|
#SIXFORMAT GapDocGAP
HELPBOOKINFOSIXTMP := rec(
encoding := "UTF-8",
bookname := "HAP",
entries :=
[ [ "Title page", "0.0", [ 0, 0, 0 ], 1, 1, "title page", "X7D2C85EC87DD46E5"
],
[ "Abstract", "0.0-1", [ 0, 0, 1 ], 30, 2, "abstract", "X7AA6C5737B711C89" ]
,
[ "Copyright", "0.0-2", [ 0, 0, 2 ], 47, 2, "copyright",
"X81488B807F2A1CF1" ],
[ "Acknowledgements", "0.0-3", [ 0, 0, 3 ], 52, 2, "acknowledgements",
"X82A988D47DFAFCFA" ],
[ "Table of Contents", "0.0-4", [ 0, 0, 4 ], 60, 3, "table of contents",
"X8537FEB07AF2BEC8" ],
[
"\033[1X\033[33X\033[0;-2YBasic functionality for cellular complexes, funda\
mental groups and homology\033[133X\033[101X", "1", [ 1, 0, 0 ], 1, 7,
"basic functionality for cellular complexes fundamental groups and homol\
ogy", "X85BEB9F48106583E" ],
[
"\033[1X\033[33X\033[0;-2YData \033[22X\342\237\266\033[122X\033[101X\027\\
033[1X\027 Cellular Complexes\033[133X\033[101X", "1.1", [ 1, 1, 0 ], 9, 7,
"data a\237\266 cellular complexes", "X7F06418383E098EB" ],
[ "\033[1X\033[33X\033[0;-2YMetric Spaces\033[133X\033[101X", "1.2",
[ 1, 2, 0 ], 352, 12, "metric spaces", "X7C0C080487641830" ],
[
"\033[1X\033[33X\033[0;-2YCellular Complexes \033[22X\342\237\266\033[122X\\
033[101X\027\033[1X\027 Cellular Complexes\033[133X\033[101X", "1.3",
[ 1, 3, 0 ], 428, 13, "cellular complexes a\237\266 cellular complexes",
"X80A49CAC84313990" ],
[
"\033[1X\033[33X\033[0;-2YCellular Complexes \033[22X\342\237\266\033[122X\\
033[101X\027\033[1X\027 Cellular Complexes (Preserving Data Types)\033[133X\
\033[101X", "1.4", [ 1, 4, 0 ], 605, 16,
"cellular complexes a\237\266 cellular complexes preserving data types",
"X7FD50DF6782F00A0" ],
[
"\033[1X\033[33X\033[0;-2YCellular Complexes \033[22X\342\237\266\033[122X\\
033[101X\027\033[1X\027 Homotopy Invariants\033[133X\033[101X", "1.5",
[ 1, 5, 0 ], 793, 19, "cellular complexes a\237\266 homotopy invariants"
, "X7E25932F7DD535E8" ],
[
"\033[1X\033[33X\033[0;-2YData \033[22X\342\237\266\033[122X\033[101X\027\\
033[1X\027 Homotopy Invariants\033[133X\033[101X", "1.6", [ 1, 6, 0 ], 965,
22, "data a\237\266 homotopy invariants", "X7C17A7897DDAE22C" ],
[
"\033[1X\033[33X\033[0;-2YCellular Complexes \033[22X\342\237\266\033[122X\\
033[101X\027\033[1X\027 Non Homotopy Invariants\033[133X\033[101X", "1.7",
[ 1, 7, 0 ], 983, 22,
"cellular complexes a\237\266 non homotopy invariants",
"X859286BF7F6047B7" ],
[
"\033[1X\033[33X\033[0;-2Y(Co)chain Complexes \033[22X\342\237\266\033[122X\
\033[101X\027\033[1X\027 (Co)chain Complexes\033[133X\033[101X", "1.8",
[ 1, 8, 0 ], 1144, 24, "co chain complexes a\237\266 co chain complexes"
, "X7B6F366F7A2D8FEE" ],
[
"\033[1X\033[33X\033[0;-2Y(Co)chain Complexes \033[22X\342\237\266\033[122X\
\033[101X\027\033[1X\027 Homotopy Invariants\033[133X\033[101X", "1.9",
[ 1, 9, 0 ], 1220, 25,
"co chain complexes a\237\266 homotopy invariants", "X7BB8DC9783A4AF81"
], [ "\033[1X\033[33X\033[0;-2YVisualization\033[133X\033[101X", "1.10",
[ 1, 10, 0 ], 1345, 27, "visualization", "X867BE1388467C939" ],
[
"\033[1X\033[33X\033[0;-2YBasic functionality for \033[22XZG\033[122X\033[1\
01X\027\033[1X\027-resolutions and group cohomology\033[133X\033[101X", "2",
[ 2, 0, 0 ], 1, 30,
"basic functionality for zg-resolutions and group cohomology",
"X84CA5C9B81900889" ],
[ "\033[1X\033[33X\033[0;-2YResolutions\033[133X\033[101X", "2.1",
[ 2, 1, 0 ], 8, 30, "resolutions", "X7C0B125E7D5415B4" ],
[
"\033[1X\033[33X\033[0;-2YAlgebras \033[22X\342\237\266\033[122X\033[101X\\
027\033[1X\027 (Co)chain Complexes\033[133X\033[101X", "2.2", [ 2, 2, 0 ],
184, 32, "algebras a\237\266 co chain complexes", "X85EC9D8E7A15A570" ],
[ "\033[1X\033[33X\033[0;-2YResolutions \033[22X\342\237\266\033[122X\033[10\
1X\027\033[1X\027 (Co)chain Complexes\033[133X\033[101X", "2.3", [ 2, 3, 0 ],
197, 32, "resolutions a\237\266 co chain complexes",
"X7F9E1F1781479F7B" ],
[ "\033[1X\033[33X\033[0;-2YCohomology rings\033[133X\033[101X", "2.4",
[ 2, 4, 0 ], 297, 34, "cohomology rings", "X80B6849C835B7F19" ],
[ "\033[1X\033[33X\033[0;-2YGroup Invariants\033[133X\033[101X", "2.5",
[ 2, 5, 0 ], 448, 36, "group invariants", "X7BCF8D907D237A03" ],
[
"\033[1X\033[33X\033[0;-2Y\033[22XF_p\033[122X\033[101X\027\033[1X\027-modu\
les\033[133X\033[101X", "2.6", [ 2, 6, 0 ], 571, 38, "f_p-modules",
"X86CDD4B77CBE3087" ],
[
"\033[1X\033[33X\033[0;-2YBasic functionality for homological group theory\\
033[133X\033[101X", "3", [ 3, 0, 0 ], 1, 39,
"basic functionality for homological group theory", "X7F52C4747A402789"
], [ "\033[1X\033[33X\033[0;-2YCocycles\033[133X\033[101X", "3.1",
[ 3, 1, 0 ], 8, 39, "cocycles", "X85A9B66278AF63D9" ],
[ "\033[1X\033[33X\033[0;-2YG-Outer Groups\033[133X\033[101X", "3.2",
[ 3, 2, 0 ], 55, 40, "g-outer groups", "X7D02CE0A83211FB7" ],
[
"\033[1X\033[33X\033[0;-2Y\033[22XG\033[122X\033[101X\027\033[1X\027-cocomp\
lexes\033[133X\033[101X", "3.3", [ 3, 3, 0 ], 109, 41, "g-cocomplexes",
"X7C2A5A4F84DC70CB" ],
[
"\033[1X\033[33X\033[0;-2YBasic functionality for parallel computation\033[\
133X\033[101X", "4", [ 4, 0, 0 ], 1, 42,
"basic functionality for parallel computation", "X79D98558806BCE54" ],
[ "\033[1X\033[33X\033[0;-2YSix Core Functions\033[133X\033[101X", "4.1",
[ 4, 1, 0 ], 8, 42, "six core functions", "X835EF64B87BD48C7" ],
[
"\033[1X\033[33X\033[0;-2YResolutions of the ground ring\033[133X\033[101X"
, "5", [ 5, 0, 0 ], 1, 44, "resolutions of the ground ring",
"X8735FC5E7BB5CE3A" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "5.1",
[ 5, 1, 0 ], 4, 44, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YResolutions of modules\033[133X\033[101X", "6",
[ 6, 0, 0 ], 1, 53, "resolutions of modules", "X841673BA782D0D1D" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "6.1",
[ 6, 1, 0 ], 4, 53, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YInduced equivariant chain maps\033[133X\033[101X"
, "7", [ 7, 0, 0 ], 1, 54, "induced equivariant chain maps",
"X7E91068780486C3A" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "7.1",
[ 7, 1, 0 ], 4, 54, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YFunctors\033[133X\033[101X", "8", [ 8, 0, 0 ],
1, 55, "functors", "X78D1062D78BE08C1" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "8.1",
[ 8, 1, 0 ], 4, 55, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YChain complexes\033[133X\033[101X", "9",
[ 9, 0, 0 ], 1, 59, "chain complexes", "X7A06103979B92808" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "9.1",
[ 9, 1, 0 ], 4, 59, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YSparse Chain complexes\033[133X\033[101X",
"10", [ 10, 0, 0 ], 1, 62, "sparse chain complexes",
"X856F202D823280F8" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "10.1",
[ 10, 1, 0 ], 4, 62, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YHomology and cohomology groups\033[133X\033[101X"
, "11", [ 11, 0, 0 ], 1, 65, "homology and cohomology groups",
"X782177107A5D6D19" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "11.1",
[ 11, 1, 0 ], 4, 65, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YPoincare series\033[133X\033[101X", "12",
