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#SIXFORMAT GapDocGAP
HELPBOOKINFOSIXTMP := rec( encoding := "UTF-8", bookname := "HAP", entries := [ [ "Title page", "0.0", [ 0, 0, 0 ], 1, 1, "title page", "X7D2C85EC87DD46E5" ], [ "Table of Contents", "0.0-1", [ 0, 0, 1 ], 18, 2, "table of contents", "X8537FEB07AF2BEC8" ], [ "\033[1X\033[33X\033[0;-2YSimplicial complexes & CW complexes\033[133X\033[\ 101X", "1", [ 1, 0, 0 ], 1, 7, "simplicial complexes & cw complexes", "X7E5EA9587D4BCFB4" ], [ "\033[1X\033[33X\033[0;-2YThe Klein bottle as a simplicial complex\033[133X\ \033[101X", "1.1", [ 1, 1, 0 ], 4, 7, "the klein bottle as a simplicial complex", "X85691C6980034524" ], [ "\033[1X\033[33X\033[0;-2YOther simplicial surfaces\033[133X\033[101X", "1.2", [ 1, 2, 0 ], 46, 8, "other simplicial surfaces", "X7B8F88487B1B766C" ], [ "\033[1X\033[33X\033[0;-2YThe Quillen complex\033[133X\033[101X", "1.3", [ 1, 3, 0 ], 86, 8, "the quillen complex", "X80A72C347D99A58E" ], [ "\033[1X\033[33X\033[0;-2YThe Quillen complex as a reduced CW-complex\033[1\ 33X\033[101X", "1.4", [ 1, 4, 0 ], 110, 9, "the quillen complex as a reduced cw-complex", "X7C4A2B8B79950232" ], [ "\033[1X\033[33X\033[0;-2YSimple homotopy equivalences\033[133X\033[101X", "1.5", [ 1, 5, 0 ], 143, 9, "simple homotopy equivalences", "X782AAB84799E3C44" ], [ "\033[1X\033[33X\033[0;-2YCellular simplifications preserving homeomorphism\ type\033[133X\033[101X", "1.6", [ 1, 6, 0 ], 186, 10, "cellular simplifications preserving homeomorphism type", "X80474C7885AC1578" ], [ "\033[1X\033[33X\033[0;-2YConstructing a CW-structure on a knot complement\\ 033[133X\033[101X", "1.7", [ 1, 7, 0 ], 212, 10, "constructing a cw-structure on a knot complement", "X7A15484C7E680AC9" ], [ "\033[1X\033[33X\033[0;-2YConstructing a regular CW-complex by attaching ce\ lls\033[133X\033[101X", "1.8", [ 1, 8, 0 ], 247, 11, "constructing a regular cw-complex by attaching cells", "X829793717FB6DDCE" ], [ "\033[1X\033[33X\033[0;-2YConstructing a regular CW-complex from its face l\ attice\033[133X\033[101X", "1.9", [ 1, 9, 0 ], 305, 12, "constructing a regular cw-complex from its face lattice", "X7B7354E68025FC92" ], [ "\033[1X\033[33X\033[0;-2YCup products\033[133X\033[101X", "1.10", [ 1, 10, 0 ], 375, 13, "cup products", "X823FA6A9828FF473" ], [ "\033[1X\033[33X\033[0;-2YIntersection forms of \033[22X4\033[122X\033[101X\ \027\033[1X\027-manifolds\033[133X\033[101X", "1.11", [ 1, 11, 0 ], 636, 18, "intersection forms of 4-manifolds", "X7F9B01CF7EE1D2FC" ], [ "\033[1X\033[33X\033[0;-2YCohomology Rings\033[133X\033[101X", "1.12", [ 1, 12, 0 ], 712, 19, "cohomology rings", "X80B6849C835B7F19" ], [ "\033[1X\033[33X\033[0;-2YBockstein homomorphism\033[133X\033[101X", "1.13", [ 1, 13, 0 ], 783, 20, "bockstein homomorphism", "X83035DEC7C9659C6" ], [ "\033[1X\033[33X\033[0;-2YDiagonal maps on associahedra and other polytopes\ \033[133X\033[101X", "1.14", [ 1, 14, 0 ], 827, 21, "diagonal maps on associahedra and other polytopes", "X87135D067B6CDEEC" ], [ "\033[1X\033[33X\033[0;-2YCW maps and induced homomorphisms\033[133X\033[10\ 1X", "1.15", [ 1, 15, 0 ], 877, 21, "cw maps and induced homomorphisms", "X8771FF2885105154" ], [ "\033[1X\033[33X\033[0;-2YConstructing a simplicial complex from a regular \ CW-complex\033[133X\033[101X", "1.16", [ 1, 16, 0 ], 931, 22, "constructing a simplicial complex from a regular cw-complex", "X853D6B247D0E18DB" ], [ "\033[1X\033[33X\033[0;-2YSome limitations to representing spaces as regula\ r CW complexes\033[133X\033[101X", "1.17", [ 1, 17, 0 ], 959, 23, "some limitations to representing spaces as regular cw complexes", "X7900FD197F175551" ], [ "\033[1X\033[33X\033[0;-2YEquivariant CW complexes\033[133X\033[101X", "1.18", [ 1, 18, 0 ], 1047, 24, "equivariant cw complexes", "X85A579217DCB6CC8" ], [ "\033[1X\033[33X\033[0;-2YOrbifolds and classifying spaces\033[133X\033[101\ X", "1.19", [ 1, 19, 0 ], 1176, 26, "orbifolds and classifying spaces", "X86881717878ADCD6" ], [ "\033[1X\033[33X\033[0;-2YCubical complexes & permutahedral complexes\033[1\ 33X\033[101X", "2", [ 