545,370,274,216,570,642,
>  508,291,318)(187,654,319,755,406,686,655,429,748,489,604,734)
> (188,439,304,567,722,268)(190,510,323,505,727,204,227,405,278,503,578,
>  242)(191,649,484,492,638,298)(192,418,620,240,678,478,595,416,442,201,
>  433,631)(193,417,529,223,542,737,554,419,672,434,636,671)
> (196,721,449,606,701,306,392,679,203,211,749,351)(198,530,363,347,402,
>  540)(199,397,653,646,501,739,639,437,410,697,408,587)(202,592,760,296,
>  494,369,707,750,543,254,511,335)(206,228,688,730,415,364,244,553,618,
>  257,493,331)(207,213,582,693,512,491,736,550,696,311,393,753)
> (209,285,477,496,507,555,614,329,297,396,563,747)(214,289,299,556,560,
>  680,597,334,624,239,659,283)(217,577,350,660,668,365,612,565,261,527,
>  472,332)(219,569,279,486,420,713)(220,689,275,656,294,533)
> (221,732,751,616,558,354,552,758,263,714,473,312)(222,539,625,576,292,
>  301,623,691,698,575,337,260)(225,692,468,591,272,252,226,339,695,593,
>  341,400)(231,644,666,752,762,632)(232,423,723,643,738,712)
> (248,537,710,566,336,488)(253,476,399,729,531,315)(271,524,359,711,657,
>  754)(281,617,601,368,702,481,326,733,528,431,314,661)(286,725,479,715,
>  585,621,717,667,446,321,757,619)(287,482,464,302,522,676)
> (290,300,622,709,480,427)(313,744,407,358,504,704)(324,487,700,658,551,
>  548,544,474,409,687,436,767)(330,635,523,357,637,662)(333,761,626,536,
>  603,664)(403,414,677,502,465,640) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | Z(2)
Group
 | Z(3)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(2)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
 | Z(3)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
108839116854419558418139852845349632226748162519424839808
  1312265611 ]

# $Suz$ on 1782 points
gap> g:=
> Group( (   2,   3)(   8,  14)(   9,  15)(  11,  17)(  13,  24)
> (  16,  25)(  18,  31)(  20,  28)(  23,  40)(  26,  29)(  27,  43)
> (  30,  54)(  32,  57)(  35,  48)(  36,  64)(  38,  68)(  39,  69)
> (  42,  49)(  44,  50)(  45,  77)(  46,  72)(  47,  73)(  51,  87)
> (  52,  91)(  53,  93)(  55,  96)(  56,  97)(  58101)(  60,  80)
> (  61,  81)(  62106)(  63109)(  65111)(  67114)(  71,  82)
> (  74,  84)(  75,  85)(  76124)(  78120)(  79119)(  86133)
> (  88138)(  89140)(  90144)(  92147)(  94149)(  95150)
> (  98125)(  99155)( 100158)( 102160)( 104129)( 105164)
> ( 107166)( 108168)( 110170)( 113174)( 115171)( 118130)
> ( 121131)( 122182)( 123183)( 126178)( 127187)( 128177)
> ( 132191)( 134153)( 135195)( 136198)( 137201)( 139203)
> ( 141204)( 142208)( 143210)( 145213)( 146214)( 148217)
> ( 151184)( 154223)( 156225)( 157227)( 159229)( 162189)
> ( 163233)( 165235)( 167239)( 169241)( 172244)( 173246)
> ( 175242)( 179251)( 180190)( 181254)( 185249)( 186260)
> ( 188248)( 192220)( 193267)( 194270)( 196273)( 197275)
> ( 199277)( 200279)( 202281)( 205285)( 206283)( 207288)
> ( 209292)( 211295)( 212296)( 215282)( 216256)( 218257)
> ( 222306)( 224308)( 226311)( 228313)( 230315)( 231263)
> ( 232319)( 234321)( 236299)( 237325)( 238328)( 240331)
> ( 243334)( 245336)( 247332)( 250342)( 252264)( 253347)
> ( 255343)( 258340)( 259355)( 261357)( 262359)( 265303)
> ( 266363)( 268366)( 269368)( 271371)( 272365)( 274374)
> ( 276376)( 278380)( 280382)( 284387)( 286385)( 287391)
> ( 289377)( 290344)( 291397)( 293401)( 294402)( 297383)
> ( 298349)( 300384)( 301409)( 305413)( 307415)( 309418)
> ( 310422)( 312425)( 314427)( 316429)( 317432)( 318435)
> ( 320438)( 322405)( 323442)( 324446)( 326449)( 327450)
> ( 329453)( 330448)( 333458)( 335461)( 337462)( 338455)
> ( 339456)( 341468)( 345472)( 346474)( 348469)( 350372)
> ( 351394)( 352481)( 353466)( 354485)( 356487)( 358426)
> ( 360491)( 361493)( 362495)( 364498)( 367500)( 369503)
> ( 370497)( 373507)( 375509)( 378513)( 379516)( 381519)
> ( 386524)( 388527)( 389483)( 390530)( 392510)( 393470)
> ( 395408)( 396536)( 398540)( 399538)( 400543)( 403520)
> ( 404476)( 406521)( 407551)( 411554)( 412557)( 414560)
> ( 416563)( 417567)( 419570)( 420573)( 421575)( 423578)
> ( 424569)( 428583)( 430586)( 431588)( 433593)( 434594)
> ( 436597)( 437591)( 439546)( 440604)( 441608)( 443611)