[ 12, 0, 0 ], 1, 73, "poincare series", "X850CDAFE801E2B2A" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "12.1",
[ 12, 1, 0 ], 4, 73, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YCohomology ring structure\033[133X\033[101X",
"13", [ 13, 0, 0 ], 1, 75, "cohomology ring structure",
"X7A9561E47A4994F5" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "13.1",
[ 13, 1, 0 ], 4, 75, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YCohomology rings of \033[22Xp\033[122X\033[101X\\
027\033[1X\027-groups (mainly \033[22Xp=2)\033[122X\033[101X\027\033[1X\027\
\033[133X\033[101X", "14", [ 14, 0, 0 ], 1, 78,
"cohomology rings of p-groups mainly p=2", "X78C726EB7F6CDAC0" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "14.1",
[ 14, 1, 0 ], 8, 78, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YCommutator and nonabelian tensor computations\\
033[133X\033[101X", "15", [ 15, 0, 0 ], 1, 80,
"commutator and nonabelian tensor computations", "X86DE968B7B20BD48" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "15.1",
[ 15, 1, 0 ], 4, 80, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YLie commutators and nonabelian Lie tensors\033[13\
3X\033[101X", "16", [ 16, 0, 0 ], 1, 85,
"lie commutators and nonabelian lie tensors", "X7A3DC9327EE1BE6C" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "16.1",
[ 16, 1, 0 ], 7, 85, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YGenerators and relators of groups\033[133X\033[10\
1X", "17", [ 17, 0, 0 ], 1, 87, "generators and relators of groups",
"X7A2144518112F830" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "17.1",
[ 17, 1, 0 ], 4, 87, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YOrbit polytopes and fundamental domains\033[133X\\
033[101X", "18", [ 18, 0, 0 ], 1, 89,
"orbit polytopes and fundamental domains", "X7CD67FEA7A1B6345" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "18.1",
[ 18, 1, 0 ], 4, 89, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YCocycles\033[133X\033[101X", "19",
[ 19, 0, 0 ], 1, 93, "cocycles", "X85A9B66278AF63D9" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "19.1",
[ 19, 1, 0 ], 4, 93, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YWords in free \033[22XZG\033[122X\033[101X\027\\
033[1X\027-modules\033[133X\033[101X", "20", [ 20, 0, 0 ], 1, 95,
"words in free zg-modules", "X8276B4377D092A80" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "20.1",
[ 20, 1, 0 ], 4, 95, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2Y\033[22XFpG\033[122X\033[101X\027\033[1X\027-modu\
les\033[133X\033[101X", "21", [ 21, 0, 0 ], 1, 97, "fpg-modules",
"X81A2A3C97C09685E" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "21.1",
[ 21, 1, 0 ], 4, 97, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YMeataxe modules\033[133X\033[101X", "22",
[ 22, 0, 0 ], 1, 102, "meataxe modules", "X85B05BBA78ED7BE2" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "22.1",
[ 22, 1, 0 ], 4, 102, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YG-Outer Groups\033[133X\033[101X", "23",
[ 23, 0, 0 ], 1, 103, "g-outer groups", "X7D02CE0A83211FB7" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "23.1",
[ 23, 1, 0 ], 4, 103, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YCat-1-groups\033[133X\033[101X", "24",
[ 24, 0, 0 ], 1, 105, "cat-1-groups", "X7B54B8CA841C517B" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "24.1",
[ 24, 1, 0 ], 4, 105, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YSimplicial groups\033[133X\033[101X", "25",
[ 25, 0, 0 ], 1, 107, "simplicial groups", "X7D818E5F80F4CF63" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "25.1",
[ 25, 1, 0 ], 4, 107, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YCoxeter diagrams and graphs of groups\033[133X\\
033[101X", "26", [ 26, 0, 0 ], 1, 112, "coxeter diagrams and graphs of groups"
, "X79D0502085B6734A" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "26.1",
[ 26, 1, 0 ], 4, 112, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YTorsion Subcomplexes\033[133X\033[101X", "27",
[ 27, 0, 0 ], 1, 116, "torsion subcomplexes", "X8213E6467969C33F" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "27.1",
[ 27, 1, 0 ], 7, 116, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YSimplicial Complexes\033[133X\033[101X", "28",
[ 28, 0, 0 ], 1, 120, "simplicial complexes", "X7AC76D657C578FEE" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "28.1",
[ 28, 1, 0 ], 4, 120, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YCubical Complexes\033[133X\033[101X", "29",
[ 29, 0, 0 ], 1, 125, "cubical complexes", "X7D67D5F3820637AD" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "29.1",
[ 29, 1, 0 ], 4, 125, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YRegular CW-Complexes\033[133X\033[101X", "30",
[ 30, 0, 0 ], 1, 135, "regular cw-complexes", "X855CD0808058727D" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "30.1",
[ 30, 1, 0 ], 4, 135, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YKnots and Links\033[133X\033[101X", "31",
[ 31, 0, 0 ], 1, 137, "knots and links", "X82DADC508677F1EE" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "31.1",
[ 31, 1, 0 ], 4, 137, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YKnots and Quandles\033[133X\033[101X", "32",
[ 32, 0, 0 ], 1, 139, "knots and quandles", "X83856E7178651841" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "32.1",
[ 32, 1, 0 ], 4, 139, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YFinite metric spaces and their filtered complexes\
\033[133X\033[101X", "33", [ 33, 0, 0 ], 1, 144,
"finite metric spaces and their filtered complexes",
"X7988ECB7803BA915" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "33.1",
[ 33, 1, 0 ], 4, 144, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YCommutative diagrams and abstract categories\033[\
133X\033[101X", "34", [ 34, 0, 0 ], 1, 147,
"commutative diagrams and abstract categories", "X83AAC8367CC7686F" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "34.1",
[ 34, 1, 0 ], 6, 147, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "34.2",
[ 34, 2, 0 ], 77, 148, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YArrays and Pseudo lists\033[133X\033[101X",
"35", [ 35, 0, 0 ], 1, 151, "arrays and pseudo lists",
"X7B71D3EA7B30ADAB" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "35.1",
[ 35, 1, 0 ], 4, 151, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YParallel Computation - Core Functions\033[133X\\
033[101X", "36", [ 36, 0, 0 ], 1, 155, "parallel computation - core functions"
, "X85F9DF1985B88C37" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "36.1",
[ 36, 1, 0 ], 4, 155, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YParallel Computation - Extra Functions\033[133X\\
033[101X", "37", [ 37, 0, 0 ], 1, 158,
"parallel computation - extra functions", "X85B21D56816A1B39" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "37.1",
[ 37, 1, 0 ], 4, 158, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YSome functions for accessing basic data\033[133X\\
033[101X", "38", [ 38, 0, 0 ], 1, 159,