2, 0, 0 ], 1, 31, "cubical complexes & permutahedral complexes", "X7F8376F37AF80AAC" ], [ "\033[1X\033[33X\033[0;-2YCubical complexes\033[133X\033[101X", "2.1", [ 2, 1, 0 ], 4, 31, "cubical complexes", "X7D67D5F3820637AD" ], [ "\033[1X\033[33X\033[0;-2YPermutahedral complexes\033[133X\033[101X", "2.2", [ 2, 2, 0 ], 91, 32, "permutahedral complexes", "X85D8195379F2A8CA" ], [ "\033[1X\033[33X\033[0;-2YConstructing pure cubical and permutahedral compl\ exes\033[133X\033[101X", "2.3", [ 2, 3, 0 ], 218, 34, "constructing pure cubical and permutahedral complexes", "X78D3037283B506E0" ], [ "\033[1X\033[33X\033[0;-2YComputations in dynamical systems\033[133X\033[10\ 1X", "2.4", [ 2, 4, 0 ], 240, 35, "computations in dynamical systems", "X8462CF66850CC3A8" ], [ "\033[1X\033[33X\033[0;-2YCovering spaces\033[133X\033[101X", "3", [ 3, 0, 0 ], 1, 36, "covering spaces", "X87472058788D76C0" ], [ "\033[1X\033[33X\033[0;-2YCellular chains on the universal cover\033[133X\\ 033[101X", "3.1", [ 3, 1, 0 ], 15, 36, "cellular chains on the universal cover", "X85FB4CA987BC92CC" ], [ "\033[1X\033[33X\033[0;-2YSpun knots and the Satoh tube map\033[133X\033[10\ 1X", "3.2", [ 3, 2, 0 ], 81, 37, "spun knots and the satoh tube map", "X7E5CC04E7E3CCDAD" ], [ "\033[1X\033[33X\033[0;-2YCohomology with local coefficients\033[133X\033[1\ 01X", "3.3", [ 3, 3, 0 ], 178, 39, "cohomology with local coefficients", "X7C304A1C7EF0BA60" ], [ "\033[1X\033[33X\033[0;-2YDistinguishing between two non-homeomorphic homot\ opy equivalent spaces\033[133X\033[101X", "3.4", [ 3, 4, 0 ], 218, 40, "distinguishing between two non-homeomorphic homotopy equivalent spaces" , "X7A4F34B780FA2CD5" ], [ "\033[1X\033[33X\033[0;-2YSecond homotopy groups of spaces with finite fund\ amental group\033[133X\033[101X", "3.5", [ 3, 5, 0 ], 259, 40, "second homotopy groups of spaces with finite fundamental group", "X869FD75B84AAC7AD" ], [ "\033[1X\033[33X\033[0;-2YThird homotopy groups of simply connected spaces\\ 033[133X\033[101X", "3.6", [ 3, 6, 0 ], 307, 41, "third homotopy groups of simply connected spaces", "X87F8F6C3812A7E73" ], [ "\033[1X\033[33X\033[0;-2YFirst example: Whitehead's certain exact sequence\ \033[133X\033[101X", "3.6-1", [ 3, 6, 1 ], 310, 41, "first example: whiteheads certain exact sequence", "X7B506CF27DE54DBE" ], [ "\033[1X\033[33X\033[0;-2YSecond example: the Hopf invariant\033[133X\033[1\ 01X", "3.6-2", [ 3, 6, 2 ], 341, 42, "second example: the hopf invariant", "X828F0FAB86AA60E9" ], [ "\033[1X\033[33X\033[0;-2YComputing the second homotopy group of a space wi\ th infinite fundamental group\033[133X\033[101X", "3.7", [ 3, 7, 0 ], 433, 43, "computing the second homotopy group of a space with infinite fundamenta\ l group", "X7EAF7E677FB9D53F" ], [ "\033[1X\033[33X\033[0;-2YThree Manifolds\033[133X\033[101X", "4", [ 4, 0, 0 ], 1, 45, "three manifolds", "X7BFA4D1587D8DF49" ], [ "\033[1X\033[33X\033[0;-2YDehn Surgery\033[133X\033[101X", "4.1", [ 4, 1, 0 ], 4, 45, "dehn surgery", "X82D1348C79238C2D" ], [ "\033[1X\033[33X\033[0;-2YConnected Sums\033[133X\033[101X", "4.2", [ 4, 2, 0 ], 49, 46, "connected sums", "X848EDEE882B36F6C" ], [ "\033[1X\033[33X\033[0;-2YDijkgraaf-Witten Invariant\033[133X\033[101X", "4.3", [ 4, 3, 0 ], 78, 46, "dijkgraaf-witten invariant", "X78AE684C7DBD7C70" ], [ "\033[1X\033[33X\033[0;-2YCohomology rings\033[133X\033[101X", "4.4", [ 4, 4, 0 ], 143, 47, "cohomology rings", "X80B6849C835B7F19" ], [ "\033[1X\033[33X\033[0;-2YLinking Form\033[133X\033[101X", "4.5", [ 4, 5, 0 ], 184, 48, "linking form", "X7F56BB4C801AB894" ], [ "\033[1X\033[33X\033[0;-2YDetermining the homeomorphism type of a lens spac\ e\033[133X\033[101X", "4.6", [ 4, 6, 0 ], 271, 49, "determining the homeomorphism type of a lens space", "X850C76697A6A1654" ], [ "\033[1X\033[33X\033[0;-2YSurgeries on distinct knots can yield homeomorphi\ c manifolds\033[133X\033[101X", "4.7", [ 4, 7, 0 ], 383, 51, "surgeries on distinct knots can yield homeomorphic manifolds", "X7EC6B008878CC77E" ], [ "\033[1X\033[33X\033[0;-2YFinite fundamental groups of \033[22X3\033[122X\\ 