> ( 444596)( 445614)( 447617)( 451620)( 452616)( 454618)
> ( 457492)( 459627)( 460626)( 463631)( 464632)( 465471)
> ( 467638)( 473643)( 475639)( 477504)( 478533)( 479580)
> ( 480653)( 482656)( 484659)( 486662)( 488582)( 489666)
> ( 490667)( 494673)( 496676)( 501679)( 502675)( 505683)
> ( 506686)( 508689)( 511692)( 512561)( 514696)( 515610)
> ( 517698)( 518562)( 522703)( 523705)( 525708)( 526711)
> ( 528714)( 529715)( 531690)( 532640)( 534550)( 535706)
> ( 537725)( 539727)( 541635)( 542731)( 544728)( 545645)
> ( 547700)( 548701)( 549741)( 552744)( 553748)( 555752)
> ( 556753)( 558756)( 559750)( 564764)( 565598)( 566768)
> ( 568771)( 572777)( 574779)( 576781)( 577770)( 579772)
> ( 581785)( 584787)( 585791)( 587795)( 589796)( 590799)
> ( 592801)( 595805)( 599802)( 600733)( 601710)( 602707)
> ( 603815)( 605818)( 606806)( 607822)( 609825)( 612804)
> ( 613829)( 615831)( 619830)( 621832)( 622833)( 623834)
> ( 624840)( 625841)( 628842)( 629827)( 630843)( 633852)
> ( 634849)( 636855)( 637856)( 641860)( 642861)( 644862)
> ( 646680)( 647859)( 648718)( 649746)( 650760)( 651873)
> ( 652759)( 654876)( 655877)( 657702)( 658881)( 660878)
> ( 661886)( 663786)( 664755)( 665890)( 668895)( 669898)
> ( 670899)( 672903)( 674905)( 678907)( 681912)( 682814)
> ( 684917)( 685824)( 687919)( 688762)( 691743)( 693925)
> ( 694926)( 695927)( 697929)( 699928)( 704937)( 709942)
> ( 712946)( 713947)( 716948)( 717858)( 719921)( 720737)
> ( 721722)( 723961)( 724962)( 726965)( 729932)( 730970)
> ( 732971)( 734968)( 735969)( 736980)( 738933)( 739934)
> ( 740987)( 742788)( 745994)( 747897)( 749998)( 751,1000)
> ( 754,1003)( 757766)( 758,1001)( 761,1009)( 763,1011)( 767,1015)
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> ( 794,1043)( 797,1046)( 798,1047)( 800,1050)( 803,1055)( 807,1048)
> ( 808,1052)( 809,1053)( 810943)( 811,1065)( 812,1066)( 813,1069)
> ( 816,1073)( 817,1074)( 820,1056)( 821,1081)( 823,1082)( 826,1075)
> ( 828,1086)( 835,1088)( 836,1089)( 837,1090)( 838944)( 839,1091)
> ( 844,1033)( 845,1079)( 846,1099)( 847,1101)( 848,1106)( 850,1109)
> ( 851,1111)( 853,1113)( 854,1114)( 857,1115)( 863,1116)( 864,1127)
> ( 865,1128)( 866,1135)( 867909)( 868,1122)( 869955)( 870990)
> ( 871,1140)( 872,1141)( 874,1031)( 875,1144)( 879,1151)( 880,1152)
> ( 882,1145)( 883,1154)( 884,1149)( 885,1160)( 887,1004)( 888,1163)
> ( 889,1164)( 891,1165)( 892894)( 893,1098)( 896959)( 902,1178)
> ( 904,1179)( 906,1181)( 908924)( 910991)( 911,1063)( 913,1187)
> ( 914,1068)( 915,1189)( 916,1190)( 918,1192)( 920,1191)( 922,1197)
> ( 923988)( 930,1199)( 931,1198)( 935,1208)( 936,1209)( 938,1210)
> ( 939,1213)( 940,1214)( 941,1136)( 945,1219)( 949,1195)( 950,1220)
> ( 951,1118)( 952,1224)( 953,1225)( 954,1234)( 956,1196)( 957981)
> ( 958,1240)( 960,1242)( 963,1243)( 964967)( 966,1248)( 972,1260)
> ( 973,1257)( 974,1258)( 975,1265)( 976,1254)( 977,1270)( 978,1085)
> ( 979,1273)( 982,1279)( 983,1206)( 984,1100)( 985,1207)( 986,1237)
> ( 989,1020)( 992,1287)( 993,1288)( 995,1291)( 996,1292)( 997,1293)
> ( 999,1296)(1002,1300)(1005,1294)(1006,1298)(1007,1027)(1008,1305)
> (1010,1307)(1012,1306)(1014,1289)(1022,1035)(1025,1314)(1028,1310)
> (1029,1311)(1030,1255)(1036,1319)(1037,1320)(1038,1078)(1040,1326)
> (1041,1327)(1044,1051)(1045,1328)(1049,1334)(1054,1338)(1057,1330)
> (1058,1332)(1059,1333)(1060,1076)(1061,1336)(1062,1217)(1064,1349)
> (1070,1355)(1071,1356)(1072,1357)(1080,1361)(1083,1095)(1084,1096)
> (1087,1329)(1092,1365)(1093,1366)(1094,1218)(1097,1227)(1102,1379)
> (1103,1174)(1104,1171)(1105,1384)(1107,1386)(1108,1387)(1110,1388)
> (1112,1390)(1117,1392)(1119,1393)(1120,1394)(1121,1403)(1123,1147)
> (1124,1126)(1125,1173)(1129,1416)(1130,1419)(1131,1412)(1132,1424)
> (1133,1414)(1134,1428)(1137,1404)(1138,1236)(1139,1431)(1142,1432)
> (1143,1148)(1146,1441)(1150,1271)(1153,1447)(1155,1439)(1156,1158)
> (1157,1457)(1159,1460)(1161,1461)(1162,1464)(1166,1376)(1167,1466)
> (1168,1377)(1169,1374)(1170,1375)(1172,1473)(1175,1477)(1177,1479)
> (1180,1186)(1182,1481)(1183,1346)(1184,1368)(1185,1284)(1188,1484)
> (1193,1485)(1194,1483)(1200,1308)(1201,1343)(1202,1304)(1203,1435)