"some functions for accessing basic data", "X7AE3B902812A10B0" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "38.1",
[ 38, 1, 0 ], 4, 159, "a\240", "X7CFDEEC07F15CF82" ],
[ "\033[1X\033[33X\033[0;-2YMiscellaneous\033[133X\033[101X", "39",
[ 39, 0, 0 ], 1, 161, "miscellaneous", "X7C5563A37D566DA5" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "39.1",
[ 39, 1, 0 ], 4, 161, "a\240", "X7CFDEEC07F15CF82" ],
[
"\033[1X\033[33X\033[0;-2YHAP variables that are not yet documented\033[133\
X\033[101X", "40", [ 40, 0, 0 ], 1, 164,
"hap variables that are not yet documented", "X86599D9C79BEAFC5" ],
[ "\033[1X\033[33X\033[0;-2Y\302\240\033[133X\033[101X", "40.1",
[ 40, 1, 0 ], 4, 164, "a\240", "X7CFDEEC07F15CF82" ],
[ "Index", "ind", [ "Ind", 0, 0 ], 1, 240, "index", "X83A0356F839C696F" ],
[ "\033[2XRegularCWPolytope\033[102X", "1.1-1", [ 1, 1, 1 ], 12, 7,
"regularcwpolytope", "X85C818B87D9AC922" ],
[ "\033[2XRegularCWPolytope\033[102X", "1.1-1", [ 1, 1, 1 ], 12, 7,
"regularcwpolytope", "X85C818B87D9AC922" ],
[ "\033[2XCubicalComplex\033[102X", "1.1-2", [ 1, 1, 2 ], 25, 7,
"cubicalcomplex", "X7910F39B7AB79096" ],
[ "\033[2XPureCubicalComplex\033[102X", "1.1-3", [ 1, 1, 3 ], 43, 7,
"purecubicalcomplex", "X78A3981C878C7FB5" ],
[ "\033[2XPureCubicalKnot\033[102X", "1.1-4", [ 1, 1, 4 ], 61, 8,
"purecubicalknot", "X869065F77C4761EC" ],
[ "\033[2XPureCubicalKnot\033[102X", "1.1-4", [ 1, 1, 4 ], 61, 8,
"purecubicalknot", "X869065F77C4761EC" ],
[ "\033[2XPurePermutahedralKnot\033[102X", "1.1-5", [ 1, 1, 5 ], 82, 8,
"purepermutahedralknot", "X7B432A6184CBAC75" ],
[ "\033[2XPurePermutahedralKnot\033[102X", "1.1-5", [ 1, 1, 5 ], 82, 8,
"purepermutahedralknot", "X7B432A6184CBAC75" ],
[ "\033[2XPurePermutahedralComplex\033[102X", "1.1-6", [ 1, 1, 6 ], 95, 8,
"purepermutahedralcomplex", "X824625A27FF6DE6F" ],
[ "\033[2XCayleyGraphOfGroup\033[102X", "1.1-7", [ 1, 1, 7 ], 106, 8,
"cayleygraphofgroup", "X80CAD0357AF44E48" ],
[ "\033[2XEquivariantEuclideanSpace\033[102X", "1.1-8", [ 1, 1, 8 ], 115,
8, "equivarianteuclideanspace", "X8187F6507BA14D5C" ],
[ "\033[2XEquivariantOrbitPolytope\033[102X", "1.1-9", [ 1, 1, 9 ], 126, 9,
"equivariantorbitpolytope", "X7FE0522B8134DF7C" ],
[ "\033[2XEquivariantTwoComplex\033[102X", "1.1-10", [ 1, 1, 10 ], 136, 9,
"equivarianttwocomplex", "X81E8E97278B1AE92" ],
[ "\033[2XQuillenComplex\033[102X", "1.1-11", [ 1, 1, 11 ], 145, 9,
"quillencomplex", "X7F8D4C4C7ED15A31" ],
[ "\033[2XRestrictedEquivariantCWComplex\033[102X", "1.1-12", [ 1, 1, 12 ],
157, 9, "restrictedequivariantcwcomplex", "X854B96757AF38A41" ],
[ "\033[2XRandomSimplicialGraph\033[102X", "1.1-13", [ 1, 1, 13 ], 167, 9,
"randomsimplicialgraph", "X7A3B6B647C8CF90B" ],
[ "\033[2XRandomSimplicialTwoComplex\033[102X", "1.1-14", [ 1, 1, 14 ],
178, 9, "randomsimplicialtwocomplex", "X8394037487D3C17E" ],
[ "\033[2XReadCSVfileAsPureCubicalKnot\033[102X", "1.1-15", [ 1, 1, 15 ],
190, 10, "readcsvfileaspurecubicalknot", "X83DB403087D02CC8" ],
[ "\033[2XReadCSVfileAsPureCubicalKnot\033[102X", "1.1-15", [ 1, 1, 15 ],
190, 10, "readcsvfileaspurecubicalknot", "X83DB403087D02CC8" ],
[ "\033[2XReadCSVfileAsPureCubicalKnot\033[102X", "1.1-15", [ 1, 1, 15 ],
190, 10, "readcsvfileaspurecubicalknot", "X83DB403087D02CC8" ],
[ "\033[2XReadCSVfileAsPureCubicalKnot\033[102X", "1.1-15", [ 1, 1, 15 ],
190, 10, "readcsvfileaspurecubicalknot", "X83DB403087D02CC8" ],
[ "\033[2XReadImageAsPureCubicalComplex\033[102X", "1.1-16", [ 1, 1, 16 ],
214, 10, "readimageaspurecubicalcomplex", "X7BE9892784AA4990" ],
[ "\033[2XReadImageAsFilteredPureCubicalComplex\033[102X", "1.1-17",
[ 1, 1, 17 ], 230, 10, "readimageasfilteredpurecubicalcomplex",
"X84D89B96873308B7" ],
[ "\033[2XReadImageAsWeightFunction\033[102X", "1.1-18", [ 1, 1, 18 ], 244,
10, "readimageasweightfunction", "X80E8B89F7E95D101" ],
[ "\033[2XReadPDBfileAsPureCubicalComplex\033[102X", "1.1-19",
[ 1, 1, 19 ], 256, 11, "readpdbfileaspurecubicalcomplex",
"X7D8681B079E019C0" ],
[ "\033[2XReadPDBfileAsPureCubicalComplex\033[102X", "1.1-19",
[ 1, 1, 19 ], 256, 11, "readpdbfileaspurecubicalcomplex",
"X7D8681B079E019C0" ],
[ "\033[2XReadPDBfileAsPurepermutahedralComplex\033[102X", "1.1-20",
[ 1, 1, 20 ], 275, 11, "readpdbfileaspurepermutahedralcomplex",
"X7E278788808A9EE4" ],
[ "\033[2XReadPDBfileAsPurePermutahedralComplex\033[102X", "1.1-20",
[ 1, 1, 20 ], 275, 11, "readpdbfileaspurepermutahedralcomplex",
"X7E278788808A9EE4" ],
[ "\033[2XRegularCWPolytope\033[102X", "1.1-21", [ 1, 1, 21 ], 292, 11,
"regularcwpolytope", "X85C818B87D9AC922" ],
[ "\033[2XRegularCWPolytope\033[102X", "1.1-21", [ 1, 1, 21 ], 292, 11,
"regularcwpolytope", "X85C818B87D9AC922" ],
[ "\033[2XSimplicialComplex\033[102X", "1.1-22", [ 1, 1, 22 ], 305, 11,
"simplicialcomplex", "X818F2E887FE5F7BE" ],
[ "\033[2XSymmetricMatrixToFilteredGraph\033[102X", "1.1-23", [ 1, 1, 23 ],
324, 12, "symmetricmatrixtofilteredgraph", "X79CA51F27C07435C" ],
[ "\033[2XSymmetricMatrixToFilteredGraph\033[102X", "1.1-23", [ 1, 1, 23 ],
324, 12, "symmetricmatrixtofilteredgraph", "X79CA51F27C07435C" ],
[ "\033[2XSymmetricMatrixToGraph\033[102X", "1.1-24", [ 1, 1, 24 ], 341,
12, "symmetricmatrixtograph", "X8227636B7E878448" ],
[ "\033[2XCayleyMetric\033[102X", "1.2-1", [ 1, 2, 1 ], 355, 12,
"cayleymetric", "X7F8113757F7DD2F4" ],
[ "\033[2XEuclideanMetric\033[102X", "1.2-2", [ 1, 2, 2 ], 365, 12,
"euclideanmetric", "X7A4560307BA911F5" ],
[ "\033[2XEuclideanSquaredMetric\033[102X", "1.2-3", [ 1, 2, 3 ], 374, 12,
"euclideansquaredmetric", "X789AE7CE8445A67C" ],
[ "\033[2XHammingMetric\033[102X", "1.2-4", [ 1, 2, 4 ], 383, 13,
"hammingmetric", "X79DA33CB7D46CAB4" ],
[ "\033[2XKendallMetric\033[102X", "1.2-5", [ 1, 2, 5 ], 393, 13,
"kendallmetric", "X7BD62D75829F8701" ],
[ "\033[2XManhattanMetric\033[102X", "1.2-6", [ 1, 2, 6 ], 404, 13,
"manhattanmetric", "X8763D1167EF519A1" ],
[ "\033[2XVectorsToSymmetricMatrix\033[102X", "1.2-7", [ 1, 2, 7 ], 413,
13, "vectorstosymmetricmatrix", "X7C86B58A7CEA5513" ],
[ "\033[2XVectorsToSymmetricMatrix\033[102X", "1.2-7", [ 1, 2, 7 ], 413,
13, "vectorstosymmetricmatrix", "X7C86B58A7CEA5513" ],
[ "\033[2XBoundaryMap\033[102X", "1.3-1", [ 1, 3, 1 ], 431, 13,
"boundarymap", "X7AF313D387F6BA22" ],
[ "\033[2XCliqueComplex\033[102X", "1.3-2", [ 1, 3, 2 ], 441, 14,
"cliquecomplex", "X848ED6C378A1C5C0" ],
[ "\033[2XCliqueComplex\033[102X", "1.3-2", [ 1, 3, 2 ], 441, 14,
"cliquecomplex", "X848ED6C378A1C5C0" ],
[ "\033[2XCliqueComplex\033[102X", "1.3-2", [ 1, 3, 2 ], 441, 14,
"cliquecomplex", "X848ED6C378A1C5C0" ],
[ "\033[2XConcentricFiltration\033[102X", "1.3-3", [ 1, 3, 3 ], 461, 14,
"concentricfiltration", "X85FAD5E086DBD429" ],
[ "\033[2XDirectProduct\033[102X", "1.3-4", [ 1, 3, 4 ], 474, 14,
"directproduct", "X861BA02C7902A4F4" ],
[ "\033[2XDirectProduct\033[102X", "1.3-4", [ 1, 3, 4 ], 474, 14,
"directproduct", "X861BA02C7902A4F4" ],
[ "\033[2XFiltrationTerm\033[102X", "1.3-5", [ 1, 3, 5 ], 489, 14,
"filtrationterm", "X7DB4D3B57E0DA723" ],
[ "\033[2XFiltrationTerm\033[102X", "1.3-5", [ 1, 3, 5 ], 489, 14,
"filtrationterm", "X7DB4D3B57E0DA723" ],
[ "\033[2XGraph\033[102X", "1.3-6", [ 1, 3, 6 ], 499, 14, "graph",
