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<html><head><title>ModIsom : a GAP 4 package - Index </title></head>
<body text="#000000" bgcolor="#ffffff"> <h1><font face="Gill Sans,Helvetica,Arial">ModIsom</font> : a <font face="Gill Sans,Helvetic <p> <a href="#idxA">A</A> <a href="#idxB">B</A> <a href="#idxC">C</A> <a href="#idxD">D</A> <a href="#idxE">E</A> <a href="#idxG">G</A> <a href="#idxI">I</A> <a href="#idxJ">J</A> <a href="#idxK">K</A> <a href="#idxM">M</A> <a href="#idxN">N</A> <a href="#idxR">R</A> <a href="#idxS">S</A> <a href="#idxT">T</A> <H2><A NAME="idxA">A</A></H2> <dl> <dt>A Library of Kurosh Algebras <a href="CHAP006.htm#SECT002">6.2</a> <dt>AlgebraByTable <a href="CHAP002.htm#SSEC002.1">2.2.1</a> <dt>Algebras in the GAP sense <a href="CHAP002.htm#SECT002">2.2</a> <dt>AutGroupOfRad <a href="CHAP003.htm#SSEC001.1">3.1.1</a> <dt>AutGroupOfTable <a href="CHAP003.htm#SSEC001.1">3.1.1</a> <dt>Automorphism groups <a href="CHAP003.htm#SECT001">3.1</a> <dt>Automorphism groups and Canonical Forms <a href="CHAP003.htm">3.0</a> </dl><p> <H2><A NAME="idxB">B</A></H2> <dl> <dt>BaginskiCarantiInfo <a href="CHAP004.htm#SSEC003.7">4.3.7</a> <dt>BaginskiInfo <a href="CHAP004.htm#SSEC003.6">4.3.6</a> <dt>BinsByGT <a href="CHAP004.htm#SSEC001.1">4.1.1</a> <dt>BinsByGTAllFields <a href="CHAP004.htm#SSEC001.4">4.1.4</a> </dl><p> <H2><A NAME="idxC">C</A></H2> <dl> <dt>CanoFormWithAutGroupOfRad <a href="CHAP003.htm#SSEC002.2">3.2.2</a> <dt>CanoFormWithAutGroupOfTable <a href="CHAP003.htm#SSEC002.2">3.2.2</a> <dt>Canonical forms <a href="CHAP003.htm#SECT002">3.2</a> <dt>CanonicalFormOfRad <a href="CHAP003.htm#SSEC002.1">3.2.1</a> <dt>CanonicalFormOfTable <a href="CHAP003.htm#SSEC002.1">3.2.1</a> <dt>CenterDerivedInfo <a href="CHAP004.htm#SSEC003.2">4.3.2</a> <dt>CheckAssociativity <a href="CHAP002.htm#SSEC001.4">2.1.4</a> <dt>CheckCommutativity <a href="CHAP002.htm#SSEC001.5">2.1.5</a> <dt>CheckConsistency <a href="CHAP002.htm#SSEC001.6">2.1.6</a> <dt>CompareTables <a href="CHAP002.htm#SSEC001.3">2.1.3</a> <dt>Computing bins and checking bins <a href="CHAP004.htm#SECT001">4.1</a> <dt>Computing Kurosh Algebras <a href="CHAP006.htm#SECT001">6.1</a> <dt>Computing nilpotent quotients <a href="CHAP005.htm#SECT001">5.1</a> <dt>ConjugacyClassInfo <a href="CHAP004.htm#SSEC003.15">4.3.15</a> <dt>CyclicDerivedInfo <a href="CHAP004.htm#SSEC003.10">4.3.10</a> </dl><p> <H2><A NAME="idxD">D</A></H2> <dl> <dt>DimensionTwoCohomology <a href="CHAP004.htm#SSEC003.14">4.3.14</a> </dl><p> <H2><A NAME="idxE">E</A></H2> <dl> <dt>Example of accessing the library of Kurosh algebras <a href="CHAP006.htm#SECT003">6.3</a> <dt>Example of canonical form computation <a href="CHAP003.htm#SECT003">3.3</a> <dt>Example of nilpotent quotient computation <a href="CHAP005.htm#SECT002">5.2</a> <dt>ExpandExponentLaw <a href="CHAP006.htm#SSEC001.2">6.1.2</a> </dl><p> <H2><A NAME="idxG">G</A></H2> <dl> <dt>GetEntryTable <a