Quelle manual.six
Sprache: unbekannt
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[ "Copyright", "0.0-1", [ 0, 0, 1 ], 24, 2, "copyright",
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[ "Acknowledgements", "0.0-2", [ 0, 0, 2 ], 32, 2, "acknowledgements",
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[ "Table of Contents", "0.0-3", [ 0, 0, 3 ], 39, 3, "table of contents",
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[
"\033[1X\033[33X\033[0;-2YDecomposition numbers of Hecke algebras of type A\
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[
"\033[1X\033[33X\033[0;-2YThe modular representation theory of Hecke algebr\
as\033[133X\033[101X", "1.2", [ 1, 2, 0 ], 52, 5,
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[ "\033[1X\033[33X\033[0;-2YTwo small examples\033[133X\033[101X", "1.3",
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"\033[1X\033[33X\033[0;-2YInstallation of the \033[5Xhecke\033[105X\033[101\
X\027\033[1X\027-Package\033[133X\033[101X", "2", [ 2, 0, 0 ], 1, 8,
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[ "\033[1X\033[33X\033[0;-2YSpecht functionality\033[133X\033[101X", "3",
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033[1X\027\033[133X\033[101X", "3.1-1", [ 3, 1, 1 ], 23, 9,
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"\033[1X\033[33X\033[0;-2YThe functions MakeSpecht, MakePIM and MakeSimple\\
033[133X\033[101X", "3.2-3", [ 3, 2, 3 ], 169, 12,
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"\033[1X\033[33X\033[0;-2YDecomposition numbers of the symmetric groups\\
033[133X\033[101X", "3.2-4", [ 3, 2, 4 ], 271, 13,
"decomposition numbers of the symmetric groups", "X86F599A07A7C1C33" ],
[ "\033[1X\033[33X\033[0;-2YHecke algebras over fields of positive character\
istic\033[133X\033[101X", "3.2-5", [ 3, 2, 5 ], 297, 14,
"hecke algebras over fields of positive characteristic",
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[
"\033[1X\033[33X\033[0;-2YThe Fock space and Hecke algebras over fields of \
characteristic zero\033[133X\033[101X", "3.2-6", [ 3, 2, 6 ], 336, 14,
"the fock space and hecke algebras over fields of characteristic zero",
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"\033[1X\033[33X\033[0;-2YPartitions in \033[5XHecke\033[105X\033[101X\027\\
033[1X\027\033[133X\033[101X", "3.3", [ 3, 3, 0 ], 609, 19,
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"\033[1X\033[33X\033[0;-2YOperations on decomposition matrices\033[133X\\
033[101X", "3.5", [ 3, 5, 0 ], 842, 22, "operations on decomposition matrices"
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[ "\033[1X\033[33X\033[0;-2YCalculating dimensions\033[133X\033[101X",
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"\033[1X\033[33X\033[0;-2YCombinatorics on Young diagrams\033[133X\033[101X\
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[ "\033[1X\033[33X\033[0;-2YOperations on partitions\033[133X\033[101X",
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"\033[1X\033[33X\033[0;-2YSemi-standard and standard tableaux\033[133X\033[\
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[ "\033[2XLatticePathGoodNodeSequence\033[102X", "3.7-10", [ 3, 7, 10 ],
1600, 35, "latticepathgoodnodesequence", "X7A9DC101850008A2" ],
[ "\033[2XLittlewoodRichardsonRule\033[102X", "3.7-11", [ 3, 7, 11 ], 1629,
35, "littlewoodrichardsonrule", "X7918D9DE7ACE2294" ],
[ "\033[2XLittlewoodRichardsonCoefficient\033[102X", "3.7-11",
[ 3, 7, 11 ], 1629, 35, "littlewoodrichardsoncoefficient",
"X7918D9DE7ACE2294" ],
[ "\033[2XInverseLittlewoodRichardsonRule\033[102X", "3.7-12",
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[ "\033[2XEResidueDiagram\033[102X", "3.7-13", [ 3, 7, 13 ], 1701, 37,
"eresiduediagram", "X790D4ACF7930340F" ],
[ "\033[2XEResidueDiagram\033[102X for modules", "3.7-13", [ 3, 7, 13 ],
1701, 37, "eresiduediagram for modules", "X790D4ACF7930340F" ],
[ "\033[2XHookLengthDiagram\033[102X", "3.7-14", [ 3, 7, 14 ], 1736, 37,