"X7B335342839E5146" ],
[ "\033[2XGraph\033[102X", "1.3-6", [ 1, 3, 6 ], 499, 14, "graph",
"X7B335342839E5146" ],
[ "\033[2XHomotopyGraph\033[102X", "1.3-7", [ 1, 3, 7 ], 519, 15,
"homotopygraph", "X7966519E78BC6C18" ],
[ "\033[2XNerve\033[102X", "1.3-8", [ 1, 3, 8 ], 531, 15, "nerve",
"X84560FF678621AE1" ],
[ "\033[2XNerve\033[102X", "1.3-8", [ 1, 3, 8 ], 531, 15, "nerve",
"X84560FF678621AE1" ],
[ "\033[2XNerve\033[102X", "1.3-8", [ 1, 3, 8 ], 531, 15, "nerve",
"X84560FF678621AE1" ],
[ "\033[2XNerve\033[102X", "1.3-8", [ 1, 3, 8 ], 531, 15, "nerve",
"X84560FF678621AE1" ],
[ "\033[2XRegularCWComplex\033[102X", "1.3-9", [ 1, 3, 9 ], 553, 15,
"regularcwcomplex", "X7C2BEF7C871E54D7" ],
[ "\033[2XRegularCWComplex\033[102X", "1.3-9", [ 1, 3, 9 ], 553, 15,
"regularcwcomplex", "X7C2BEF7C871E54D7" ],
[ "\033[2XRegularCWComplex\033[102X", "1.3-9", [ 1, 3, 9 ], 553, 15,
"regularcwcomplex", "X7C2BEF7C871E54D7" ],
[ "\033[2XRegularCWComplex\033[102X", "1.3-9", [ 1, 3, 9 ], 553, 15,
"regularcwcomplex", "X7C2BEF7C871E54D7" ],
[ "\033[2XRegularCWComplex\033[102X", "1.3-9", [ 1, 3, 9 ], 553, 15,
"regularcwcomplex", "X7C2BEF7C871E54D7" ],
[ "\033[2XRegularCWComplex\033[102X", "1.3-9", [ 1, 3, 9 ], 553, 15,
"regularcwcomplex", "X7C2BEF7C871E54D7" ],
[ "\033[2XRegularCWMap\033[102X", "1.3-10", [ 1, 3, 10 ], 580, 15,
"regularcwmap", "X79967AC2859A9631" ],
[ "\033[2XThickeningFiltration\033[102X", "1.3-11", [ 1, 3, 11 ], 591, 16,
"thickeningfiltration", "X82843E747FE622AF" ],
[ "\033[2XThickeningFiltration\033[102X", "1.3-11", [ 1, 3, 11 ], 591, 16,
"thickeningfiltration", "X82843E747FE622AF" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractedComplex\033[102X", "1.4-1", [ 1, 4, 1 ], 608, 16,
"contractedcomplex", "X840576107A2907B8" ],
[ "\033[2XContractibleSubcomplex\033[102X", "1.4-2", [ 1, 4, 2 ], 640, 16,
"contractiblesubcomplex", "X7A46614B84FF25BE" ],
[ "\033[2XContractibleSubcomplex\033[102X", "1.4-2", [ 1, 4, 2 ], 640, 16,
"contractiblesubcomplex", "X7A46614B84FF25BE" ],
[ "\033[2XContractibleSubcomplex\033[102X", "1.4-2", [ 1, 4, 2 ], 640, 16,
"contractiblesubcomplex", "X7A46614B84FF25BE" ],
[ "\033[2XKnotReflection\033[102X", "1.4-3", [ 1, 4, 3 ], 652, 17,
"knotreflection", "X86164F4481ACC485" ],
[ "\033[2XKnotSum\033[102X", "1.4-4", [ 1, 4, 4 ], 660, 17, "knotsum",
"X7D86D13C822D59A9" ],
[ "\033[2XOrientRegularCWComplex\033[102X", "1.4-5", [ 1, 4, 5 ], 671, 17,
"orientregularcwcomplex", "X855537287E9C4E72" ],
[ "\033[2XPathComponent\033[102X", "1.4-6", [ 1, 4, 6 ], 680, 17,
"pathcomponent", "X7A266B5A7BE88E89" ],
[ "\033[2XPathComponent\033[102X", "1.4-6", [ 1, 4, 6 ], 680, 17,
"pathcomponent", "X7A266B5A7BE88E89" ],
[ "\033[2XPathComponent\033[102X", "1.4-6", [ 1, 4, 6 ], 680, 17,
"pathcomponent", "X7A266B5A7BE88E89" ],
[ "\033[2XPureComplexBoundary\033[102X", "1.4-7", [ 1, 4, 7 ], 693, 17,
"purecomplexboundary", "X7FF34B9E86E901DC" ],
[ "\033[2XPureComplexBoundary\033[102X", "1.4-7", [ 1, 4, 7 ], 693, 17,
"purecomplexboundary", "X7FF34B9E86E901DC" ],
[ "\033[2XPureComplexComplement\033[102X", "1.4-8", [ 1, 4, 8 ], 705, 18,
"purecomplexcomplement", "X7D0C9B27845F0739" ],
[ "\033[2XPureComplexComplement\033[102X", "1.4-8", [ 1, 4, 8 ], 705, 18,
"purecomplexcomplement", "X7D0C9B27845F0739" ],
[ "\033[2XPureComplexDifference\033[102X", "1.4-9", [ 1, 4, 9 ], 719, 18,
"purecomplexdifference", "X7FB5BE6C78D5C7C8" ],
[ "\033[2XPureComplexDifference\033[102X", "1.4-9", [ 1, 4, 9 ], 719, 18,
"purecomplexdifference", "X7FB5BE6C78D5C7C8" ],
[ "\033[2XPureComplexInterstection\033[102X", "1.4-10", [ 1, 4, 10 ], 729,
18, "purecomplexinterstection", "X8091C9BA819C2332" ],
[ "\033[2XPureComplexIntersection\033[102X", "1.4-10", [ 1, 4, 10 ], 729,
18, "purecomplexintersection", "X8091C9BA819C2332" ],
[ "\033[2XPureComplexThickened\033[102X", "1.4-11", [ 1, 4, 11 ], 739, 18,
"purecomplexthickened", "X84A7E7A47F7BA09D" ],
[ "\033[2XPureComplexThickened\033[102X", "1.4-11", [ 1, 4, 11 ], 739, 18,
"purecomplexthickened", "X84A7E7A47F7BA09D" ],
[ "\033[2XPureComplexUnion\033[102X", "1.4-12", [ 1, 4, 12 ], 749, 18,
"purecomplexunion", "X78014E027F28C2C8" ],
[ "\033[2XPureComplexUnion\033[102X", "1.4-12", [ 1, 4, 12 ], 749, 18,
"purecomplexunion", "X78014E027F28C2C8" ],
[ "\033[2XSimplifiedComplex\033[102X", "1.4-13", [ 1, 4, 13 ], 759, 18,
"simplifiedcomplex", "X7E7AC0E77E25C45B" ],
[ "\033[2XSimplifiedComplex\033[102X", "1.4-13", [ 1, 4, 13 ], 759, 18,
"simplifiedcomplex", "X7E7AC0E77E25C45B" ],
[ "\033[2XSimplifiedComplex\033[102X", "1.4-13", [ 1, 4, 13 ], 759, 18,
"simplifiedcomplex", "X7E7AC0E77E25C45B" ],
[ "\033[2XSimplifiedComplex\033[102X", "1.4-13", [ 1, 4, 13 ], 759, 18,
"simplifiedcomplex", "X7E7AC0E77E25C45B" ],
[ "\033[2XZigZagContractedComplex\033[102X", "1.4-14", [ 1, 4, 14 ], 780,
19, "zigzagcontractedcomplex", "X844174D37E70B9B4" ],
[ "\033[2XZigZagContractedComplex\033[102X", "1.4-14", [ 1, 4, 14 ], 780,
19, "zigzagcontractedcomplex", "X844174D37E70B9B4" ],
[ "\033[2XZigZagContractedComplex\033[102X", "1.4-14", [ 1, 4, 14 ], 780,
19, "zigzagcontractedcomplex", "X844174D37E70B9B4" ],
[ "\033[2XAlexanderPolynomial\033[102X", "1.5-1", [ 1, 5, 1 ], 796, 19,
"alexanderpolynomial", "X7DC474EE7A909563" ],
[ "\033[2XAlexanderPolynomial\033[102X", "1.5-1", [ 1, 5, 1 ], 796, 19,
"alexanderpolynomial", "X7DC474EE7A909563" ],
[ "\033[2XAlexanderPolynomial\033[102X", "1.5-1", [ 1, 5, 1 ], 796, 19,
"alexanderpolynomial", "X7DC474EE7A909563" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XBettiNumber\033[102X", "1.5-2", [ 1, 5, 2 ], 812, 19,
"bettinumber", "X83EF7B888014C363" ],
[ "\033[2XEulerCharacteristic\033[102X", "1.5-3", [ 1, 5, 3 ], 838, 20,
"eulercharacteristic", "X8307F8DB85F145AE" ],
[ "\033[2XEulerCharacteristic\033[102X", "1.5-3", [ 1, 5, 3 ], 838, 20,
"eulercharacteristic", "X8307F8DB85F145AE" ],
[ "\033[2XEulerCharacteristic\033[102X", "1.5-3", [ 1, 5, 3 ], 838, 20,
"eulercharacteristic", "X8307F8DB85F145AE" ],
[ "\033[2XEulerCharacteristic\033[102X", "1.5-3", [ 1, 5, 3 ], 838, 20,
"eulercharacteristic", "X8307F8DB85F145AE" ],
[ "\033[2XEulerCharacteristic\033[102X", "1.5-3", [ 1, 5, 3 ], 838, 20,
"eulercharacteristic", "X8307F8DB85F145AE" ],
[ "\033[2XEulerCharacteristic\033[102X", "1.5-3", [ 1, 5, 3 ], 838, 20,
"eulercharacteristic", "X8307F8DB85F145AE" ],
[ "\033[2XEulerIntegral\033[102X", "1.5-4", [ 1, 5, 4 ], 854, 20,
"eulerintegral", "X78813B9A851B922A" ],
[ "\033[2XFundamentalGroup\033[102X", "1.5-5", [ 1, 5, 5 ], 863, 20,
"fundamentalgroup", "X7EAE7E4181546C17" ],
[ "\033[2XFundamentalGroup\033[102X", "1.5-5", [ 1, 5, 5 ], 863, 20,
"fundamentalgroup", "X7EAE7E4181546C17" ],
[ "\033[2XFundamentalGroup\033[102X", "1.5-5", [ 1, 5, 5 ], 863, 20,
"fundamentalgroup", "X7EAE7E4181546C17" ],
[ "\033[2XFundamentalGroup\033[102X", "1.5-5", [ 1, 5, 5 ], 863, 20,
"fundamentalgroup", "X7EAE7E4181546C17" ],
[ "\033[2XFundamentalGroup\033[102X", "1.5-5", [ 1, 5, 5 ], 863, 20,
"fundamentalgroup", "X7EAE7E4181546C17" ],
[ "\033[2XFundamentalGroup\033[102X", "1.5-5", [ 1, 5, 5 ], 863, 20,
"fundamentalgroup", "X7EAE7E4181546C17" ],