033[101X\027\033[1X\027-manifolds\033[133X\033[101X", "4.8", [ 4, 8, 0 ], 464, 52, "finite fundamental groups of 3-manifolds", "X7B425A3280A2AF07" ], [ "\033[1X\033[33X\033[0;-2YPoincare's cube manifolds\033[133X\033[101X", "4.9", [ 4, 9, 0 ], 500, 53, "poincares cube manifolds", "X78912D227D753167" ], [ "\033[1X\033[33X\033[0;-2YThere are at least 25 distinct cube manifolds\\ 033[133X\033[101X", "4.10", [ 4, 10, 0 ], 555, 54, "there are at least 25 distinct cube manifolds", "X8761051F84C6CEC2" ], [ "\033[1X\033[33X\033[0;-2YFace pairings for 25 distinct cube manifolds\033\ [133X\033[101X", "4.10-1", [ 4, 10, 1 ], 672, 56, "face pairings for 25 distinct cube manifolds", "X7D50795883E534A3" ], [ "\033[1X\033[33X\033[0;-2YPlatonic cube manifolds\033[133X\033[101X", "4.10-2", [ 4, 10, 2 ], 898, 60, "platonic cube manifolds", "X837811BB8181666E" ], [ "\033[1X\033[33X\033[0;-2YThere are at most 41 distinct cube manifolds\033[\ 133X\033[101X", "4.11", [ 4, 11, 0 ], 924, 60, "there are at most 41 distinct cube manifolds", "X8084A36082B26D86" ], [ "\033[1X\033[33X\033[0;-2YThere are precisely 18 orientable cube manifolds\ , of which 9 are spherical and 5 are euclidean\033[133X\033[101X", "4.12", [ 4, 12, 0 ], 1055, 62, "there are precisely 18 orientable cube manifolds of which 9 are spheric\ al and 5 are euclidean", "X7B63C22C80E53758" ], [ "\033[1X\033[33X\033[0;-2YCube manifolds with boundary\033[133X\033[101X", "4.13", [ 4, 13, 0 ], 1123, 64, "cube manifolds with boundary", "X796BF3817BD7F57D" ], [ "\033[1X\033[33X\033[0;-2YOctahedral manifolds\033[133X\033[101X", "4.14", [ 4, 14, 0 ], 1193, 65, "octahedral manifolds", "X7EC4359B7DF208B0" ], [ "\033[1X\033[33X\033[0;-2YDodecahedral manifolds\033[133X\033[101X", "4.15", [ 4, 15, 0 ], 1232, 65, "dodecahedral manifolds", "X85FFF9B97B7AD818" ], [ "\033[1X\033[33X\033[0;-2YPrism manifolds\033[133X\033[101X", "4.16", [ 4, 16, 0 ], 1281, 66, "prism manifolds", "X78B75E2E79FBCC54" ], [ "\033[1X\033[33X\033[0;-2YBipyramid manifolds\033[133X\033[101X", "4.17", [ 4, 17, 0 ], 1339, 67, "bipyramid manifolds", "X7F31DFDA846E8E75" ], [ "\033[1X\033[33X\033[0;-2YTopological data analysis\033[133X\033[101X", "5", [ 5, 0, 0 ], 1, 68, "topological data analysis", "X7B7E077887694A9F" ], [ "\033[1X\033[33X\033[0;-2YPersistent homology\033[133X\033[101X", "5.1", [ 5, 1, 0 ], 4, 68, "persistent homology", "X80A70B20873378E0" ], [ "\033[1X\033[33X\033[0;-2YBackground to the data\033[133X\033[101X", "5.1-1", [ 5, 1, 1 ], 66, 69, "background to the data", "X7D512DA37F789B4C" ], [ "\033[1X\033[33X\033[0;-2YMapper clustering\033[133X\033[101X", "5.2", [ 5, 2, 0 ], 73, 69, "mapper clustering", "X849556107A23FF7B" ], [ "\033[1X\033[33X\033[0;-2YBackground to the data\033[133X\033[101X", "5.2-1", [ 5, 2, 1 ], 117, 70, "background to the data", "X7D512DA37F789B4C" ], [ "\033[1X\033[33X\033[0;-2YSome tools for handling pure complexes\033[133X\\ 033[101X", "5.3", [ 5, 3, 0 ], 123, 70, "some tools for handling pure complexes", "X7BBDE0567DB8C5DA" ], [ "\033[1X\033[33X\033[0;-2YDigital image analysis and persistent homology\\ 033[133X\033[101X", "5.4", [ 5, 4, 0 ], 194, 71, "digital image analysis and persistent homology", "X79616D12822FDB9A" ], [ "\033[1X\033[33X\033[0;-2YNaive example of image segmentation by automatic\ thresholding\033[133X\033[101X", "5.4-1", [ 5, 4, 1 ], 222, 71, "naive example of image segmentation by automatic thresholding", "X8066F9B17B78418E" ], [ "\033[1X\033[33X\033[0;-2YRefining the filtration\033[133X\033[101X", "5.4-2", [ 5, 4, 2 ], 246, 72, "refining the filtration", "X7E6436E0856761F2" ], [ "\033[1X\033[33X\033[0;-2YBackground to the data\033[133X\033[101X", "5.4-3", [ 5, 4, 3 ], 270, 72, "background to the data", "X7D512DA37F789B4C" ], [ "\033[1X\033[33X\033[0;-2YA second example of digital image segmentation\\ 033[133X\033[101X", "5.5", [ 5, 5, 0 ], 275, 72, "a second example of digital image segmentation", "X7A8224DA7B00E0D9" ], [ "\033[1X\033[33X\033[0;-2YA third example of digital image segmentation\ \033[133X\033[101X", "5.6", [ 5, 6, 0 ], 327, 73, "a third example