> (1204,1499)(1205,1502)(1211,1448)(1212,1508)(1215,1511)(1216,1223)
> (1221,1350)(1222,1506)(1226,1519)(1228,1530)(1229,1533)(1230,1525)
> (1231,1538)(1232,1520)(1233,1542)(1235,1546)(1238,1491)(1239,1276)
> (1241,1552)(1244,1554)(1245,1555)(1246,1556)(1247,1563)(1249,1256)
> (1250,1564)(1251,1565)(1252,1425)(1253,1462)(1259,1532)(1261,1580)
> (1262,1575)(1263,1582)(1264,1509)(1266,1584)(1267,1536)(1268,1363)
> (1269,1274)(1272,1586)(1275,1588)(1277,1589)(1278,1562)(1280,1503)
> (1281,1318)(1282,1548)(1283,1587)(1285,1590)(1286,1591)(1290,1297)
> (1295,1492)(1299,1570)(1301,1594)(1302,1597)(1303,1598)(1309,1372)
> (1313,1321)(1315,1606)(1316,1504)(1317,1572)(1322,1610)(1323,1352)
> (1324,1360)(1325,1613)(1331,1617)(1335,1359)(1337,1524)(1339,1615)
> (1340,1616)(1341,1358)(1342,1618)(1344,1539)(1345,1609)(1347,1627)
> (1348,1480)(1353,1629)(1354,1630)(1362,1369)(1364,1614)(1367,1397)
> (1370,1633)(1371,1518)(1373,1527)(1378,1642)(1380,1644)(1381,1472)
> (1382,1649)(1383,1652)(1385,1654)(1389,1655)(1391,1653)(1395,1663)
> (1396,1658)(1398,1456)(1399,1422)(1400,1660)(1401,1668)(1402,1498)
> (1405,1442)(1406,1443)(1407,1662)(1408,1474)(1409,1475)(1410,1415)
> (1411,1559)(1413,1676)(1417,1426)(1418,1679)(1420,1681)(1421,1684)
> (1423,1476)(1427,1568)(1429,1526)(1430,1547)(1433,1689)(1434,1592)
> (1436,1687)(1437,1688)(1438,1693)(1440,1540)(1444,1500)(1445,1450)
> (1446,1571)(1449,1694)(1451,1529)(1452,1455)(1453,1458)(1454,1700)
> (1459,1702)(1463,1705)(1465,1596)(1467,1638)(1468,1707)(1469,1639)
> (1470,1636)(1471,1637)(1478,1718)(1482,1635)(1486,1604)(1487,1622)
> (1488,1620)(1489,1722)(1490,1726)(1493,1605)(1494,1573)(1495,1514)
> (1496,1600)(1497,1599)(1501,1603)(1505,1507)(1510,1667)(1512,1551)
> (1513,1714)(1515,1733)(1516,1734)(1517,1737)(1521,1730)(1522,1731)
> (1523,1680)(1528,1739)(1531,1717)(1534,1576)(1535,1632)(1537,1543)
> (1541,1696)(1544,1741)(1545,1743)(1549,1558)(1550,1656)(1553,1685)
> (1557,1648)(1560,1736)(1561,1746)(1566,1692)(1567,1645)(1569,1704)
> (1574,1748)(1577,1701)(1578,1669)(1579,1754)(1581,1756)(1583,1695)
> (1585,1758)(1593,1686)(1595,1720)(1601,1760)(1602,1755)(1607,1611)
> (1608,1728)(1612,1628)(1619,1690)(1621,1763)(1623,1631)(1624,1761)
> (1626,1719)(1634,1664)(1640,1682)(1641,1769)(1643,1677)(1646,1713)
> (1647,1703)(1650,1651)(1657,1715)(1659,1683)(1661,1698)(1665,1699)
> (1666,1742)(1670,1768)(1671,1774)(1672,1711)(1673,1675)(1674,1776)
> (1678,1727)(1691,1759)(1697,1738)(1706,1750)(1708,1753)(1709,1778)
> (1710,1773)(1712,1757)(1716,1777)(1723,1729)(1724,1765)(1725,1764)
> (1732,1775)(1735,1747)(1740,1752)(1744,1749)(1745,1772)(1751,1779)
> (1770,1771), (   1,   5,  39386390490688452414315800,
>   902628823557448245709205,  51,  11)(   3,  73640,
>   715644,1750792756,1131409144439,1318836226,1260,1394,
>  734182,  31,   6)(   4,  34128717,1604722,1341,1627,1009232,
>  461,1136,1501,1640834,1409973171550,  30,  42)(   7257219,
>  260680659732,1089766,1256857,1671703600878,1531,1457,
>  1741,1266977,  52)(   8,  69259824574625880,1072993,
>   608569316940338605,1178960,1064757156,  20)
> (   9,  22532421,1244,1381,1559,1335465,1099714,1436667602,
>  1389966,1752,1638430111,  29)(  10,  15,  47,  82356718,
>   881623979971,1736,1442666762919,1484925352,1051,1231,
>  89)(  12393274929725885809736,1392,1776870892566,
>  1203984,1774,1161802952251,  90)(  13132113575633,
>   598107)(  14,  61162450568482433,1477872293624,
>   822770,1080997784704,1184380196,  56)(  16118103,
>   805,1294,1474631607578,1410,1713649,1433,1468,1058305583,
>  1066,1333783,  99)(  17,  81,  70114247610329555,1324,
>  1482695,1038,1518761,1479992507268145,  48,  41)
> (  18130486,1281,1706,1400408)(  19,  79192178509,1549,
>  1737,1084172,1195,1255,1378,1502359,1017,1252,1513343,  63220,
>  141)(  21498475685,1319,1304899701,1695,1561621,1355926,
>  1696,1337982682,1465,1173,1643458)(  23284,  86,  67374,
>   272165)(  24148189523936346,1045,1626906195224,
>    35104227918,1607694726400935142)(  25218185,
>  1314,1062742,1174957,1703588,1623,1767,1027,1739,1085866,1402,
>  1380,1100622,  62)(  26265249781,1565891,1757799309,
