#SIXFORMAT GapDocGAP HELPBOOKINFOSIXTMP := rec( encoding := "UTF-8", bookname := "HAPprime", entries := [ [ "Title page", "", [ 0, 0, 0 ], 1, 1, "title page", "X7D2C85EC87DD46E5" ], [ "Copyright", "-1", [ 0, 0, 1 ], 30, 2, "copyright", "X81488B807F2A1CF1" ], [ "Acknowledgements", "-2", [ 0, 0, 2 ], 56, 2, "acknowledgements", "X82A988D47DFAFCFA" ], [ "Table of Contents", "-3", [ 0, 0, 3 ], 62, 3, "table of contents", "X8537FEB07AF2BEC8" ], [ "\033[1XIntroduction\033[0X", "1", [ 1, 0, 0 ], 1, 4, "introduction", "X7DFB63A97E67C0A1" ], [ "\033[1XIntroduction to the \033[5XHAPprime\033[1X package\033[0X", "1.1", [ 1, 1, 0 ], 4, 4, "introduction to the happrime package", "X7EC1C3E779AE8717" ], [ "\033[1XRequired software\033[0X", "1.2", [ 1, 2, 0 ], 31, 4, "required software", "X7D20BAAF862B41E9" ], [ "\033[1XInstalling \033[5XHAPprime\033[1X\033[0X", "1.3", [ 1, 3, 0 ], 39, 4, "installing happrime", "X7CFA390D7DE91268" ], [ "\033[1XLoading and testing \033[5XHAPprime\033[1X\033[0X", "1.4", [ 1, 4, 0 ], 48, 5, "loading and testing happrime", "X84983C5A84213019" ], [ "\033[1XDocumentation\033[0X", "1.5", [ 1, 5, 0 ], 84, 5, "documentation", "X7F4F8D6F7CD6B765" ], [ "\033[1XDisplaying progress and calculation information\033[0X", "1.6", [ 1, 6, 0 ], 125, 6, "displaying progress and calculation information", "X845E795E8537ABBA" ], [ "\033[1XExamples\033[0X", "2", [ 2, 0, 0 ], 1, 7, "examples", "X7A489A5D79DA9E5C" ], [ "\033[1XComputing the mod p group cohomology\033[0X", "2.1", [ 2, 1, 0 ], 4, 7, "computing the mod p group cohomology", "X81FB934A87FCAA22" ], [ "\033[1XComputing mod-p cohomology rings and their Poincar\303\251 series\ \033[0X", "2.2", [ 2, 2, 0 ], 87, 8, "computing mod-p cohomology rings and their poincara\251 series", "X78EE4D0386321E3B" ], [ "\033[1XA ring presentation for the mod p cohomology (up to degree n)\033[\ 0X", "2.2-1", [ 2, 2, 1 ], 110, 8, "a ring presentation for the mod p cohomology up to degree n", "X81BCBAA18423E1C8" ], [ "\033[1XCalculating a provably-correct mod-p cohomology\033[0X", "2.2-2", [ 2, 2, 2 ], 168, 9, "calculating a provably-correct mod-p cohomology", "X825971A27C00C1B6" ], [ "\033[1XComputing Poincar\303\251 series\033[0X", "2.2-3", [ 2, 2, 3 ], 249, 11, "computing poincara\251 series", "X78F3639083A7DE62" ], [ "\033[1XComparing the memory usage and speed of \033[5XHAPprime\033[1X and\ \033[5XHAP\033[1X's\033[0X \033[1X\033[9XResolutionPrimePowerGroup\033[1X fun\ ctions\033[0X", "2.3", [ 2, 3, 0 ], 305, 12, "comparing the memory usage and speed of happrime and haps resolutionpri\ mepowergroup functions", "X87AD96A584D60140" ], [ "\033[1X\033[5XHAPprime\033[1X takes less memory to store resolutions\033[\ 0X", "2.3-1", [ 2, 3, 1 ], 328, 12, "happrime takes less memory to store resolutions", "X85FFD31A7B362DFF" ] , [ "\033[1X\033[5XHAPprime\033[1X takes less memory to compute resolutions\ \033[0X", "2.3-2", [ 2, 3, 2 ], 404, 13, "happrime takes less memory to compute resolutions", "X848CF4C483C3F6E4" ], [ "\033[1XAutomatic selection of the best method\033[0X", "2.3-3", [ 2, 3, 3 ], 447, 14, "automatic selection of the best method", "X7CA386948072CFF4" ], [ "\033[1XFunctions for Homological Algebra\033[0X", "3", [ 3, 0, 0 ], 1, 16, "functions for homological algebra", "X7EE4339B83BFDA2D" ], [ "\033[1XResolutions\033[0X", "3.1", [ 3, 1, 0 ], 4, 16, "resolutions", "X7C0B125E7D5415B4" ], [ "\033[1XResolutionPrimePowerGroup\033[0X", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroup", "X86934BE9858F7199" ], [ "\033[1XExtendResolutionPrimePowerGroup\033[0X", "3.1-2", [ 3, 1, 2 ], 59, 17, "extendresolutionprimepowergroup", "X7B435C307F28D44F" ], [ "\033[1XPoincar\303\251 Series\033[0X", "3.2", [ 3, 2, 0 ], 73, 17, "poincara\251 series", "X7FF2605B79D7B5F8" ], [ "\033[1XCohomology Ring structure\033[0X", "3.3", [ 3, 3, 0 ], 93, 17, "cohomology ring structure", "X7A9561E47A4994F5" ], [ "Index", "ind", [ "Ind", 0, 0 ], 1, 19, "index", "X83A0356F839C696F" ], [ "\033[2XMakeHAPprimeDoc\033[0X", "1.5-1", [ 1, 5, 1 ], 94, 5, "makehapprimedoc", "X80F4100D783E407A" ], [ "\033[2XInfoHAPprime\033[0X", "1.6-1", [ 1, 6, 1 ], 135, 6, "infohapprime", "X80E9D70E843A8C2C" ], [ "\033[2XResolutionPrimePowerGroupRadical\033[0X (for group)", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroupradical for group", "X86934BE9858F7199" ], [ "\033[2XResolutionPrimePowerGroupGF\033[0X (for group)", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroupgf for group", "X86934BE9858F7199" ], [ "\033[2XResolutionPrimePowerGroupAutoMem\033[0X (for group)", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroupautomem for group", "X86934BE9858F7199" ], [ "\033[2XResolutionPrimePowerGroupGF2\033[0X (for group)", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroupgf2 for group", "X86934BE9858F7199" ], [ "\033[2XResolutionPrimePowerGroupRadical\033[0X (for module)", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroupradical for module", "X86934BE9858F7199" ], [ "\033[2XResolutionPrimePowerGroupGF\033[0X (for module)", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroupgf for module", "X86934BE9858F7199" ], [ "\033[2XResolutionPrimePowerGroupAutoMem\033[0X (for module)", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroupautomem for module", "X86934BE9858F7199" ], [ "\033[2XResolutionPrimePowerGroupGF2\033[0X (for module)", "3.1-1", [ 3, 1, 1 ], 7, 16, "resolutionprimepowergroupgf2 for module", "X86934BE9858F7199" ], [ "\033[2XExtendResolutionPrimePowerGroupRadical\033[0X", "3.1-2", [ 3, 1, 2 ], 59, 17, "extendresolutionprimepowergroupradical", "X7B435C307F28D44F" ], [ "\033[2XExtendResolutionPrimePowerGroupGF\033[0X", "3.1-2", [ 3, 1, 2 ], 59, 17, "extendresolutionprimepowergroupgf", "X7B435C307F28D44F" ], [ "\033[2XExtendResolutionPrimePowerGroupAutoMem\033[0X", "3.1-2", [ 3, 1, 2 ], 59, 17, "extendresolutionprimepowergroupautomem", "X7B435C307F28D44F" ], [ "\033[2XExtendResolutionPrimePowerGroupGF2\033[0X", "3.1-2", [ 3, 1, 2 ], 59, 17, "extendresolutionprimepowergroupgf2", "X7B435C307F28D44F" ], [ "\033[2XPoincareSeriesLHS\033[0X", "3.2-1", [ 3, 2, 1 ], 76, 17, "poincareserieslhs", "X7E1A4C8781A02CD0" ], [ "\033[2XModPCohomologyRingPresentation\033[0X (for group)", "3.3-1", [ 3, 3, 1 ], 96, 17, "modpcohomologyringpresentation for group", "X85CFF2AB7A7A99D2" ], [ "\033[2XModPCohomologyRingPresentation\033[0X (for group and degree)", "3.3-1", [ 3, 3, 1 ], 96, 17, "modpcohomologyringpresentation for group and degree", "X85CFF2AB7A7A99D2" ], [ "\033[2XModPCohomologyRingPresentation\033[0X (for resolution)", "3.3-1", [ 3, 3, 1 ], 96, 17, "modpcohomologyringpresentation for resolution", "X85CFF2AB7A7A99D2" ], [ "\033[2XModPCohomologyRingPresentation\033[0X (for algebra)", "3.3-1", [ 3, 3, 1 ], 96, 17, "modpcohomologyringpresentation for algebra", "X85CFF2AB7A7A99D2" ] ] );