of digital image segmentation", "X8290E7D287F69B98" ], [ "\033[1X\033[33X\033[0;-2YNaive example of digital image contour extractio\ n\033[133X\033[101X", "5.7", [ 5, 7, 0 ], 371, 74, "naive example of digital image contour extraction", "X7957F329835373E9" ], [ "\033[1X\033[33X\033[0;-2YAlternative approaches to computing persistent ho\ mology\033[133X\033[101X", "5.8", [ 5, 8, 0 ], 456, 75, "alternative approaches to computing persistent homology", "X7D2CC9CB85DF1BAF" ], [ "\033[1X\033[33X\033[0;-2YNon-trivial cup product\033[133X\033[101X", "5.8-1", [ 5, 8, 1 ], 522, 76, "non-trivial cup product", "X86FD0A867EC9E64F" ], [ "\033[1X\033[33X\033[0;-2YExplicit homology generators\033[133X\033[101X", "5.8-2", [ 5, 8, 2 ], 539, 76, "explicit homology generators", "X783EF0F17B629C46" ], [ "\033[1X\033[33X\033[0;-2YKnotted proteins\033[133X\033[101X", "5.9", [ 5, 9, 0 ], 577, 77, "knotted proteins", "X80D0D8EB7BCD05E9" ], [ "\033[1X\033[33X\033[0;-2YRandom simplicial complexes\033[133X\033[101X", "5.10", [ 5, 10, 0 ], 656, 78, "random simplicial complexes", "X87AF06677F05C624" ], [ "\033[1X\033[33X\033[0;-2YComputing homology of a clique complex (Vietoris-\ Rips complex)\033[133X\033[101X", "5.11", [ 5, 11, 0 ], 759, 80, "computing homology of a clique complex vietoris-rips complex", "X875EE92F7DBA1E27" ], [ "\033[1X\033[33X\033[0;-2YGroup theoretic computations\033[133X\033[101X", "6", [ 6, 0, 0 ], 1, 82, "group theoretic computations", "X7C07F4BD8466991A" ], [ "\033[1X\033[33X\033[0;-2YThird homotopy group of a supsension of an Eilenb\ erg-MacLane space\033[133X\033[101X", "6.1", [ 6, 1, 0 ], 4, 82, "third homotopy group of a supsension of an eilenberg-maclane space", "X86D7FBBD7E5287C9" ], [ "\033[1X\033[33X\033[0;-2YRepresentations of knot quandles\033[133X\033[101\ X", "6.2", [ 6, 2, 0 ], 23, 82, "representations of knot quandles", "X803FDFFE78A08446" ], [ "\033[1X\033[33X\033[0;-2YIdentifying knots\033[133X\033[101X", "6.3", [ 6, 3, 0 ], 62, 83, "identifying knots", "X7E4EFB987DA22017" ], [ "\033[1X\033[33X\033[0;-2YAspherical \033[22X2\033[122X\033[101X\027\033[1X\ \027-complexes\033[133X\033[101X", "6.4", [ 6, 4, 0 ], 80, 83, "aspherical 2-complexes", "X8664E986873195E6" ], [ "\033[1X\033[33X\033[0;-2YGroup presentations and homotopical syzygies\033[\ 133X\033[101X", "6.5", [ 6, 5, 0 ], 102, 83, "group presentations and homotopical syzygies", "X84C0CB8B7C21E179" ], [ "\033[1X\033[33X\033[0;-2YBogomolov multiplier\033[133X\033[101X", "6.6", [ 6, 6, 0 ], 186, 85, "bogomolov multiplier", "X7F719758856A443D" ], [ "\033[1X\033[33X\033[0;-2YSecond group cohomology and group extensions\033[\ 133X\033[101X", "6.7", [ 6, 7, 0 ], 205, 85, "second group cohomology and group extensions", "X8333413B838D787D" ], [ "\033[1X\033[33X\033[0;-2YCocyclic groups: a convenient way of representin\ g certain groups\033[133X\033[101X", "6.8", [ 6, 8, 0 ], 350, 88, "cocyclic groups: a convenient way of representing certain groups", "X7F04FA5E81FFA848" ], [ "\033[1X\033[33X\033[0;-2YEffective group presentations\033[133X\033[101X" , "6.9", [ 6, 9, 0 ], 446, 89, "effective group presentations", "X863080FE8270468D" ], [ "\033[1X\033[33X\033[0;-2YSecond group cohomology and cocyclic Hadamard mat\ rices\033[133X\033[101X", "6.10", [ 6, 10, 0 ], 533, 91, "second group cohomology and cocyclic hadamard matrices", "X7C60E2B578074532" ], [ "\033[1X\033[33X\033[0;-2YThird group cohomology and homotopy \033[22X2\\ 033[122X\033[101X\027\033[1X\027-types\033[133X\033[101X", "6.11", [ 6, 11, 0 ], 556, 91, "third group cohomology and homotopy 2-types", "X78040D8580D35D53" ], [ "\033[1X\033[33X\033[0;-2YCohomology of groups (and Lie Algebras)\033[133X\\ 033[101X", "7", [ 7, 0, 0 ], 1, 94, "cohomology of groups and lie algebras", "X787E37187B7308C9" ], [ "\033[1X\033[33X\033[0;-2YFinite groups\033[133X\033[101X", "7.1", [ 7, 1, 0 ], 4, 94, "finite groups", "X807B265978F90E01" ], [ "\033[1X\033[33X\033[0;-2YNaive homology computation for a very small group\ \033[133X\033[101X", "7.1-1", [ 7, 1, 1 ], 7, 94, "naive homology computation for a very