>  1101,1264,1149785,1670,1692728,1606827584967377)
> (  27,  49303206161,1082,1302494,1146,1421,1598987,1440,1664,
>  1274,1382,1336,1406864147154)(  28176341753616999,
>  1177518330,  65,  32116174658,1041422665806312730,
>  92)(  33308295434,1464896846445,1725692,1361691,1163,
>  1650,1254604863,1738,1129,1545358)(  36153,  75662,1430,
>   683774611,1233862,1742,1374942,1157,1678,1063,1164,1473,1102,
>  1710808)(  37676,1207,1095,1012399920,1248893444,1036,
>  1345930,1220,1446262,1015472344254,  54)(  38275502,
>   778724798,1718924804763673851,1013328419634122,
>  223375777335)(  40186368595755888812,1182460,1033,
>  767636337596564101271,  95129,  76207)(  43470347,
>  340,1595842,1216,1634,1340,1068,1761499890,1768,1338536,1614,
>  1204,1423384105)(  44487720985,1758,1753586449954,
>  1115,1732,1672,1777,1701,1633,1079,1512,1646,1544215510)
> (  45123287246945463,  80)(  46134,  53,  71,  59415,
>   856544,1699,1259,1243,1475,1271,1253,1196,1147,1560710453,1019,
>  314)(  50119476530,1754,1251,1581,1667933601336388,1686,
>  1746,1663,1416,1532,1439,1190136170)(  55,  83,  94117250,
>   495754845687,1478514,1112459712797,1347,1020239443,
>  64110)(  57191391556,1111,1213,1685,1401120376403,1404,
>   491,1771,1438909,1227,1375801,1537350)(  58298157,1118,
>   976394242737258,1622772,1114,1444,1659,1711,1059813,1609,
>  571825,1006)(  60158369467,1110,1008,1325567139201675,
>  1025,1070,1625874319830889,1078573428)(  66,1003,1422,
>   548,1516,1662735,1575,1093,1635,1781378,1653963,1138814,1176,
>  931135,  98,  93)(  68175168697,1175267364211263713,
>  944435424102212253594577674875489)(  72349133,
>  288362883,1534,1061,  84235150342143112,1307,1414,1316,
>  1775938833243)(  74229180620,1311612,1322,1624699,
>  1125,1769,1644,1572,1328,1005479261533332,1547,1132)
> (  77302355,1280,1760,1242,1432,1092310,1391,1167,1510,1407,1472,
>  585560,1450,1687795,1230300)(  78281700572964,1569,1159)
> (  85177951,1676,1602,1759660,1272,1454292,1448,1498,1702,1039,
>  1011,1128839214406124221)(  87183304204184152,
>   217468466,1720,1240,1592,1571986,1142955,1397,1587,1043471,
>  256)(  88371741353,1620,1719927)(  91322648776,1765,
>   561,1077519656,1279837,1371,1782512972599291,1689,1107,
>  1236,1262)(  96387520483,1617,1197898,1044716,1668,1155,
>   455,1460,1458,1726535,1334,1288541299477)(  97149524,
>  1558,1310961,1636,1419739,1690,1104947395469108858,1156,
>  1637593323166)( 100404327,1596,1428456831,1497481,
>  1194193405646485,1700969,1594,1250838396216)
> ( 106159294529,1186629850941996,1035473360437326,
>  537146181306576939587)( 109169354816,1323,1762989,
>  464590,1611,1007427769654592539,1218516240641115)
> ( 121313389,1483,1305,1054953,1424884285383190,1026397,
>  1487,1309230,1350,1083552160)( 125410283886,1723,1443,
>  1540,1339412,1086998488829752441425,1520,1704,1398,1463,
>  140)( 126382,1282,1434255194151)( 127270307231614,
>   381,1313563780904,1353,1766693138497280,1024,1014854,
>  817642)( 131321638,1577,1246,1494,1453,1533,1553,1586,1121,1120,
>  1751,1119208266546,1503426,1223282)( 137503,1491,1030,
>  1666,1500351)( 155276233451749,1321745)( 163248,1221,
>  1683,1618554847,1511,1717835,1629696865,1747,1680868,1368,
>  914677203521)( 164228484,1348,1004508,1022325436559,
>  447,1354,1023542913198370234173768199)( 167,1116,1705,
>  1370,1141,1127937,1342,1299,1232,1601672,1722513,1021570,1228,
>  1418603,1312,1202)( 179363496637,1286686501655684,
>   958811334615,1188907,1241,1071,1612,1780,1181651)
> ( 187504402,1548,1526,1578,1661522,1193,1605820,1295663,1514,
>  1258,1708,1654,1042579841,1212)( 188949,1437,1270,1681897,
>  1435,1135,1171606,1002324,1631759429526,1049416225213,
>  222)( 197241286668,1656,1665209630,1550,1273,1426,1566,1527,
>  1429,1379707645,1455,1377525290)( 200,1192,1630,1031492,
>   236478)( 202279365)( 210,1154,1268740,1745990,1191,1645,
>   796,1764,1721908,1134,1515,1073379,1037,1489511273551)
> ( 237932,1123,1642,1779882,1261,1573,1466,1731848,1712,1431,1277,
>  289392531,1137,1187480803)( 238,1297,1528252,1331562689,
>  876,1649,1486,1564,1327782877934,1075,1224,1349,1600635,1076)