href="CHAP002.htm#SSEC001.1">2.1.1</a> <dt>GroupInfo <a href="CHAP004.htm#SSEC003.1">4.3.1</a> </dl><p> <H2><A NAME="idxI">I</A></H2> <dl> <dt>Introduction <a href="CHAP001.htm">1.0</a> <dt>IsCoveredByTheory <a href="CHAP004.htm#SSEC003.13">4.3.13</a> </dl><p> <H2><A NAME="idxJ">J</A></H2> <dl> <dt>JenningsDerivedInfo <a href="CHAP004.htm#SSEC003.5">4.3.5</a> <dt>JenningsInfo <a href="CHAP004.htm#SSEC003.4">4.3.4</a> </dl><p> <H2><A NAME="idxK">K</A></H2> <dl> <dt>Kernel size <a href="CHAP004.htm#SECT002">4.2</a> <dt>KernelSizePowerMap <a href="CHAP004.htm#SSEC002.1">4.2.1</a> <dt>KuroshAlgebra <a href="CHAP006.htm#SSEC001.1">6.1.1</a> <dt>KuroshAlgebraByLib <a href="CHAP006.htm#SSEC002.1">6.2.1</a> </dl><p> <H2><A NAME="idxM">M</A></H2> <dl> <dt>MaximalAbelianDirectFactor <a href="CHAP004.htm#SSEC003.11">4.3.11</a> <dt>MIPBinSplit <a href="CHAP004.htm#SSEC001.8">4.1.8</a> <dt>MIPElementAlgebraToTable <a href="CHAP002.htm#SSEC003.4">2.3.4</a> <dt>MIPElementTableToAlgebra <a href="CHAP002.htm#SSEC003.3">2.3.3</a> <dt>MIPSplitGroupsByAlgebras <a href="CHAP004.htm#SSEC001.7">4.1.7</a> <dt>MIPSplitGroupsByGroupTheoreticalInvariants <a href="CHAP004.htm#SSEC001.2">4.1.2</a> <dt>MIPSplitGroupsByGroupTheoreticalInvariantsAllFields <a href="CHAP004.htm#SSEC001. <dt>MIPSplitGroupsByGroupTheoreticalInvariantsAllFieldsNoCohomology <a href="CHAP004. <dt>MIPSplitGroupsByGroupTheoreticalInvariantsNoCohomology <a href="CHAP004.htm#SSEC0 <dt>ModIsomTable <a href="CHAP002.htm#SSEC003.2">2.3.2</a> <dt>MultByTable <a href="CHAP002.htm#SSEC001.2">2.1.2</a> </dl><p> <H2><A NAME="idxN">N</A></H2> <dl> <dt>NilpotencyClassInfo <a href="CHAP004.htm#SSEC003.8">4.3.8</a> <dt>Nilpotent Quotients <a href="CHAP005.htm">5.0</a> <dt>Nilpotent tables <a href="CHAP002.htm#SECT001">2.1</a> <dt>NilpotentQuotientOfFpAlgebra <a href="CHAP005.htm#SSEC001.1">5.1.1</a> <dt>NilpotentTable <a href="CHAP002.htm#SSEC002.1">2.2.1</a> <dt>NilpotentTableOfRad <a href="CHAP002.htm#SSEC002.2">2.2.2</a> <dt>NormalSubgroupsInfo <a href="CHAP004.htm#SSEC003.12">4.3.12</a> </dl><p> <H2><A NAME="idxR">R</A></H2> <dl> <dt>Relatively free Algebras <a href="CHAP006.htm">6.0</a> </dl><p> <H2><A NAME="idxS">S</A></H2> <dl> <dt>SandlingInfo <a href="CHAP004.htm#SSEC003.3">4.3.3</a> <dt>SubgroupsInfo <a href="CHAP004.htm#SSEC003.16">4.3.16</a> </dl><p> <H2><A NAME="idxT">T</A></H2> <dl> <dt>TableOfRadQuotient <a href="CHAP002.htm#SSEC003.1">2.3.1</a> <dt>Tables <a href="CHAP002.htm">2.0</a> <dt>Tables for the Modular Isomorphism Problem <a href="CHAP002.htm#SECT003">2.3</a> <dt>The group theoretical invariants <a href="CHAP004.htm#SECT003">4.3</a> <dt>The modular isomorphism problem <a href="CHAP004.htm">4.0</a> <dt>Theorem41MS22 <a href="CHAP004.htm#SSEC003.9">4.3.9</a> </dl><p> [<a href="chapters.htm">Up</a>]<p> <P> <address>ModIsom manual<br>September 2024 </address></body></html> ¤ Dauer der Verarbeitung: 0.12 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28