small group", "X80A721AC7A8D30A3" ], [ "\033[1X\033[33X\033[0;-2YA more efficient homology computation\033[133X\\ 033[101X", "7.1-2", [ 7, 1, 2 ], 66, 95, "a more efficient homology computation", "X838CEA3F850DFC82" ], [ "\033[1X\033[33X\033[0;-2YComputation of an induced homology homomorphism\\ 033[133X\033[101X", "7.1-3", [ 7, 1, 3 ], 89, 95, "computation of an induced homology homomorphism", "X842E93467AD09EC1" ] , [ "\033[1X\033[33X\033[0;-2YSome other finite group homology computations\\ 033[133X\033[101X", "7.1-4", [ 7, 1, 4 ], 117, 96, "some other finite group homology computations", "X8754D2937E6FD7CE" ], [ "\033[1X\033[33X\033[0;-2YNilpotent groups\033[133X\033[101X", "7.2", [ 7, 2, 0 ], 236, 97, "nilpotent groups", "X8463EF6A821FFB69" ], [ "\033[1X\033[33X\033[0;-2YCrystallographic and Almost Crystallographic grou\ ps\033[133X\033[101X", "7.3", [ 7, 3, 0 ], 255, 98, "crystallographic and almost crystallographic groups", "X82E8FAC67BC16C01" ], [ "\033[1X\033[33X\033[0;-2YArithmetic groups\033[133X\033[101X", "7.4", [ 7, 4, 0 ], 284, 98, "arithmetic groups", "X7AFFB32587D047FE" ], [ "\033[1X\033[33X\033[0;-2YArtin groups\033[133X\033[101X", "7.5", [ 7, 5, 0 ], 301, 98, "artin groups", "X800CB6257DC8FB3A" ], [ "\033[1X\033[33X\033[0;-2YGraphs of groups\033[133X\033[101X", "7.6", [ 7, 6, 0 ], 345, 99, "graphs of groups", "X7BAFCA3680E478AE" ], [ "\033[1X\033[33X\033[0;-2YLie algebra homology and free nilpotent groups\\ 033[133X\033[101X", "7.7", [ 7, 7, 0 ], 374, 100, "lie algebra homology and free nilpotent groups", "X7CE849E58706796C" ], [ "\033[1X\033[33X\033[0;-2YCohomology with coefficients in a module\033[133\ X\033[101X", "7.8", [ 7, 8, 0 ], 446, 101, "cohomology with coefficients in a module", "X7C3DEDD57BB4D537" ], [ "\033[1X\033[33X\033[0;-2YCohomology as a functor of the first variable\\ 033[133X\033[101X", "7.9", [ 7, 9, 0 ], 615, 103, "cohomology as a functor of the first variable", "X7E573EA582CCEF2E" ], [ "\033[1X\033[33X\033[0;-2YCohomology as a functor of the second variable a\ nd the long exact coefficient sequence\033[133X\033[101X", "7.10", [ 7, 10, 0 ], 647, 104, "cohomology as a functor of the second variable and the long exact coeff\ icient sequence", "X796731727A7EBE59" ], [ "\033[1X\033[33X\033[0;-2YTransfer Homomorphism\033[133X\033[101X", "7.11", [ 7, 11, 0 ], 727, 105, "transfer homomorphism", "X80F6FD3E7C7E4E8D" ], [ "\033[1X\033[33X\033[0;-2YCohomology rings of finite fundamental groups of \ 3-manifolds\033[133X\033[101X", "7.12", [ 7, 12, 0 ], 760, 106, "cohomology rings of finite fundamental groups of 3-manifolds", "X79B1406C803FF178" ], [ "\033[1X\033[33X\033[0;-2YExplicit cocycles\033[133X\033[101X", "7.13", [ 7, 13, 0 ], 876, 108, "explicit cocycles", "X833A19F0791C3B06" ], [ "\033[1X\033[33X\033[0;-2YQuillen's complex and the \033[22Xp\033[122X\033[\ 101X\027\033[1X\027-part of homology\033[133X\033[101X", "7.14", [ 7, 14, 0 ], 1062, 111, "quillens complex and the p-part of homology", "X7C5233E27D2D603E" ], [ "\033[1X\033[33X\033[0;-2YHomology of a Lie algebra\033[133X\033[101X", "7.15", [ 7, 15, 0 ], 1266, 114, "homology of a lie algebra", "X865CC8E0794C0E61" ], [ "\033[1X\033[33X\033[0;-2YCovers of Lie algebras\033[133X\033[101X", "7.16", [ 7, 16, 0 ], 1308, 114, "covers of lie algebras", "X86B4EE4783A244F7" ], [ "\033[1X\033[33X\033[0;-2YComputing a cover\033[133X\033[101X", "7.16-1", [ 7, 16, 1 ], 1332, 115, "computing a cover", "X7DFF32A67FF39C82" ], [ "\033[1X\033[33X\033[0;-2YCohomology rings and Steenrod operations for grou\ ps\033[133X\033[101X", "8", [ 8, 0, 0 ], 1, 116, "cohomology 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"X780DF87680C3F52B" ], [ "\033[1X\033[33X\033[0;-2YTesting homomorphism properties\033[133X\033[101X\ ", "8.3-1", [ 8, 3, 1 ], 237, 120, "testing homomorphism properties", "X834CED9D7A104695" ], [ "\033[1X\033[33X\033[0;-2YTesting functorial properties\033[133X\033[101X" , "8.3-2", [ 8, 3, 2 ], 254, 120, "testing functorial properties", "X7A0D505D844F0CD4" ], [ "\033[1X\033[33X\033[0;-2YComputing with larger groups\033[133X\033[101X", "8.3-3", [ 