> ( 244613,1352775446517,1360500828,1628678786,1010903,
>  1162853871995,1040418320)( 264,1343,1525815,1290950,
>  1130832,1000,1445719,1682,1582,1028,1144983,1615,1287,1675,1451,
>  1697)( 269661,1145,1535681366348)( 277297690385,1211,
>   807,1217,1199,1267911679580,1507980,1385840708,1655,1568,
>  440900)( 278,1034,1300965,1091627,1749,1563,1090750,1320,1492,
>  1390,1517981,1150974,1048,1306,1519,1356)( 296547705,1608,
>  1189,1597,1552,1772,1652,1363339,1081744617,1570457,1505,1117,
>  975,1269372)( 301407549,1238,1733,1291,1168,1651,1529,1105,1660,
>  1263,1160,1411,1469,1603912,1387721,1060727)( 311609413,
>  1016,1108723793)( 317671852,1744,1694,1292626,1050860,
>  1506,1098591,1185,1551,1546,1096540,1283,1180,1427,1585)
> ( 318,1289538545,1362743905760,1364,1493873,1490,1425647,
>  1357,1298731,1359,1234,1245818)( 331,1225,1330,1200,1408,1209,
>   968,1065,1538,1756991,1179,1346988,1151,1583,1366664789,1724,
>  652)( 333,1495867,1265,1470,1580,1206)( 345894946,1557,1413,
>   657,1358420,1103,1057,1183928,1673702357534639515,1284,
>  1441826)( 361,1329,1496,1530,1693,1405,1208,1459,1393,1152,1303,
>  1688,1369,1308959,1485,1018,1113,1170,1046758)( 367879,1714,
>  1632,1122462,1778,1555,1140,1471,1590,1647,1166,1219738,1462,1278,
>  943779493,1488)( 373787,1126,1727,1734,1728,1388,1399618855,
>  1210,1677,1584747765597,1001,1226401,1616,1029)
> ( 398,1139581528,1285916790)( 411901771,1476,1684,1169,
>  1214,1257,1613553819698849,1621,1599,1415978,1367956,1588,
>  1326)( 417,1148,1239,1589,1344,1658,1047)( 423,1172794442619,
>   558,1056)( 431,1067788,1249,1053,1574,1639,1735,1576589,1351,
>   923,1657,1556,1730,1591,1567,1052643,1447,1740)( 432729,1691,
>  1396474,1395,1235505,1554,1743,1539910,1109,1773,1158,1403,1376,
>  565,1124,1679,1619)( 438,1543,1648,1755,1237,1229,1524921,1509,1386,
>  1315506,1610,1198,1032,1449543,1521,1094,1069773)
> ( 454962,1205,1275,1480,1499669,1593,1106711843,1770746,1087,
>  1372632,1562,1317917,1133,1716)( 527,1201948,1365887,1715,1165
>  )( 582844821751670915922)( 650733,1522,1420,1332994,
>  1536859,1074,1542,1669,1247,1276,1088,1293,1412,1373,1763748,1143,
>  1301)( 653895,1709791764,1541,1579)( 706,1055861,1504,1641,
>  1508,1481)( 810,1296970,1698,1523,1215869)(1097,1456,1383,1461,
>  1467,1748,1153)(1222,1674,1384,1729,1707,1452,1417) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | Suz
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
4483454976001 ]

# test
gap> g:= 
> Group( (  1,  5,  7,  3122411)(  223,  427131426)
> (  62018,  8252128)(  9101715221619)
> ( 29333531405239)( 30513255414254)
> ( 34484636534956)( 37384543504447)
> ( 57616359688067)( 58796083697082)
> ( 62767464817784)( 65667371787275)
> ( 8589918796,10895)( 86,10788,1119798,110)
> ( 90,104,10292,109,105,112)( 9394,10199,106,100,103)
> (113,117,119,115,124,136,123)(114,135,116,139,125,126,138)
> (118,132,130,120,137,133,140)(121,122,129,127,134,128,131)
> (141,145,147,143,152,164,151)(142,163,144,167,153,154,166)
> (146,160,158,148,165,161,168)(149,150,157,155,162,156,159)
> (169,173,175,171,180,192,179)(170,191,172,195,181,182,194)
> (174,188,186,176,193,189,196)(177,178,185,183,190,184,187)
> (197,201,203,199,208,220,207)(198,219,200,223,209,210,222)
> (202,216,214,204,221,217,224)(205,206,213,211,218,212,215)
> (225,229,231,227,236,248,235)(226,247,228,251,237,238,250)
> (230,244,242,232,249,245,252)(233,234,241,239,246,240,243)
> (253,257,259,255,264,276,263)(254,275,256,279,265,266,278)
> (258,272,270,260,277,273,280)(261,262,269,267,274,268,271)
> (281,285,287,283,292,304,291)(282,303,284,307,293,294,306)
> (286,300,298,288,305,301,308)(289,290,297,295,302,296,299)
> (309,313,315,311,320,332,319)(310,331,312,335,321,322,334)
> (314,328,326,316,333,329,336)(317,318,325,323,330,324,327)
> (337,341,343,339,348,360,347)(338,359,340,363,349,350,362)
> (342,356,354,344,361,357,364)(345,346,353,351,358,352,355)
> (365,369,371,367,376,388,375)(366,387,368,391,377,378,390)
> (370,384,382,372,389,385,392)(373,374,381,379,386,380,383)
> (393,397,399,395,404,416,403)(394,415,396,419,405,406,418)