[ "\033[2XFundamentalGroup\033[102X", "1.5-5", [ 1, 5, 5 ], 863, 20,
"fundamentalgroup", "X7EAE7E4181546C17" ],
[ "\033[2XFundamentalGroupOfQuotient\033[102X", "1.5-6", [ 1, 5, 6 ], 895,
21, "fundamentalgroupofquotient", "X808733FF7EF6278E" ],
[ "\033[2XIsAspherical\033[102X", "1.5-7", [ 1, 5, 7 ], 903, 21,
"isaspherical", "X78F2C5ED80D1C8DD" ],
[ "\033[2XKnotGroup\033[102X", "1.5-8", [ 1, 5, 8 ], 915, 21, "knotgroup",
"X797F8D4A848DD9BC" ],
[ "\033[2XKnotGroup\033[102X", "1.5-8", [ 1, 5, 8 ], 915, 21, "knotgroup",
"X797F8D4A848DD9BC" ],
[ "\033[2XPiZero\033[102X", "1.5-9", [ 1, 5, 9 ], 927, 21, "pizero",
"X825539B57FBDDE86" ],
[ "\033[2XPiZero\033[102X", "1.5-9", [ 1, 5, 9 ], 927, 21, "pizero",
"X825539B57FBDDE86" ],
[ "\033[2XPiZero\033[102X", "1.5-9", [ 1, 5, 9 ], 927, 21, "pizero",
"X825539B57FBDDE86" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XPersistentBettiNumbers\033[102X", "1.5-10", [ 1, 5, 10 ], 940,
21, "persistentbettinumbers", "X7EE96E8B7C1643BD" ],
[ "\033[2XDendrogramMat\033[102X", "1.6-1", [ 1, 6, 1 ], 968, 22,
"dendrogrammat", "X7F5B6CAD7CB2E985" ],
[ "\033[2XChainComplex\033[102X", "1.7-1", [ 1, 7, 1 ], 986, 22,
"chaincomplex", "X7A1C427578108B7E" ],
[ "\033[2XChainComplex\033[102X", "1.7-1", [ 1, 7, 1 ], 986, 22,
"chaincomplex", "X7A1C427578108B7E" ],
[ "\033[2XChainComplex\033[102X", "1.7-1", [ 1, 7, 1 ], 986, 22,
"chaincomplex", "X7A1C427578108B7E" ],
[ "\033[2XChainComplex\033[102X", "1.7-1", [ 1, 7, 1 ], 986, 22,
"chaincomplex", "X7A1C427578108B7E" ],
[ "\033[2XChainComplex\033[102X", "1.7-1", [ 1, 7, 1 ], 986, 22,
"chaincomplex", "X7A1C427578108B7E" ],
[ "\033[2XChainComplexEquivalence\033[102X", "1.7-2", [ 1, 7, 2 ], 1014,
23, "chaincomplexequivalence", "X7D4AF2E8785DA457" ],
[ "\033[2XChainComplexOfQuotient\033[102X", "1.7-3", [ 1, 7, 3 ], 1027, 23,
"chaincomplexofquotient", "X7D77D18679E941D3" ],
[ "\033[2XChainMap\033[102X", "1.7-4", [ 1, 7, 4 ], 1036, 23, "chainmap",
"X7BCD94877DF261C4" ],
[ "\033[2XChainMap\033[102X", "1.7-4", [ 1, 7, 4 ], 1036, 23, "chainmap",
"X7BCD94877DF261C4" ],
[ "\033[2XChainMap\033[102X", "1.7-4", [ 1, 7, 4 ], 1036, 23, "chainmap",
"X7BCD94877DF261C4" ],
[ "\033[2XCochainComplex\033[102X", "1.7-5", [ 1, 7, 5 ], 1063, 23,
"cochaincomplex", "X7B8741FB7A3263EC" ],
[ "\033[2XCochainComplex\033[102X", "1.7-5", [ 1, 7, 5 ], 1063, 23,
"cochaincomplex", "X7B8741FB7A3263EC" ],
[ "\033[2XCochainComplex\033[102X", "1.7-5", [ 1, 7, 5 ], 1063, 23,
"cochaincomplex", "X7B8741FB7A3263EC" ],
[ "\033[2XCochainComplex\033[102X", "1.7-5", [ 1, 7, 5 ], 1063, 23,
"cochaincomplex", "X7B8741FB7A3263EC" ],
[ "\033[2XCochainComplex\033[102X", "1.7-5", [ 1, 7, 5 ], 1063, 23,
"cochaincomplex", "X7B8741FB7A3263EC" ],
[ "\033[2XCriticalCells\033[102X", "1.7-6", [ 1, 7, 6 ], 1083, 24,
"criticalcells", "X8489A39F870FF08B" ],
[ "\033[2XDiagonalApproximation\033[102X", "1.7-7", [ 1, 7, 7 ], 1098, 24,
"diagonalapproximation", "X7A4AD52D82627ABC" ],
[ "\033[2XSize\033[102X", "1.7-8", [ 1, 7, 8 ], 1113, 24, "size",
"X858ADA3B7A684421" ],
[ "\033[2XSize\033[102X", "1.7-8", [ 1, 7, 8 ], 1113, 24, "size",
"X858ADA3B7A684421" ],
[ "\033[2XSize\033[102X", "1.7-8", [ 1, 7, 8 ], 1113, 24, "size",
"X858ADA3B7A684421" ],
[ "\033[2XSize\033[102X", "1.7-8", [ 1, 7, 8 ], 1113, 24, "size",
"X858ADA3B7A684421" ],
[ "\033[2XFilteredTensorWithIntegers\033[102X", "1.8-1", [ 1, 8, 1 ], 1147,
24, "filteredtensorwithintegers", "X829DD3868410FE2E" ],
[ "\033[2XFilteredTensorWithIntegersModP\033[102X", "1.8-2", [ 1, 8, 2 ],
1160, 25, "filteredtensorwithintegersmodp", "X7BC291C47FEAC5B8" ],
[ "\033[2XHomToIntegers\033[102X", "1.8-3", [ 1, 8, 3 ], 1173, 25,
"homtointegers", "X788F3B5E7810E309" ],
[ "\033[2XHomToIntegers\033[102X", "1.8-3", [ 1, 8, 3 ], 1173, 25,
"homtointegers", "X788F3B5E7810E309" ],
[ "\033[2XHomToIntegers\033[102X", "1.8-3", [ 1, 8, 3 ], 1173, 25,
"homtointegers", "X788F3B5E7810E309" ],
[ "\033[2XTensorWithIntegersModP\033[102X", "1.8-4", [ 1, 8, 4 ], 1196, 25,
"tensorwithintegersmodp", "X8122D25786C83565" ],
[ "\033[2XTensorWithIntegersModP\033[102X", "1.8-4", [ 1, 8, 4 ], 1196, 25,
"tensorwithintegersmodp", "X8122D25786C83565" ],
[ "\033[2XTensorWithIntegersModP\033[102X", "1.8-4", [ 1, 8, 4 ], 1196, 25,
"tensorwithintegersmodp", "X8122D25786C83565" ],
[ "\033[2XCohomology\033[102X", "1.9-1", [ 1, 9, 1 ], 1223, 25,
"cohomology", "X84CFC57B7E9CCCF7" ],
[ "\033[2XCohomology\033[102X", "1.9-1", [ 1, 9, 1 ], 1223, 25,
"cohomology", "X84CFC57B7E9CCCF7" ],
[ "\033[2XCohomology\033[102X", "1.9-1", [ 1, 9, 1 ], 1223, 25,
"cohomology", "X84CFC57B7E9CCCF7" ],
[ "\033[2XCohomology\033[102X", "1.9-1", [ 1, 9, 1 ], 1223, 25,
"cohomology", "X84CFC57B7E9CCCF7" ],
[ "\033[2XCohomology\033[102X", "1.9-1", [ 1, 9, 1 ], 1223, 25,
"cohomology", "X84CFC57B7E9CCCF7" ],
[ "\033[2XCohomology\033[102X", "1.9-1", [ 1, 9, 1 ], 1223, 25,
"cohomology", "X84CFC57B7E9CCCF7" ],
[ "\033[2XCohomology\033[102X", "1.9-1", [ 1, 9, 1 ], 1223, 25,
"cohomology", "X84CFC57B7E9CCCF7" ],
[ "\033[2XCupProduct\033[102X", "1.9-2", [ 1, 9, 2 ], 1266, 26,
"cupproduct", "X877825E57D79839C" ],
[ "\033[2XCupProduct\033[102X", "1.9-2", [ 1, 9, 2 ], 1266, 26,
"cupproduct", "X877825E57D79839C" ],
[ "\033[2XHomology\033[102X", "1.9-3", [ 1, 9, 3 ], 1286, 26, "homology",
"X85A9D5CB8605329C" ],
[ "\033[2XHomology\033[102X", "1.9-3", [ 1, 9, 3 ], 1286, 26, "homology",
"X85A9D5CB8605329C" ],
[ "\033[2XHomology\033[102X", "1.9-3", [ 1, 9, 3 ], 1286, 26, "homology",
"X85A9D5CB8605329C" ],
[ "\033[2XHomology\033[102X", "1.9-3", [ 1, 9, 3 ], 1286, 26, "homology",
"X85A9D5CB8605329C" ],
[ "\033[2XHomology\033[102X", "1.9-3", [ 1, 9, 3 ], 1286, 26, "homology",
"X85A9D5CB8605329C" ],
[ "\033[2XHomology\033[102X", "1.9-3", [ 1, 9, 3 ], 1286, 26, "homology",
"X85A9D5CB8605329C" ],
[ "\033[2XHomology\033[102X", "1.9-3", [ 1, 9, 3 ], 1286, 26, "homology",
"X85A9D5CB8605329C" ],
[ "\033[2XBarCodeDisplay\033[102X", "1.10-1", [ 1, 10, 1 ], 1348, 27,
"barcodedisplay", "X806A81EF79CE0DEF" ],
[ "\033[2XBarCodeCompactDisplay\033[102X", "1.10-2", [ 1, 10, 2 ], 1357,
27, "barcodecompactdisplay", "X83D60A6682EBB6F1" ],
[ "\033[2XCayleyGraphOfGroup\033[102X", "1.10-3", [ 1, 10, 3 ], 1366, 27,
"cayleygraphofgroup", "X80CAD0357AF44E48" ],
[ "\033[2XDisplay\033[102X", "1.10-4", [ 1, 10, 4 ], 1376, 27, "display",
"X83A5C59278E13248" ],
[ "\033[2XDisplay\033[102X", "1.10-4", [ 1, 10, 4 ], 1376, 27, "display",
"X83A5C59278E13248" ],
[ "\033[2XDisplay\033[102X", "1.10-4", [ 1, 10, 4 ], 1376, 27, "display",
"X83A5C59278E13248" ],
[ "\033[2XDisplayArcPresentation\033[102X", "1.10-5", [ 1, 10, 5 ], 1404,
27, "displayarcpresentation", "X7B98A3C4831D5B0D" ],
[ "\033[2XDisplayCSVKnotFile\033[102X", "1.10-6", [ 1, 10, 6 ], 1413, 28,
"displaycsvknotfile", "X861690C27BADC326" ],
[ "\033[2XDisplayDendrogram\033[102X", "1.10-7", [ 1, 10, 7 ], 1422, 28,
"displaydendrogram", "X7F4AA01E7C0A5C16" ],
[ "\033[2XDisplayDendrogramMat\033[102X", "1.10-8", [ 1, 10, 8 ], 1430, 28,
"displaydendrogrammat", "X7E5A38F081B401BE" ],
[ "\033[2XDisplayPDBfile\033[102X", "1.10-9", [ 1, 10, 9 ], 1440, 28,
"displaypdbfile", "X822F54F385D7EF8A" ],