8, 3, 3 ], 290, 121, "computing with larger groups", "X855764877FA44225" ], [ "\033[1X\033[33X\033[0;-2YSteenrod operations for finite \033[22X2\033[122X\ \033[101X\027\033[1X\027-groups\033[133X\033[101X", "8.4", [ 8, 4, 0 ], 343, 122, "steenrod operations for finite 2-groups", "X80114B0483EF9A67" ], [ "\033[1X\033[33X\033[0;-2YSteenrod operations on the classifying space of \ a finite \033[22Xp\033[122X\033[101X\027\033[1X\027-group\033[133X\033[101X", "8.5", [ 8, 5, 0 ], 425, 123, "steenrod operations on the classifying space of a finite p-group", "X7D5ACA56870A40E9" ], [ "\033[1X\033[33X\033[0;-2YMod-\033[22Xp\033[122X\033[101X\027\033[1X\027 co\ homology rings of crystallographic groups\033[133X\033[101X", "8.6", [ 8, 6, 0 ], 443, 123, "mod-p cohomology rings of crystallographic groups", "X7D2D26C0784A0E14" ], [ "\033[1X\033[33X\033[0;-2YPoincare series for crystallographic groups\033[1\ 33X\033[101X", "8.6-1", [ 8, 6, 1 ], 453, 123, "poincare series for crystallographic groups", "X81C107C07CF02F0E" ], [ "\033[1X\033[33X\033[0;-2YMod \033[22X2\033[122X\033[101X\027\033[1X\027 co\ homology rings of \033[22X3\033[122X\033[101X\027\033[1X\027-dimensional cryst\ allographic groups\033[133X\033[101X", "8.6-2", [ 8, 6, 2 ], 519, 125, "mod 2 cohomology rings of 3-dimensional crystallographic groups", "X7F5C242F7BC938A5" ], [ "\033[1X\033[33X\033[0;-2YBredon homology\033[133X\033[101X", "9", [ 9, 0, 0 ], 1, 127, "bredon homology", "X786DB80A8693779E" ], [ "\033[1X\033[33X\033[0;-2YDavis complex\033[133X\033[101X", "9.1", [ 9, 1, 0 ], 4, 127, "davis complex", "X7B0212F97F3D442A" ], [ "\033[1X\033[33X\033[0;-2YArithmetic groups\033[133X\033[101X", "9.2", [ 9, 2, 0 ], 28, 127, "arithmetic groups", "X7AFFB32587D047FE" ], [ "\033[1X\033[33X\033[0;-2YCrystallographic groups\033[133X\033[101X", "9.3", [ 9, 3, 0 ], 55, 128, "crystallographic groups", "X7DEBF2BB7D1FB144" ], [ "\033[1X\033[33X\033[0;-2YChain Complexes\033[133X\033[101X", "10", [ 10, 0, 0 ], 1, 129, "chain complexes", "X7A06103979B92808" ], [ "\033[1X\033[33X\033[0;-2YChain complex of a simplicial complex and simplic\ ial pair\033[133X\033[101X", "10.1", [ 10, 1, 0 ], 24, 129, "chain complex of a simplicial complex and simplicial pair", "X782DE78884DD6992" ], [ "\033[1X\033[33X\033[0;-2YChain complex of a cubical complex and cubical pa\ ir\033[133X\033[101X", "10.2", [ 10, 2, 0 ], 91, 130, "chain complex of a cubical complex and cubical pair", "X79E7A13E7DE9C412" ], [ "\033[1X\033[33X\033[0;-2YChain complex of a regular CW-complex\033[133X\\ 033[101X", "10.3", [ 10, 3, 0 ], 140, 131, "chain complex of a regular cw-complex", "X86C38E87817F2EAD" ], [ "\033[1X\033[33X\033[0;-2YChain Maps of simplicial and regular CW maps\033[\ 133X\033[101X", "10.4", [ 10, 4, 0 ], 180, 132, "chain maps of simplicial and regular cw maps", "X7F9662EF83A1FA76" ], [ "\033[1X\033[33X\033[0;-2YConstructions for chain complexes\033[133X\033[1\ 01X", "10.5", [ 10, 5, 0 ], 215, 132, "constructions for chain complexes", "X8127E17383F45359" ], [ "\033[1X\033[33X\033[0;-2YFiltered chain complexes\033[133X\033[101X", "10.6", [ 10, 6, 0 ], 256, 133, "filtered chain complexes", "X7AAAB26682CD8AC4" ], [ "\033[1X\033[33X\033[0;-2YSparse chain complexes\033[133X\033[101X", "10.7", [ 10, 7, 0 ], 297, 134, "sparse chain complexes", "X856F202D823280F8" ], [ "\033[1X\033[33X\033[0;-2YResolutions\033[133X\033[101X", "11", [ 11, 0, 0 ], 1, 136, "resolutions", "X7C0B125E7D5415B4" ], [ "\033[1X\033[33X\033[0;-2YResolutions for small finite groups\033[133X\033[\ 101X", 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selected groups \033[22XG=SL_2( m\ athcal O( Q(sqrtd) )\033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "11.16", [ 11, 16, 0 ], 558, 145, "resolutions for selected groups g=sl_2 mathcal o q sqrtd", "X7BE4DE82801CD38E" ], [ "\033[1X\033[33X\033[0;-2YResolutions for selected groups \033[22XG=PSL_2( \ mathcal O( Q(sqrtd) )\033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "11.17", [ 11, 17, 0 ], 577, 145, "resolutions for selected groups g=psl_2 mathcal o