> (398,412,410,400,417,413,420)(401,402,409,407,414,408,411)
> (421,425,427,423,432,444,431)(422,443,424,447,433,434,446)
> (426,440,438,428,445,441,448)(429,430,437,435,442,436,439)
> (449,453,455,451,460,472,459)(450,471,452,475,461,462,474)
> (454,468,466,456,473,469,476)(457,458,465,463,470,464,467)
> (477,481,483,479,488,500,487)(478,499,480,503,489,490,502)
> (482,496,494,484,501,497,504)(485,486,493,491,498,492,495)
> (505,509,511,507,516,528,515)(506,527,508,531,517,518,530)
> (510,524,522,512,529,525,532)(513,514,521,519,526,520,523)
> (533,537,539,535,544,556,543)(534,555,536,559,545,546,558)
> (538,552,550,540,557,553,560)(541,542,549,547,554,548,551)
> (561,565,567,563,572,584,571)(562,583,564,587,573,574,586)
> (566,580,578,568,585,581,588)(569,570,577,575,582,576,579)
> (589,593,595,591,600,612,599)(590,611,592,615,601,602,614)
> (594,608,606,596,613,609,616)(597,598,605,603,610,604,607)
> (617,621,623,619,628,640,627)(618,639,620,643,629,630,642)
> (622,636,634,624,641,637,644)(625,626,633,631,638,632,635)
> (645,649,651,647,656,668,655)(646,667,648,671,657,658,670)
> (650,664,662,652,669,665,672)(653,654,661,659,666,660,663)
> (673,677,679,675,684,696,683)(674,695,676,699,685,686,698)
> (678,692,690,680,697,693,700)(681,682,689,687,694,688,691)
> (701,705,707,703,712,724,711)(702,723,704,727,713,714,726)
> (706,720,718,708,725,721,728)(709,710,717,715,722,716,719)
> (729,733,735,731,740,752,739)(730,751,732,755,741,742,754)
> (734,748,746,736,753,749,756)(737,738,745,743,750,744,747)
> (757,761,763,759,768,780,767)(758,779,760,783,769,770,782)
> (762,776,774,764,781,777,784)(765,766,773,771,778,772,775), 
> (  1,113,16957,309,645,281)(  2,114,17058,310,646,282)
> (  3,115,17159,311,647,283)(  4,116,17260,312,648,284)
> (  5,117,17361,313,649,285)(  6,118,17462,314,650,286)
> (  7,119,17563,315,651,287)(  8,120,17664,316,652,288)
> (  9,121,17765,317,653,289)( 10,122,17866,318,654,290)
> ( 11,123,17967,319,655,291)( 12,124,18068,320,656,292)
> ( 13,125,18169,321,657,293)( 14,126,18270,322,658,294)
> ( 15,127,18371,323,659,295)( 16,128,18472,324,660,296)
> ( 17,129,18573,325,661,297)( 18,130,18674,326,662,298)
> ( 19,131,18775,327,663,299)( 20,132,18876,328,664,300)
> ( 21,133,18977,329,665,301)( 22,134,19078,330,666,302)
> ( 23,135,19179,331,667,303)( 24,136,19280,332,668,304)
> ( 25,137,19381,333,669,305)( 26,138,19482,334,670,306)
> ( 27,139,19583,335,671,307)( 28,140,19684,336,672,308)
> ( 29,61785,729,337,365,701)( 30,61886,730,338,366,702)
> ( 31,61987,731,339,367,703)( 32,62088,732,340,368,704)
> ( 33,62189,733,341,369,705)( 34,62290,734,342,370,706)
> ( 35,62391,735,343,371,707)( 36,62492,736,344,372,708)
> ( 37,62593,737,345,373,709)( 38,62694,738,346,374,710)
> ( 39,62795,739,347,375,711)( 40,62896,740,348,376,712)
> ( 41,62997,741,349,377,713)( 42,63098,742,350,378,714)
> ( 43,63199,743,351,379,715)( 44,632,100,744,352,380,716)
> ( 45,633,101,745,353,381,717)( 46,634,102,746,354,382,718)
> ( 47,635,103,747,355,383,719)( 48,636,104,748,356,384,720)
> ( 49,637,105,749,357,385,721)( 50,638,106,750,358,386,722)
> ( 51,639,107,751,359,387,723)( 52,640,108,752,360,388,724)
> ( 53,641,109,753,361,389,725)( 54,642,110,754,362,390,726)
> ( 55,643,111,755,363,391,727)( 56,644,112,756,364,392,728)
> (141,533,477,197,673,561,757)(142,534,478,198,674,562,758)
> (143,535,479,199,675,563,759)(144,536,480,200,676,564,760)
> (145,537,481,201,677,565,761)(146,538,482,202,678,566,762)
> (147,539,483,203,679,567,763)(148,540,484,204,680,568,764)
> (149,541,485,205,681,569,765)(150,542,486,206,682,570,766)
> (151,543,487,207,683,571,767)(152,544,488,208,684,572,768)
> (153,545,489,209,685,573,769)(154,546,490,210,686,574,770)
> (155,547,491,211,687,575,771)(156,548,492,212,688,576,772)
> (157,549,493,213,689,577,773)(158,550,494,214,690,578,774)
> (159,551,495,215,691,579,775)(160,552,496,216,692,580,776)
> (161,553,497,217,693,581,777)(162,554,498,218,694,582,778)
> (163,555,499,219,695,583,779)(164,556,500,220,696,584,780)
> (165,557,501,221,697,585,781)(166,558,502,222,698,586,782)
> (167,559,503,223,699,587,783)(168,560,504,224,700,588,784)