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[ "\033[2XRemoveRimHook\033[102X", "3.7-15", [ 3, 7, 15 ], 1755, 37,
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[ "\033[2XAddRimHook\033[102X", "3.7-16", [ 3, 7, 16 ], 1776, 38,
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[ "\033[2XECore\033[102X", "3.8-1", [ 3, 8, 1 ], 1807, 38, "ecore",
"X867496487DC35776" ],
[ "\033[2XEAbacus\033[102X", "3.8-1", [ 3, 8, 1 ], 1807, 38, "eabacus",
"X867496487DC35776" ],
[ "\033[2XIsECore\033[102X", "3.8-2", [ 3, 8, 2 ], 1830, 39, "isecore",
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[ "\033[2XEQuotient\033[102X", "3.8-3", [ 3, 8, 3 ], 1838, 39, "equotient",
"X8538AAAF8628A725" ],
[ "\033[2XCombineEQuotientECore\033[102X", "3.8-4", [ 3, 8, 4 ], 1852, 39,
"combineequotientecore", "X7F357B417D495B6F" ],
[ "\033[2XEWeight\033[102X", "3.8-5", [ 3, 8, 5 ], 1873, 40, "eweight",
"X7C460635829E7ED0" ],
[ "\033[2XERegularPartitions\033[102X", "3.8-6", [ 3, 8, 6 ], 1888, 40,
"eregularpartitions", "X86308F6C818B220C" ],
[ "\033[2XIsERegular\033[102X", "3.8-7", [ 3, 8, 7 ], 1906, 40,
"iseregular", "X7BEDA8F286ED5F20" ],
[ "\033[2XConjugatePartition\033[102X", "3.8-8", [ 3, 8, 8 ], 1914, 40,
"conjugatepartition", "X7D131AF0839089BD" ],
[ "\033[2XPartitionBetaSet\033[102X", "3.8-9", [ 3, 8, 9 ], 1928, 40,
"partitionbetaset", "X8711CC56792711A7" ],
[ "\033[2XETopLadder\033[102X", "3.8-10", [ 3, 8, 10 ], 1942, 41,
"etopladder", "X7EC4D0FA81B55391" ],
[ "\033[2XDominates\033[102X", "3.8-11", [ 3, 8, 11 ], 1965, 41,
"dominates", "X820388EF7C8333BA" ],
[ "\033[2XLengthLexicographic\033[102X", "3.8-12", [ 3, 8, 12 ], 1982, 41,
"lengthlexicographic", "X84DB1DD37AF227CF" ],
[ "\033[2XLexicographic\033[102X", "3.8-13", [ 3, 8, 13 ], 1997, 42,
"lexicographic", "X8480188D81ECBD92" ],
[ "\033[2XReverseDominance\033[102X", "3.8-14", [ 3, 8, 14 ], 2012, 42,
"reversedominance", "X78F41DF77D6F8292" ],
[ "\033[2XSpecialized\033[102X", "3.9-1", [ 3, 9, 1 ], 2039, 42,
"specialized", "X7A8E810C85A62DD6" ],
[ "\033[2XSpecialized\033[102X for a decomposition matrix", "3.9-1",
[ 3, 9, 1 ], 2039, 42, "specialized for a decomposition matrix",
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[ "\033[2XERegulars\033[102X", "3.9-2", [ 3, 9, 2 ], 2070, 43, "eregulars",
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[ "\033[2XERegulars\033[102X for a decomposition matrix", "3.9-2",
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[ "\033[2XListERegulars\033[102X", "3.9-2", [ 3, 9, 2 ], 2070, 43,
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[ "\033[2XSplitECores\033[102X", "3.9-3", [ 3, 9, 3 ], 2106, 43,
"splitecores", "X822E8193835DD1D9" ],
[ "\033[2XSplitECores\033[102X for a module and a partition", "3.9-3",
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[ "\033[2XSplitECores\033[102X for two modules", "3.9-3", [ 3, 9, 3 ],
2106, 43, "splitecores for two modules", "X822E8193835DD1D9" ],
[ "\033[2XCoefficient\033[102X", "3.9-4", [ 3, 9, 4 ], 2132, 44,
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[ "\033[2XInnerProduct\033[102X", "3.9-5", [ 3, 9, 5 ], 2149, 44,
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[ "\033[2XTableau\033[102X", "3.10-1", [ 3, 10, 1 ], 2175, 44, "tableau",
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[ "\033[2XSemiStandardTableaux\033[102X", "3.10-2", [ 3, 10, 2 ], 2183, 45,
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[ "\033[2XStandardTableaux\033[102X", "3.10-3", [ 3, 10, 3 ], 2203, 45,
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[ "\033[2XConjugateTableau\033[102X", "3.10-4", [ 3, 10, 4 ], 2226, 45,
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[ "\033[2XShapeTableau\033[102X", "3.10-5", [ 3, 10, 5 ], 2243, 46,
"shapetableau", "X7E5351C27C9253D9" ],
[ "\033[2XTypeTableau\033[102X", "3.10-6", [ 3, 10, 6 ], 2256, 46,
"typetableau", "X7CABF92D7BF07DD1" ] ]
);
[ Dauer der Verarbeitung: 0.13 Sekunden
(vorverarbeitet)
]
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2026-04-02
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