[ "\033[2XOrbitPolytope\033[102X", "1.10-10", [ 1, 10, 10 ], 1449, 28,
"orbitpolytope", "X80EC50C27EFF2E12" ],
[ "\033[2XScatterPlot\033[102X", "1.10-11", [ 1, 10, 11 ], 1471, 29,
"scatterplot", "X7DF49EAD7C0B0E84" ],
[ "\033[2XEquivariantChainMap\033[102X", "2.1-1", [ 2, 1, 1 ], 11, 30,
"equivariantchainmap", "X868E2A04832619C5" ],
[ "\033[2XFreeGResolution\033[102X", "2.1-2", [ 2, 1, 2 ], 24, 30,
"freegresolution", "X79EA11238403019D" ],
[ "\033[2XResolutionBieberbachGroup\033[102X", "2.1-3", [ 2, 1, 3 ], 43,
30, "resolutionbieberbachgroup", "X7CA87AA478007468" ],
[ "\033[2XResolutionBieberbachGroup\033[102X", "2.1-3", [ 2, 1, 3 ], 43,
30, "resolutionbieberbachgroup", "X7CA87AA478007468" ],
[ "\033[2XResolutionCubicalCrystGroup\033[102X", "2.1-4", [ 2, 1, 4 ], 63,
31, "resolutioncubicalcrystgroup", "X81A5CEFC82A1897D" ],
[ "\033[2XResolutionFiniteGroup\033[102X", "2.1-5", [ 2, 1, 5 ], 78, 31,
"resolutionfinitegroup", "X789B3E7C7CBB3751" ],
[ "\033[2XResolutionNilpotentGroup\033[102X", "2.1-6", [ 2, 1, 6 ], 103,
31, "resolutionnilpotentgroup", "X7CBE6BDA7DB5AD7D" ],
[ "\033[2XResolutionNormalSeries\033[102X", "2.1-7", [ 2, 1, 7 ], 115, 31,
"resolutionnormalseries", "X8574D76D7C891A04" ],
[ "\033[2XResolutionPrimePowerGroup\033[102X", "2.1-8", [ 2, 1, 8 ], 130,
31, "resolutionprimepowergroup", "X86934BE9858F7199" ],
[ "\033[2XResolutionSL2Z\033[102X", "2.1-9", [ 2, 1, 9 ], 142, 32,
"resolutionsl2z", "X7E4556B078B209CE" ],
[ "\033[2XResolutionSmallGroup\033[102X", "2.1-10", [ 2, 1, 10 ], 155, 32,
"resolutionsmallgroup", "X8518446086A3F7EA" ],
[ "\033[2XResolutionSmallGroup\033[102X", "2.1-10", [ 2, 1, 10 ], 155, 32,
"resolutionsmallgroup", "X8518446086A3F7EA" ],
[ "\033[2XResolutionSubgroup\033[102X", "2.1-11", [ 2, 1, 11 ], 173, 32,
"resolutionsubgroup", "X79A0221B7E96B642" ],
[ "\033[2XLeibnizComplex\033[102X", "2.2-1", [ 2, 2, 1 ], 187, 32,
"leibnizcomplex", "X7D5DD19D7BA9D816" ],
[ "\033[2XHomToIntegers\033[102X", "2.3-1", [ 2, 3, 1 ], 200, 32,
"homtointegers", "X788F3B5E7810E309" ],
[ "\033[2XHomToIntegers\033[102X", "2.3-1", [ 2, 3, 1 ], 200, 32,
"homtointegers", "X788F3B5E7810E309" ],
[ "\033[2XHomToIntegers\033[102X", "2.3-1", [ 2, 3, 1 ], 200, 32,
"homtointegers", "X788F3B5E7810E309" ],
[ "\033[2XHomToIntegralModule\033[102X", "2.3-2", [ 2, 3, 2 ], 223, 33,
"homtointegralmodule", "X81FED0E9858E413A" ],
[ "\033[2XTensorWithIntegers\033[102X", "2.3-3", [ 2, 3, 3 ], 235, 33,
"tensorwithintegers", "X83BA99787CBE2B7D" ],
[ "\033[2XTensorWithIntegers\033[102X", "2.3-3", [ 2, 3, 3 ], 235, 33,
"tensorwithintegers", "X83BA99787CBE2B7D" ],
[ "\033[2XTensorWithIntegersModP\033[102X", "2.3-4", [ 2, 3, 4 ], 273, 33,
"tensorwithintegersmodp", "X8122D25786C83565" ],
[ "\033[2XTensorWithIntegersModP\033[102X", "2.3-4", [ 2, 3, 4 ], 273, 33,
"tensorwithintegersmodp", "X8122D25786C83565" ],
[ "\033[2XTensorWithIntegersModP\033[102X", "2.3-4", [ 2, 3, 4 ], 273, 33,
"tensorwithintegersmodp", "X8122D25786C83565" ],
[ "\033[2XAreIsomorphicGradedAlgebras\033[102X", "2.4-1", [ 2, 4, 1 ], 300,
34, "areisomorphicgradedalgebras", "X79C31EED8406A3E9" ],
[ "\033[2XHAPDerivation\033[102X", "2.4-2", [ 2, 4, 2 ], 310, 34,
"hapderivation", "X83DC2F1A805BA7A3" ],
[ "\033[2XHilbertPoincareSeries\033[102X", "2.4-3", [ 2, 4, 3 ], 322, 34,
"hilbertpoincareseries", "X7B93B7D082A50E61" ],
[ "\033[2XHomologyOfDerivation\033[102X", "2.4-4", [ 2, 4, 4 ], 333, 34,
"homologyofderivation", "X803D9B5E7A26F749" ],
[ "\033[2XIntegralCohomologyGenerators\033[102X", "2.4-5", [ 2, 4, 5 ],
346, 34, "integralcohomologygenerators", "X855D2D747B6C54E1" ],
[ "\033[2XLHSSpectralSequence\033[102X", "2.4-6", [ 2, 4, 6 ], 359, 35,
"lhsspectralsequence", "X7F5D00C97A46D686" ],
[ "\033[2XLHSSpectralSequenceLastSheet\033[102X", "2.4-7", [ 2, 4, 7 ],
370, 35, "lhsspectralsequencelastsheet", "X828D20AC8735152B" ],
[ "\033[2XModPCohomologyGenerators\033[102X", "2.4-8", [ 2, 4, 8 ], 380,
35, "modpcohomologygenerators", "X7DEFADD17CAA6308" ],
[ "\033[2XModPCohomologyGenerators\033[102X", "2.4-8", [ 2, 4, 8 ], 380,
35, "modpcohomologygenerators", "X7DEFADD17CAA6308" ],
[ "\033[2XModPCohomologyRing\033[102X", "2.4-9", [ 2, 4, 9 ], 398, 35,
"modpcohomologyring", "X796632C585D47245" ],
[ "\033[2XModPCohomologyRing\033[102X", "2.4-9", [ 2, 4, 9 ], 398, 35,
"modpcohomologyring", "X796632C585D47245" ],
[ "\033[2XModPCohomologyRing\033[102X", "2.4-9", [ 2, 4, 9 ], 398, 35,
"modpcohomologyring", "X796632C585D47245" ],
[ "\033[2XModPCohomologyRing\033[102X", "2.4-9", [ 2, 4, 9 ], 398, 35,
"modpcohomologyring", "X796632C585D47245" ],
[ "\033[2XMod2CohomologyRingPresentation\033[102X", "2.4-10", [ 2, 4, 10 ],
425, 36, "mod2cohomologyringpresentation", "X831034A284F3906F" ],
[ "\033[2XMod2CohomologyRingPresentation\033[102X", "2.4-10", [ 2, 4, 10 ],
425, 36, "mod2cohomologyringpresentation", "X831034A284F3906F" ],
[ "\033[2XMod2CohomologyRingPresentation\033[102X", "2.4-10", [ 2, 4, 10 ],
425, 36, "mod2cohomologyringpresentation", "X831034A284F3906F" ],
[ "\033[2XMod2CohomologyRingPresentation\033[102X", "2.4-10", [ 2, 4, 10 ],
425, 36, "mod2cohomologyringpresentation", "X831034A284F3906F" ],
[ "\033[2XGroupCohomology\033[102X", "2.5-1", [ 2, 5, 1 ], 451, 36,
"groupcohomology", "X7D1658EF810022E5" ],
[ "\033[2XGroupCohomology\033[102X", "2.5-1", [ 2, 5, 1 ], 451, 36,
"groupcohomology", "X7D1658EF810022E5" ],
[ "\033[2XGroupHomology\033[102X", "2.5-2", [ 2, 5, 2 ], 468, 36,
"grouphomology", "X7F0A19E97980FD57" ],
[ "\033[2XGroupHomology\033[102X", "2.5-2", [ 2, 5, 2 ], 468, 36,
"grouphomology", "X7F0A19E97980FD57" ],
[ "\033[2XPrimePartDerivedFunctor\033[102X", "2.5-3", [ 2, 5, 3 ], 492, 37,
"primepartderivedfunctor", "X7A30C1CC7FB6B2E9" ],
[ "\033[2XPoincareSeries\033[102X", "2.5-4", [ 2, 5, 4 ], 507, 37,
"poincareseries", "X828B81D9829328F8" ],
[ "\033[2XPoincareSeries\033[102X", "2.5-4", [ 2, 5, 4 ], 507, 37,
"poincareseries", "X828B81D9829328F8" ],
[ "\033[2XPoincareSeries\033[102X", "2.5-4", [ 2, 5, 4 ], 507, 37,
"poincareseries", "X828B81D9829328F8" ],
[ "\033[2XPoincareSeries\033[102X", "2.5-4", [ 2, 5, 4 ], 507, 37,
"poincareseries", "X828B81D9829328F8" ],
[ "\033[2XPoincareSeries\033[102X", "2.5-5", [ 2, 5, 5 ], 534, 37,
"poincareseries", "X828B81D9829328F8" ],
[ "\033[2XPoincareSeries\033[102X", "2.5-5", [ 2, 5, 5 ], 534, 37,
"poincareseries", "X828B81D9829328F8" ],
[ "\033[2XPoincareSeries\033[102X", "2.5-5", [ 2, 5, 5 ], 534, 37,
"poincareseries", "X828B81D9829328F8" ],
[ "\033[2XPoincareSeries\033[102X", "2.5-5", [ 2, 5, 5 ], 534, 37,
"poincareseries", "X828B81D9829328F8" ],
[ "\033[2XRankHomologyPGroup\033[102X", "2.5-6", [ 2, 5, 6 ], 561, 38,
"rankhomologypgroup", "X7EFE814686C4EEF5" ],
[ "\033[2XGroupAlgebraAsFpGModule\033[102X", "2.6-1", [ 2, 6, 1 ], 574, 38,
"groupalgebraasfpgmodule", "X85758F95832207D2" ],
[ "\033[2XRadical\033[102X", "2.6-2", [ 2, 6, 2 ], 583, 38, "radical",
"X84B5182E831D0928" ],
[ "\033[2XRadicalSeries\033[102X", "2.6-3", [ 2, 6, 3 ], 591, 38,
"radicalseries", "X7929281B848A9FBE" ],
[ "\033[2XRadicalSeries\033[102X", "2.6-3", [ 2, 6, 3 ], 591, 38,
"radicalseries", "X7929281B848A9FBE" ],