q sqrtd", "X7D9CCB2C7DAA2310" ], [ "\033[1X\033[33X\033[0;-2YResolutions for a few higher-dimensional arithmet\ ic groups\033[133X\033[101X", "11.18", [ 11, 18, 0 ], 596, 146, "resolutions for a few higher-dimensional arithmetic groups", "X7F699587845E6DB1" ], [ "\033[1X\033[33X\033[0;-2YResolutions for finite-index subgroups\033[133X\\ 033[101X", "11.19", [ 11, 19, 0 ], 618, 146, "resolutions for finite-index subgroups", "X7812EB3F7AC45F87" ], [ "\033[1X\033[33X\033[0;-2YSimplifying resolutions\033[133X\033[101X", "11.20", [ 11, 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"\033[1X\033[33X\033[0;-2YIdentifying crossed modules of low order\033[133X\ \033[101X", "12.11", [ 12, 11, 0 ], 688, 159, "identifying crossed modules of low order", "X7F386CF078CB9A20" ], [ "\033[1X\033[33X\033[0;-2YCongruence Subgroups, Cuspidal Cohomology and Hec\ ke Operators\033[133X\033[101X", "13", [ 13, 0, 0 ], 1, 161, "congruence subgroups cuspidal cohomology and hecke operators", "X86D5DB887ACB1661" ], [ "\033[1X\033[33X\033[0;-2YEichler-Shimura isomorphism\033[133X\033[101X", "13.1", [ 13, 1, 0 ], 12, 161, "eichler-shimura isomorphism", "X79A1974B7B4987DE" ], [ "\033[1X\033[33X\033[0;-2YGenerators for \033[22XSL_2( Z)\033[122X\033[101X\ \027\033[1X\027 and the cubic tree\033[133X\033[101X", "13.2", [ 13, 2, 0 ], 87, 162, "generators for sl_2 z and the cubic tree", "X7BFA2C91868255D9" ], [ "\033[1X\033[33X\033[0;-2YOne-dimensional fundamental domains and generator\ s for congruence subgroups\033[133X\033[101X", "13.3", [ 13, 3, 0 ], 128, 163, "one-dimensional fundamental domains and generators for congruence subgr\ oups", "X7D1A56967A073A8B" ], [ "\033[1X\033[33X\033[0;-2YCohomology of congruence subgroups\033[133X\033[1\ 01X", "13.4", [ 13, 4, 0 ], 231, 164, "cohomology of congruence subgroups", "X818BFA9A826C0DB3" ], [ "\033[1X\033[33X\033[0;-2YCohomology with rational coefficients\033[133X\\ 033[101X", "13.4-1", [ 13, 4, 1 ], 327, 166, "cohomology with rational coefficients", "X7F55F8EA82FE9122" ], [ "\033[1X\033[33X\033[0;-2YCuspidal cohomology\033[133X\033[101X", "13.5", [ 13, 5, 0 ], 361, 166, "cuspidal cohomology", "X84D30F1580CD42D1" ], [ "\033[1X\033[33X\033[0;-2YHecke operators on forms of weight 2\033[133X\\ 033[101X", "13.6", [ 13, 6, 0 ], 464, 168, "hecke operators on forms of weight 2", "X80861D3F87C29C43" ], [ "\033[1X\033[33X\033[0;-2YHecke operators on forms of weight \033[22X\342\\ 211\245 2\033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "13.7", [ 13, 7, 0 ], 534, 169, "hecke operators on forms of weight a\211\246 2" , "X831BB0897B988DA3" ], [ "\033[1X\033[33X\033[0;-2YReconstructing modular forms from cohomology comp\ utations\033[133X\033[101X", "13.8", [ 13, 8, 0 ], 552, 169, "reconstructing modular forms from cohomology computations", "X84CC51EE8525E0D9" ], [ "\033[1X\033[33X\033[0;-2YThe Picard group\033[133X\033[101X", "13.9", [ 13, 9, 0 ], 683, 171, "the picard group", "X8180E53C834301EF" ], [ "\033[1X\033[33X\033[0;-2YBianchi groups\033[133X\033[101X", "13.10", [ 13, 10, 0 ], 819, 172, "bianchi groups", "X858B1B5D8506FE81" ], [ "\033[1X\033[33X\033[0;-2Y(Co)homology of Bianchi groups and \033[22XSL_2(c\ al O_-d)\033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "13.11", [ 13, 11, 0 ], 959, 174, "co homology of bianchi groups and sl_2 cal o_-d", "X851390E07C3B3BB1" ] , [ "\033[1X\033[33X\033[0;-2YSome other infinite matrix groups\033[133X\033[10\ 1X", "13.12", [ 13, 12, 0 ], 1218, 179, "some other infinite matrix groups", "X86A6858884B9C05B" ], [ "\033[1X\033[33X\033[0;-2YIdeals and finite quotient groups\033[133X\033[10\ 1X", "13.13", [ 13, 13, 0 ], 1330, 181, "ideals and finite quotient groups", "X7EF5D97281EB66DA" ], [ "\033[1X\033[33X\033[0;-2YCongruence subgroups for ideals\033[133X\033[101X\ ", "13.14", [ 13, 14, 0 ], 1442, 182, "congruence subgroups for ideals", "X7D1F72287F14C5E1" ], [ "\033[1X\033[33X\033[0;-2YFirst homology\033[133X\033[101X", "13.15", [ 13, 15, 0 ], 1514, 183, "first homology", "X85E912617AFE03F4" ], [ "\033[1X\033[33X\033[0;-2YFundamental domains for