> (225,253,449,393,589,421,505)(226,254,450,394,590,422,506)
> (227,255,451,395,591,423,507)(228,256,452,396,592,424,508)
> (229,257,453,397,593,425,509)(230,258,454,398,594,426,510)
> (231,259,455,399,595,427,511)(232,260,456,400,596,428,512)
> (233,261,457,401,597,429,513)(234,262,458,402,598,430,514)
> (235,263,459,403,599,431,515)(236,264,460,404,600,432,516)
> (237,265,461,405,601,433,517)(238,266,462,406,602,434,518)
> (239,267,463,407,603,435,519)(240,268,464,408,604,436,520)
> (241,269,465,409,605,437,521)(242,270,466,410,606,438,522)
> (243,271,467,411,607,439,523)(244,272,468,412,608,440,524)
> (245,273,469,413,609,441,525)(246,274,470,414,610,442,526)
> (247,275,471,415,611,443,527)(248,276,472,416,612,444,528)
> (249,277,473,417,613,445,529)(250,278,474,418,614,446,530)
> (251,279,475,419,615,447,531)(252,280,476,420,616,448,532), (  3,  4)
> (  517,  716,  820,  613)(  919111412181015)
> ( 2123262824222725)( 3132)( 33453544364834,
>  41)( 3747394240463843)( 4951545652505553)
> ( 5960)( 6173637264766269)( 65756770687466,
>  71)( 7779828480788381)( 8788)( 89,10191,10092,104,
>  9097)( 93,103959896,1029499)(105,107,110,112,108,106,111,
>  109)(115,116)(117,129,119,128,120,132,118,125)(121,131,123,126,124,
>  130,122,127)(133,135,138,140,136,134,139,137)(143,144)
> (145,157,147,156,148,160,146,153)(149,159,151,154,152,158,150,155)
> (161,163,166,168,164,162,167,165)(171,172)(173,185,175,184,176,188,174,
>  181)(177,187,179,182,180,186,178,183)(189,191,194,196,192,190,195,193)
> (199,200)(201,213,203,212,204,216,202,209)(205,215,207,210,208,214,206,
>  211)(217,219,222,224,220,218,223,221)(227,228)(229,241,231,240,232,
>  244,230,237)(233,243,235,238,236,242,234,239)(245,247,250,252,248,246,
>  251,249)(255,256)(257,269,259,268,260,272,258,265)(261,271,263,266,
>  264,270,262,267)(273,275,278,280,276,274,279,277)(283,284)
> (285,297,287,296,288,300,286,293)(289,299,291,294,292,298,290,295)
> (301,303,306,308,304,302,307,305)(311,312)(313,325,315,324,316,328,314,
>  321)(317,327,319,322,320,326,318,323)(329,331,334,336,332,330,335,333)
> (339,340)(341,353,343,352,344,356,342,349)(345,355,347,350,348,354,346,
>  351)(357,359,362,364,360,358,363,361)(367,368)(369,381,371,380,372,
>  384,370,377)(373,383,375,378,376,382,374,379)(385,387,390,392,388,386,
>  391,389)(395,396)(397,409,399,408,400,412,398,405)(401,411,403,406,
>  404,410,402,407)(413,415,418,420,416,414,419,417)(423,424)
> (425,437,427,436,428,440,426,433)(429,439,431,434,432,438,430,435)
> (441,443,446,448,444,442,447,445)(451,452)(453,465,455,464,456,468,454,
>  461)(457,467,459,462,460,466,458,463)(469,471,474,476,472,470,475,473)
> (479,480)(481,493,483,492,484,496,482,489)(485,495,487,490,488,494,486,
>  491)(497,499,502,504,500,498,503,501)(507,508)(509,521,511,520,512,
>  524,510,517)(513,523,515,518,516,522,514,519)(525,527,530,532,528,526,
>  531,529)(535,536)(537,549,539,548,540,552,538,545)(541,551,543,546,
>  544,550,542,547)(553,555,558,560,556,554,559,557)(563,564)
> (565,577,567,576,568,580,566,573)(569,579,571,574,572,578,570,575)
> (581,583,586,588,584,582,587,585)(591,592)(593,605,595,604,596,608,594,
>  601)(597,607,599,602,600,606,598,603)(609,611,614,616,612,610,615,613)
> (619,620)(621,633,623,632,624,636,622,629)(625,635,627,630,628,634,626,
>  631)(637,639,642,644,640,638,643,641)(647,648)(649,661,651,660,652,
>  664,650,657)(653,663,655,658,656,662,654,659)(665,667,670,672,668,666,
>  671,669)(675,676)(677,689,679,688,680,692,678,685)(681,691,683,686,
>  684,690,682,687)(693,695,698,700,696,694,699,697)(703,704)
> (705,717,707,716,708,720,706,713)(709,719,711,714,712,718,710,715)
> (721,723,726,728,724,722,727,725)(731,732)(733,745,735,744,736,748,734,
>  741)(737,747,739,742,740,746,738,743)(749,751,754,756,752,750,755,753)
> (759,760)(761,773,763,772,764,776,762,769)(765,775,767,770,768,774,766,
>  771)(777,779,782,784,780,778,783,781), ( 5785)( 5886)( 5987)
> ( 6088)( 6189)( 6290)( 6391)( 6492)( 6593)( 6694)
> ( 6795)( 6896)( 6997)( 7098)( 7199)( 72,100)( 73,101)
> ( 74,102)( 75,103)( 76,104)( 77,105)( 78,106)( 79,107)( 80,108)