[ "\033[2XCcGroup\033[102X", "3.1-1", [ 3, 1, 1 ], 11, 39, "ccgroup",
"X8343D6CA811C1E50" ],
[ "\033[2XCocycleCondition\033[102X", "3.1-2", [ 3, 1, 2 ], 26, 39,
"cocyclecondition", "X7C4C64EE864B04D5" ],
[ "\033[2XStandardCocycle\033[102X", "3.1-3", [ 3, 1, 3 ], 40, 39,
"standardcocycle", "X7A69F5007F07F478" ],
[ "\033[2XStandardCocycle\033[102X", "3.1-3", [ 3, 1, 3 ], 40, 39,
"standardcocycle", "X7A69F5007F07F478" ],
[ "\033[2XActedGroup\033[102X", "3.2-1", [ 3, 2, 1 ], 58, 40, "actedgroup",
"X787C8FD6879771D9" ],
[ "\033[2XActingGroup\033[102X", "3.2-2", [ 3, 2, 2 ], 69, 40,
"actinggroup", "X8115386782214B38" ],
[ "\033[2XCentre\033[102X", "3.2-3", [ 3, 2, 3 ], 79, 40, "centre",
"X847ABE6F781C7FE8" ],
[ "\033[2XGOuterGroup\033[102X", "3.2-4", [ 3, 2, 4 ], 92, 40,
"goutergroup", "X842035BD7E0B81EF" ],
[ "\033[2XGOuterGroup\033[102X", "3.2-4", [ 3, 2, 4 ], 92, 40,
"goutergroup", "X842035BD7E0B81EF" ],
[ "\033[2XCohomologyModule\033[102X", "3.3-1", [ 3, 3, 1 ], 112, 41,
"cohomologymodule", "X7D5E7FB97BF38DF1" ],
[ "\033[2XHomToGModule\033[102X", "3.3-2", [ 3, 3, 2 ], 127, 41,
"homtogmodule", "X7CF7B8A3842D498B" ],
[ "\033[2XChildCreate\033[102X", "4.1-1", [ 4, 1, 1 ], 11, 42,
"childcreate", "X780C7FD2866D6C2B" ],
[ "\033[2XChildProcess\033[102X", "4.1-1", [ 4, 1, 1 ], 11, 42,
"childprocess", "X780C7FD2866D6C2B" ],
[ "\033[2XChildProcess\033[102X", "4.1-1", [ 4, 1, 1 ], 11, 42,
"childprocess", "X780C7FD2866D6C2B" ],
[ "\033[2XChildProcess\033[102X", "4.1-1", [ 4, 1, 1 ], 11, 42,
"childprocess", "X780C7FD2866D6C2B" ],
[ "\033[2XChildCreate\033[102X", "4.1-2", [ 4, 1, 2 ], 29, 42,
"childcreate", "X780C7FD2866D6C2B" ],
[ "\033[2XChildProcess\033[102X", "4.1-2", [ 4, 1, 2 ], 29, 42,
"childprocess", "X780C7FD2866D6C2B" ],
[ "\033[2XChildProcess\033[102X", "4.1-2", [ 4, 1, 2 ], 29, 42,
"childprocess", "X780C7FD2866D6C2B" ],
[ "\033[2XChildProcess\033[102X", "4.1-2", [ 4, 1, 2 ], 29, 42,
"childprocess", "X780C7FD2866D6C2B" ],
[ "\033[2XTietzeReducedResolution\033[102X", "5.1-1", [ 5, 1, 1 ], 7, 44,
"tietzereducedresolution", "X7D8875C87BC9C379" ],
[ "\033[2XResolutionArithmeticGroup\033[102X", "5.1-2", [ 5, 1, 2 ], 17,
44, "resolutionarithmeticgroup", "X808535C3851CA4D4" ],
[ "\033[2XFreeGResolution\033[102X", "5.1-3", [ 5, 1, 3 ], 44, 45,
"freegresolution", "X79EA11238403019D" ],
[ "\033[2XFreeGResolution\033[102X", "5.1-3", [ 5, 1, 3 ], 44, 45,
"freegresolution", "X79EA11238403019D" ],
[ "\033[2XResolutionGTree\033[102X", "5.1-4", [ 5, 1, 4 ], 64, 45,
"resolutiongtree", "X8108E1047C31A058" ],
[ "\033[2XResolutionSL2Z\033[102X", "5.1-5", [ 5, 1, 5 ], 79, 45,
"resolutionsl2z", "X7E4556B078B209CE" ],
[ "\033[2XResolutionAbelianGroup\033[102X", "5.1-6", [ 5, 1, 6 ], 92, 45,
"resolutionabeliangroup", "X79CB82D77A1FAE9D" ],
[ "\033[2XResolutionAbelianGroup\033[102X", "5.1-6", [ 5, 1, 6 ], 92, 45,
"resolutionabeliangroup", "X79CB82D77A1FAE9D" ],
[ "\033[2XResolutionAlmostCrystalGroup\033[102X", "5.1-7", [ 5, 1, 7 ],
108, 46, "resolutionalmostcrystalgroup", "X79107B5F857DC27B" ],
[ "\033[2XResolutionAlmostCrystalQuotient\033[102X", "5.1-8", [ 5, 1, 8 ],
120, 46, "resolutionalmostcrystalquotient", "X839D1B3B78B672BB" ],
[ "\033[2XResolutionAlmostCrystalQuotient\033[102X", "5.1-8", [ 5, 1, 8 ],
120, 46, "resolutionalmostcrystalquotient", "X839D1B3B78B672BB" ],
[ "\033[2XResolutionArtinGroup\033[102X", "5.1-9", [ 5, 1, 9 ], 142, 46,
"resolutionartingroup", "X82A0D2B986724BB1" ],
[ "\033[2XResolutionAsphericalPresentation\033[102X", "5.1-10",
[ 5, 1, 10 ], 167, 47, "resolutionasphericalpresentation",
"X87DABAF98575DC13" ],
[ "\033[2XResolutionBieberbachGroup\033[102X", "5.1-11", [ 5, 1, 11 ], 182,
47, "resolutionbieberbachgroup", "X7CA87AA478007468" ],
[ "\033[2XResolutionBieberbachGroup\033[102X", "5.1-11", [ 5, 1, 11 ], 182,
47, "resolutionbieberbachgroup", "X7CA87AA478007468" ],
[ "\033[2XResolutionCoxeterGroup\033[102X", "5.1-12", [ 5, 1, 12 ], 201,
47, "resolutioncoxetergroup", "X7A20180E7D45038F" ],
[ "\033[2XResolutionDirectProduct\033[102X", "5.1-13", [ 5, 1, 13 ], 216,
47, "resolutiondirectproduct", "X7FCE801781AD83E1" ],
[ "\033[2XResolutionDirectProduct\033[102X", "5.1-13", [ 5, 1, 13 ], 216,
47, "resolutiondirectproduct", "X7FCE801781AD83E1" ],
[ "\033[2XResolutionExtension\033[102X", "5.1-14", [ 5, 1, 14 ], 230, 48,
"resolutionextension", "X79C83C4881B6A656" ],
[ "\033[2XResolutionExtension\033[102X", "5.1-14", [ 5, 1, 14 ], 230, 48,
"resolutionextension", "X79C83C4881B6A656" ],
[ "\033[2XResolutionExtension\033[102X", "5.1-14", [ 5, 1, 14 ], 230, 48,
"resolutionextension", "X79C83C4881B6A656" ],
[ "\033[2XResolutionFiniteDirectProduct\033[102X", "5.1-15", [ 5, 1, 15 ],
256, 48, "resolutionfinitedirectproduct", "X87C346747F3B7C8C" ],
[ "\033[2XResolutionFiniteDirectProduct\033[102X", "5.1-15", [ 5, 1, 15 ],
256, 48, "resolutionfinitedirectproduct", "X87C346747F3B7C8C" ],
[ "\033[2XResolutionFiniteExtension\033[102X", "5.1-16", [ 5, 1, 16 ], 270,
48, "resolutionfiniteextension", "X79EDB1D584C2776F" ],
[ "\033[2XResolutionFiniteExtension\033[102X", "5.1-16", [ 5, 1, 16 ], 270,
48, "resolutionfiniteextension", "X79EDB1D584C2776F" ],
[ "\033[2XResolutionFiniteExtension\033[102X", "5.1-16", [ 5, 1, 16 ], 270,
48, "resolutionfiniteextension", "X79EDB1D584C2776F" ],
[ "\033[2XResolutionFiniteGroup\033[102X", "5.1-17", [ 5, 1, 17 ], 292, 48,
"resolutionfinitegroup", "X789B3E7C7CBB3751" ],
[ "\033[2XResolutionFiniteGroup\033[102X", "5.1-17", [ 5, 1, 17 ], 292, 48,
"resolutionfinitegroup", "X789B3E7C7CBB3751" ],
[ "\033[2XResolutionFiniteGroup\033[102X", "5.1-17", [ 5, 1, 17 ], 292, 48,
"resolutionfinitegroup", "X789B3E7C7CBB3751" ],
[ "\033[2XResolutionFiniteGroup\033[102X", "5.1-17", [ 5, 1, 17 ], 292, 48,
"resolutionfinitegroup", "X789B3E7C7CBB3751" ],
[ "\033[2XResolutionFiniteSubgroup\033[102X", "5.1-18", [ 5, 1, 18 ], 331,
49, "resolutionfinitesubgroup", "X7AF48FA77F677E75" ],
[ "\033[2XResolutionFiniteSubgroup\033[102X", "5.1-18", [ 5, 1, 18 ], 331,
49, "resolutionfinitesubgroup", "X7AF48FA77F677E75" ],
[ "\033[2XResolutionGraphOfGroups\033[102X", "5.1-19", [ 5, 1, 19 ], 351,
49, "resolutiongraphofgroups", "X78E504557FD75664" ],
[ "\033[2XResolutionGraphOfGroups\033[102X", "5.1-19", [ 5, 1, 19 ], 351,
49, "resolutiongraphofgroups", "X78E504557FD75664" ],
[ "\033[2XResolutionNilpotentGroup\033[102X", "5.1-20", [ 5, 1, 20 ], 374,
49, "resolutionnilpotentgroup", "X7CBE6BDA7DB5AD7D" ],
[ "\033[2XResolutionNilpotentGroup\033[102X", "5.1-20", [ 5, 1, 20 ], 374,
49, "resolutionnilpotentgroup", "X7CBE6BDA7DB5AD7D" ],
[ "\033[2XResolutionNormalSeries\033[102X", "5.1-21", [ 5, 1, 21 ], 398,
50, "resolutionnormalseries", "X8574D76D7C891A04" ],
[ "\033[2XResolutionNormalSeries\033[102X", "5.1-21", [ 5, 1, 21 ], 398,
50, "resolutionnormalseries", "X8574D76D7C891A04" ],
[ "\033[2XResolutionNormalSeries\033[102X", "5.1-21", [ 5, 1, 21 ], 398,
50, "resolutionnormalseries", "X8574D76D7C891A04" ],
[ "\033[2XResolutionPrimePowerGroup\033[102X", "5.1-22", [ 5, 1, 22 ], 424,
50, "resolutionprimepowergroup", "X86934BE9858F7199" ],
[ "\033[2XResolutionPrimePowerGroup\033[102X", "5.1-22", [ 5, 1, 22 ], 424,