Bianchi groups\033[133X\\ 033[101X", "14", [ 14, 0, 0 ], 1, 186, "fundamental domains for bianchi groups", "X805848868005D528" ], [ "\033[1X\033[33X\033[0;-2YBianchi groups\033[133X\033[101X", "14.1", [ 14, 1, 0 ], 4, 186, "bianchi groups", "X858B1B5D8506FE81" ], [ "\033[1X\033[33X\033[0;-2YSwan's description of a fundamental domain\033[13\ 3X\033[101X", "14.2", [ 14, 2, 0 ], 51, 186, "swans description of a fundamental domain", "X872D22507F797001" ], [ "\033[1X\033[33X\033[0;-2YComputing a fundamental domain\033[133X\033[101X" , "14.3", [ 14, 3, 0 ], 69, 187, "computing a fundamental domain", "X7B9DE54F7ECB7E44" ], [ "\033[1X\033[33X\033[0;-2YExamples\033[133X\033[101X", "14.4", [ 14, 4, 0 ], 100, 187, "examples", "X7A489A5D79DA9E5C" ], [ "\033[1X\033[33X\033[0;-2YEstablishing correctness of a fundamental domain\\ 033[133X\033[101X", "14.5", [ 14, 5, 0 ], 183, 188, "establishing correctness of a fundamental domain", "X86CD59CB7A04EE5A" ], [ "\033[1X\033[33X\033[0;-2YComputing a free resolution for \033[22XSL_2(math\ cal O_-d)\033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "14.6", [ 14, 6, 0 ], 227, 189, "computing a free resolution for sl_2 mathcal o_-d", "X78476F127B73BBD1" ], [ "\033[1X\033[33X\033[0;-2YSome sanity checks\033[133X\033[101X", "14.7", [ 14, 7, 0 ], 284, 190, "some sanity checks", "X784B2156823AEB15" ], [ "\033[1X\033[33X\033[0;-2YEquivariant Euler characteristic\033[133X\033[101\ X", "14.7-1", [ 14, 7, 1 ], 291, 190, "equivariant euler characteristic", "X7E5A36D47F9D4A47" ], [ "\033[1X\033[33X\033[0;-2YBoundary squares to zero\033[133X\033[101X", "14.7-2", [ 14, 7, 2 ], 323, 191, "boundary squares to zero", "X852CDAFF84C5DF01" ], [ "\033[1X\033[33X\033[0;-2YCompare different algorithms or implementations\\ 033[133X\033[101X", "14.7-3", [ 14, 7, 3 ], 352, 191, "compare different algorithms or implementations", "X7E64819A7C058EDD" ] , [ "\033[1X\033[33X\033[0;-2YCompare geometry to algebra\033[133X\033[101X", "14.7-4", [ 14, 7, 4 ], 383, 192, "compare geometry to algebra", "X8223864085412705" ], [ "\033[1X\033[33X\033[0;-2YGroup presentations\033[133X\033[101X", "14.8", [ 14, 8, 0 ], 422, 192, "group presentations", "X78BC9D077956089A" ], [ "\033[1X\033[33X\033[0;-2YFinite index subgroups\033[133X\033[101X", "14.9", [ 14, 9, 0 ], 464, 193, "finite index subgroups", "X786CFAA17C0A6E7A" ], [ "\033[1X\033[33X\033[0;-2YParallel computation\033[133X\033[101X", "15", [ 15, 0, 0 ], 1, 195, "parallel computation", "X7F571E8F7BBC7514" ], [ "\033[1X\033[33X\033[0;-2YAn embarassingly parallel computation\033[133X\\ 033[101X", "15.1", [ 15, 1, 0 ], 4, 195, "an embarassingly parallel computation", "X7EAE286B837D27BA" ], [ "\033[1X\033[33X\033[0;-2YA non-embarassingly parallel computation\033[133X\ \033[101X", "15.2", [ 15, 2, 0 ], 40, 195, "a non-embarassingly parallel computation", "X80F359DD7C54D405" ], [ "\033[1X\033[33X\033[0;-2YParallel persistent homology\033[133X\033[101X", "15.3", [ 15, 3, 0 ], 108, 197, "parallel persistent homology", "X8496786F7FCEC24A" ], [ "\033[1X\033[33X\033[0;-2YRegular CW-structure on knots (written by Kelvin \ Killeen)\033[133X\033[101X", "16", [ 16, 0, 0 ], 1, 198, "regular cw-structure on knots written by kelvin killeen", "X7C57D4AB8232983E" ], [ "\033[1X\033[33X\033[0;-2YKnot complements in the 3-ball\033[133X\033[101X" , "16.1", [ 16, 1, 0 ], 4, 198, "knot complements in the 3-ball", "X86F56A85848347FF" ], [ "\033[1X\033[33X\033[0;-2YTubular neighbourhoods\033[133X\033[101X", "16.2", [ 16, 2, 0 ], 93, 199, "tubular neighbourhoods", "X83EA2A38801E7A4C" ], [ "\033[1X\033[33X\033[0;-2YKnotted surface complements in the 4-ball\033[133\ X\033[101X", "16.3", [ 16, 3, 0 ], 265, 202, "knotted surface complements in the 4-ball", "X78C28038837300BD" ], [ "Bibliography", "bib", [ "Bib", 0, 0 ], 1, 209, "bibliography", "X7A6F98FD85F02BFE" ], [ "References", "bib", [ "Bib", 0, 0 ], 1, 209, "references", "X7A6F98FD85F02BFE" ], [ "Index", "ind", [ "Ind", 0, 0 ], 1, 213, "index", "X83A0356F839C696F" ] ] ); [ Dauer der Verarbeitung: 0.16 Sekunden (vorverarbeitet) ] |
2026-03-28