> ( 81,109)( 82,110)( 83,111)( 84,112)(113,449,169,421,197,533,141,337)
> (114,450,170,422,198,534,142,338)(115,451,171,423,199,535,143,339)
> (116,452,172,424,200,536,144,340)(117,453,173,425,201,537,145,341)
> (118,454,174,426,202,538,146,342)(119,455,175,427,203,539,147,343)
> (120,456,176,428,204,540,148,344)(121,457,177,429,205,541,149,345)
> (122,458,178,430,206,542,150,346)(123,459,179,431,207,543,151,347)
> (124,460,180,432,208,544,152,348)(125,461,181,433,209,545,153,349)
> (126,462,182,434,210,546,154,350)(127,463,183,435,211,547,155,351)
> (128,464,184,436,212,548,156,352)(129,465,185,437,213,549,157,353)
> (130,466,186,438,214,550,158,354)(131,467,187,439,215,551,159,355)
> (132,468,188,440,216,552,160,356)(133,469,189,441,217,553,161,357)
> (134,470,190,442,218,554,162,358)(135,471,191,443,219,555,163,359)
> (136,472,192,444,220,556,164,360)(137,473,193,445,221,557,165,361)
> (138,474,194,446,222,558,166,362)(139,475,195,447,223,559,167,363)
> (140,476,196,448,224,560,168,364)(225,505,281,365,309,477,253,393)
> (226,506,282,366,310,478,254,394)(227,507,283,367,311,479,255,395)
> (228,508,284,368,312,480,256,396)(229,509,285,369,313,481,257,397)
> (230,510,286,370,314,482,258,398)(231,511,287,371,315,483,259,399)
> (232,512,288,372,316,484,260,400)(233,513,289,373,317,485,261,401)
> (234,514,290,374,318,486,262,402)(235,515,291,375,319,487,263,403)
> (236,516,292,376,320,488,264,404)(237,517,293,377,321,489,265,405)
> (238,518,294,378,322,490,266,406)(239,519,295,379,323,491,267,407)
> (240,520,296,380,324,492,268,408)(241,521,297,381,325,493,269,409)
> (242,522,298,382,326,494,270,410)(243,523,299,383,327,495,271,411)
> (244,524,300,384,328,496,272,412)(245,525,301,385,329,497,273,413)
> (246,526,302,386,330,498,274,414)(247,527,303,387,331,499,275,415)
> (248,528,304,388,332,500,276,416)(249,529,305,389,333,501,277,417)
> (250,530,306,390,334,502,278,418)(251,531,307,391,335,503,279,419)
> (252,532,308,392,336,504,280,420)(561,617,701,757,645,589,729,673)
> (562,618,702,758,646,590,730,674)(563,619,703,759,647,591,731,675)
> (564,620,704,760,648,592,732,676)(565,621,705,761,649,593,733,677)
> (566,622,706,762,650,594,734,678)(567,623,707,763,651,595,735,679)
> (568,624,708,764,652,596,736,680)(569,625,709,765,653,597,737,681)
> (570,626,710,766,654,598,738,682)(571,627,711,767,655,599,739,683)
> (572,628,712,768,656,600,740,684)(573,629,713,769,657,601,741,685)
> (574,630,714,770,658,602,742,686)(575,631,715,771,659,603,743,687)
> (576,632,716,772,660,604,744,688)(577,633,717,773,661,605,745,689)
> (578,634,718,774,662,606,746,690)(579,635,719,775,663,607,747,691)
> (580,636,720,776,664,608,748,692)(581,637,721,777,665,609,749,693)
> (582,638,722,778,666,610,750,694)(583,639,723,779,667,611,751,695)
> (584,640,724,780,668,612,752,696)(585,641,725,781,669,613,753,697)
> (586,642,726,782,670,614,754,698)(587,643,727,783,671,615,755,699)
> (588,644,728,784,672,616,756,700) );;
gap> CustomDisplayCompositionSeries( g );
Group
 | 2A(2,3) = U(3,3)
Group
 | 2A(2,3) = U(3,3)
Group
gap> List( ChiefSeriesOfGroup( g ), Size );
3657830460481 ]

# $A_5 \times A_5$ in primitive action on $60$ points
# (direct factors corresponding to left and right regular action)
gap> g:= AlternatingGroup( 5 );;
gap> e:= AsList( g );;
gap> gens:= GeneratorsOfGroup( g );;
gap> p:= List( gens, i -> PermList( List( e, j -> Position( e, i*j ) ) ) );;
gap> q:= List( gens, i -> PermList( List( e, j -> Position( e, j*i ) ) ) );;
gap> h:= Group( Concatenation( p, q ) );
<permutation group with 4 generators>
gap> IsPrimitive( h, [ 1 .. 60 ] );
true
gap> CompositionSeries( h );
[ <permutation group of size 3600 with 4 generators>, 
  <permutation group of size 60 with 2 generators>, Group(()) ]
gap> g:=PerfectGroup(IsPermGroup,10752,3);;
gap> g:=Group(GeneratorsOfGroup(g));;
gap> iso:=IsomorphismFpGroupByCompositionSeries(g);;
gap> iso:=IsomorphismFpGroup(g);;
gap> rep:=ImagesRepresentative(iso,Product(GeneratorsOfGroup(g)));;
gap> STOP_TEST("grpprmcs.tst");

[Dauer der Verarbeitung: 0.71 Sekunden, vorverarbeitet 2026-06-08]