50, "resolutionprimepowergroup", "X86934BE9858F7199" ],
[ "\033[2XResolutionSmallFpGroup\033[102X", "5.1-23", [ 5, 1, 23 ], 444,
50, "resolutionsmallfpgroup", "X8521359A87D46462" ],
[ "\033[2XResolutionSmallFpGroup\033[102X", "5.1-23", [ 5, 1, 23 ], 444,
50, "resolutionsmallfpgroup", "X8521359A87D46462" ],
[ "\033[2XResolutionSubgroup\033[102X", "5.1-24", [ 5, 1, 24 ], 463, 51,
"resolutionsubgroup", "X79A0221B7E96B642" ],
[ "\033[2XResolutionSubnormalSeries\033[102X", "5.1-25", [ 5, 1, 25 ], 480,
51, "resolutionsubnormalseries", "X80CE971A7C2C538B" ],
[ "\033[2XTwistedTensorProduct\033[102X", "5.1-26", [ 5, 1, 26 ], 495, 51,
"twistedtensorproduct", "X7A8E03D57895D04A" ],
[ "\033[2XConjugatedResolution\033[102X", "5.1-27", [ 5, 1, 27 ], 508, 51,
"conjugatedresolution", "X864044D679AE4E25" ],
[ "\033[2XRecalculateIncidenceNumbers\033[102X", "5.1-28", [ 5, 1, 28 ],
518, 52, "recalculateincidencenumbers", "X82646B64875E5560" ],
[ "\033[2XResolutionFpGModule\033[102X", "6.1-1", [ 6, 1, 1 ], 7, 53,
"resolutionfpgmodule", "X795E37107DE0D0BD" ],
[ "\033[2XEquivariantChainMap\033[102X", "7.1-1", [ 7, 1, 1 ], 7, 54,
"equivariantchainmap", "X868E2A04832619C5" ],
[ "\033[2XExtendScalars\033[102X", "8.1-1", [ 8, 1, 1 ], 7, 55,
"extendscalars", "X81BA486D7E532469" ],
[ "\033[2XHomToIntegers\033[102X", "8.1-2", [ 8, 1, 2 ], 18, 55,
"homtointegers", "X788F3B5E7810E309" ],
[ "\033[2XHomToIntegersModP\033[102X", "8.1-3", [ 8, 1, 3 ], 34, 55,
"homtointegersmodp", "X7E0216028756963B" ],
[ "\033[2XHomToIntegralModule\033[102X", "8.1-4", [ 8, 1, 4 ], 47, 55,
"homtointegralmodule", "X81FED0E9858E413A" ],
[ "\033[2XTensorWithIntegralModule\033[102X", "8.1-5", [ 8, 1, 5 ], 60, 56,
"tensorwithintegralmodule", "X7F5BAB35811AB0D1" ],
[ "\033[2XHomToGModule\033[102X", "8.1-6", [ 8, 1, 6 ], 72, 56,
"homtogmodule", "X7CF7B8A3842D498B" ],
[ "\033[2XInduceScalars\033[102X", "8.1-7", [ 8, 1, 7 ], 84, 56,
"inducescalars", "X7D686D5D78FEF5C9" ],
[ "\033[2XLowerCentralSeriesLieAlgebra\033[102X", "8.1-8", [ 8, 1, 8 ], 93,
56, "lowercentralseriesliealgebra", "X8456E06D7E76707B" ],
[ "\033[2XLowerCentralSeriesLieAlgebra\033[102X", "8.1-8", [ 8, 1, 8 ], 93,
56, "lowercentralseriesliealgebra", "X8456E06D7E76707B" ],
[ "\033[2XTensorWithIntegers\033[102X", "8.1-9", [ 8, 1, 9 ], 116, 57,
"tensorwithintegers", "X83BA99787CBE2B7D" ],
[ "\033[2XFilteredTensorWithIntegers\033[102X", "8.1-10", [ 8, 1, 10 ],
151, 57, "filteredtensorwithintegers", "X829DD3868410FE2E" ],
[ "\033[2XTensorWithTwistedIntegers\033[102X", "8.1-11", [ 8, 1, 11 ], 164,
57, "tensorwithtwistedintegers", "X7A0B33D085067A38" ],
[ "\033[2XTensorWithIntegersModP\033[102X", "8.1-12", [ 8, 1, 12 ], 178,
57, "tensorwithintegersmodp", "X8122D25786C83565" ],
[ "\033[2XTensorWithTwistedIntegersModP\033[102X", "8.1-13", [ 8, 1, 13 ],
197, 57, "tensorwithtwistedintegersmodp", "X873096CB823BFD1B" ],
[ "\033[2XTensorWithRationals\033[102X", "8.1-14", [ 8, 1, 14 ], 208, 58,
"tensorwithrationals", "X809BA8A87F61EEDA" ],
[ "\033[2XChainComplex\033[102X", "9.1-1", [ 9, 1, 1 ], 7, 59,
"chaincomplex", "X7A1C427578108B7E" ],
[ "\033[2XChainComplexOfPair\033[102X", "9.1-2", [ 9, 1, 2 ], 25, 59,
"chaincomplexofpair", "X838AF689838BA681" ],
[ "\033[2XChevalleyEilenbergComplex\033[102X", "9.1-3", [ 9, 1, 3 ], 35,
59, "chevalleyeilenbergcomplex", "X7D84631C7B16C703" ],
[ "\033[2XLeibnizComplex\033[102X", "9.1-4", [ 9, 1, 4 ], 52, 60,
"leibnizcomplex", "X7D5DD19D7BA9D816" ],
[ "\033[2XSuspendedChainComplex\033[102X", "9.1-5", [ 9, 1, 5 ], 69, 60,
"suspendedchaincomplex", "X86EC96CC7EB5957E" ],
[ "\033[2XReducedSuspendedChainComplex\033[102X", "9.1-6", [ 9, 1, 6 ], 78,
60, "reducedsuspendedchaincomplex", "X83340F8C868BDE60" ],
[ "\033[2XCoreducedChainComplex\033[102X", "9.1-7", [ 9, 1, 7 ], 88, 60,
"coreducedchaincomplex", "X82F1E19E7B11095A" ],
[ "\033[2XCoreducedChainComplex\033[102X", "9.1-7", [ 9, 1, 7 ], 88, 60,
"coreducedchaincomplex", "X82F1E19E7B11095A" ],
[ "\033[2XTensorProductOfChainComplexes\033[102X", "9.1-8", [ 9, 1, 8 ],
100, 60, "tensorproductofchaincomplexes", "X7ADC193D813C82F7" ],
[ "\033[2XLefschetzNumber\033[102X", "9.1-9", [ 9, 1, 9 ], 111, 61,
"lefschetznumber", "X7992AE7B7C8201F9" ],
[ "\033[2XSparseMat\033[102X", "10.1-1", [ 10, 1, 1 ], 7, 62, "sparsemat",
"X81D5E16D81934320" ],
[ "\033[2XTransposeOfSparseMat\033[102X", "10.1-2", [ 10, 1, 2 ], 15, 62,
"transposeofsparsemat", "X7C85DF92798C625A" ],
[ "\033[2XReverseSparseMat\033[102X", "10.1-3", [ 10, 1, 3 ], 23, 62,
"reversesparsemat", "X8011873278AB2827" ],
[ "\033[2XSparseRowMult\033[102X", "10.1-4", [ 10, 1, 4 ], 32, 62,
"sparserowmult", "X8551FB1D81A85362" ],
[ "\033[2XSparseRowInterchange\033[102X", "10.1-5", [ 10, 1, 5 ], 41, 63,
"sparserowinterchange", "X824CD2E6862435EB" ],
[ "\033[2XSparseRowAdd\033[102X", "10.1-6", [ 10, 1, 6 ], 50, 63,
"sparserowadd", "X84E8FA687CABA3CD" ],
[ "\033[2XSparseSemiEchelon\033[102X", "10.1-7", [ 10, 1, 7 ], 59, 63,
"sparsesemiechelon", "X7BE58D2983505606" ],
[ "\033[2XRankMatDestructive\033[102X", "10.1-8", [ 10, 1, 8 ], 69, 63,
"rankmatdestructive", "X7A7B47D380A14F28" ],
[ "\033[2XRankMat\033[102X", "10.1-9", [ 10, 1, 9 ], 78, 63, "rankmat",
"X7B21AE7987D4FB31" ],
[ "\033[2XSparseChainComplex\033[102X", "10.1-10", [ 10, 1, 10 ], 86, 63,
"sparsechaincomplex", "X7F10BD65823B1632" ],
[ "\033[2XSparseChainComplexOfRegularCWComplex\033[102X", "10.1-11",
[ 10, 1, 11 ], 97, 64, "sparsechaincomplexofregularcwcomplex",
"X8156FB007C49C020" ],
[ "\033[2XSparseBoundaryMatrix\033[102X", "10.1-12", [ 10, 1, 12 ], 107,
64, "sparseboundarymatrix", "X7BA17DDC81AA855D" ],
[ "\033[2XBettinumbers\033[102X", "10.1-13", [ 10, 1, 13 ], 116, 64,
"bettinumbers", "X7C3327917BE532FD" ],
[ "\033[2XCohomology\033[102X", "11.1-1", [ 11, 1, 1 ], 7, 65,
"cohomology", "X84CFC57B7E9CCCF7" ],
[ "\033[2XCohomologyModule\033[102X", "11.1-2", [ 11, 1, 2 ], 47, 65,
"cohomologymodule", "X7D5E7FB97BF38DF1" ],
[ "\033[2XCohomologyPrimePart\033[102X", "11.1-3", [ 11, 1, 3 ], 62, 65,
"cohomologyprimepart", "X86F3E9F17BF08BC0" ],
[ "\033[2XGroupCohomology\033[102X", "11.1-4", [ 11, 1, 4 ], 72, 66,
"groupcohomology", "X7D1658EF810022E5" ],
[ "\033[2XGroupCohomology\033[102X", "11.1-4", [ 11, 1, 4 ], 72, 66,
"groupcohomology", "X7D1658EF810022E5" ],
[ "\033[2XGroupHomology\033[102X", "11.1-5", [ 11, 1, 5 ], 105, 66,
"grouphomology", "X7F0A19E97980FD57" ],
[ "\033[2XGroupHomology\033[102X", "11.1-5", [ 11, 1, 5 ], 105, 66,
"grouphomology", "X7F0A19E97980FD57" ],
[ "\033[2XPersistentHomologyOfQuotientGroupSeries\033[102X", "11.1-6",
[ 11, 1, 6 ], 145, 67, "persistenthomologyofquotientgroupseries",
"X7F1A5C7D8288480F" ],
[ "\033[2XPersistentHomologyOfQuotientGroupSeries\033[102X", "11.1-6",
[ 11, 1, 6 ], 145, 67, "persistenthomologyofquotientgroupseries",
"X7F1A5C7D8288480F" ],
[ "\033[2XPersistentCohomologyOfQuotientGroupSeries\033[102X", "11.1-7",
[ 11, 1, 7 ], 171, 67, "persistentcohomologyofquotientgroupseries",
"X82FFCD8F8567BC95" ],
--> --------------------
--> maximum size reached
--> --------------------
[ Dauer der Verarbeitung: 0.24 Sekunden
(vorverarbeitet)
]
|
