Quellcode-Bibliothek manual.six
Sprache: unbekannt
|
|
Columbo aufrufen.six Download desUnknown {[0] [0] [0]}Datei anzeigen
#SIXFORMAT GapDocGAP
HELPBOOKINFOSIXTMP := rec(
encoding := "UTF-8",
bookname := "GBNP",
entries :=
[ [ "Title page", "0.0", [ 0, 0, 0 ], 1, 1, "title page", "X7D2C85EC87DD46E5"
],
[ "Abstract", "0.0-1", [ 0, 0, 1 ], 32, 2, "abstract", "X7AA6C5737B711C89" ]
,
[ "Copyright", "0.0-2", [ 0, 0, 2 ], 51, 2, "copyright",
"X81488B807F2A1CF1" ],
[ "Acknowledgements", "0.0-3", [ 0, 0, 3 ], 58, 2, "acknowledgements",
"X82A988D47DFAFCFA" ],
[ "Table of Contents", "0.0-4", [ 0, 0, 4 ], 85, 3, "table of contents",
"X8537FEB07AF2BEC8" ],
[ "\033[1X\033[33X\033[0;-2YIntroduction\033[133X\033[101X", "1",
[ 1, 0, 0 ], 1, 5, "introduction", "X7DFB63A97E67C0A1" ],
[ "\033[1X\033[33X\033[0;-2YInstallation\033[133X\033[101X", "1.1",
[ 1, 1, 0 ], 16, 5, "installation", "X8360C04082558A12" ],
[ "\033[1X\033[33X\033[0;-2YUsing the package\033[133X\033[101X", "1.2",
[ 1, 2, 0 ], 31, 5, "using the package", "X78629CD778BE8C5D" ],
[ "\033[1X\033[33X\033[0;-2YFurther documentation\033[133X\033[101X",
"1.3", [ 1, 3, 0 ], 63, 6, "further documentation", "X7DDEF24284C861D8"
], [ "\033[1X\033[33X\033[0;-2YDescription\033[133X\033[101X", "2",
[ 2, 0, 0 ], 1, 7, "description", "X7BBCB13F82ACC213" ],
[
"\033[1X\033[33X\033[0;-2YNon-commutative Polynomials (NPs)\033[133X\033[10\
1X", "2.1", [ 2, 1, 0 ], 4, 7, "non-commutative polynomials nps",
"X7FDF3E5E7F33D3A2" ],
[
"\033[1X\033[33X\033[0;-2YNon-commutative Polynomials for Modules (NPMs)\\
033[133X\033[101X", "2.2", [ 2, 2, 0 ], 70, 8,
"non-commutative polynomials for modules npms", "X7B27E2D1784538DE" ],
[ "\033[1X\033[33X\033[0;-2YCore functions\033[133X\033[101X", "2.3",
[ 2, 3, 0 ], 91, 8, "core functions", "X84BD98F5811EAC45" ],
[ "\033[1X\033[33X\033[0;-2YAbout the implementation\033[133X\033[101X",
"2.4", [ 2, 4, 0 ], 154, 9, "about the implementation",
"X7EEE260680A64013" ],
[ "\033[1X\033[33X\033[0;-2YTracing variant\033[133X\033[101X", "2.5",
[ 2, 5, 0 ], 180, 9, "tracing variant", "X8739B6547BC89505" ],
[ "\033[1X\033[33X\033[0;-2YTruncation variant\033[133X\033[101X", "2.6",
[ 2, 6, 0 ], 200, 10, "truncation variant", "X78CF5C44879D34B6" ],
[ "\033[1X\033[33X\033[0;-2YModule variant\033[133X\033[101X", "2.7",
[ 2, 7, 0 ], 227, 10, "module variant", "X86F1F4EE7D4D06B7" ],
[ "\033[1X\033[33X\033[0;-2YGr\303\266bner basis records\033[133X\033[101X",
"2.8", [ 2, 8, 0 ], 247, 11, "gra\266bner basis records",
"X80DAE0A97CFC95DD" ],
[ "\033[1X\033[33X\033[0;-2YQuotient algebras\033[133X\033[101X", "2.9",
[ 2, 9, 0 ], 259, 11, "quotient algebras", "X85A91A467FF1DE45" ],
[ "\033[1X\033[33X\033[0;-2YFunctions\033[133X\033[101X", "3", [ 3, 0, 0 ],
1, 13, "functions", "X86FA580F8055B274" ],
[
"\033[1X\033[33X\033[0;-2YConverting polynomials into different formats\\
033[133X\033[101X", "3.1", [ 3, 1, 0 ], 4, 13,
"converting polynomials into different formats", "X81ABB91B79E00229" ],
[ "\033[1X\033[33X\033[0;-2YPrinting polynomials in NP format\033[133X\033[1\
01X", "3.2", [ 3, 2, 0 ], 227, 16, "printing polynomials in np format",
"X78F44B01851B1020" ],
[
"\033[1X\033[33X\033[0;-2YCalculating with polynomials in NP format\033[133\
X\033[101X", "3.3", [ 3, 3, 0 ], 403, 19,
"calculating with polynomials in np format", "X83DE3F817EA74727" ],
[
"\033[1X\033[33X\033[0;-2YGr\303\266bner functions, standard variant\033[13\
3X\033[101X", "3.4", [ 3, 4, 0 ], 769, 25,
"gra\266bner functions standard variant", "X81381B2D83D2B9A9" ],
[
"\033[1X\033[33X\033[0;-2YFinite-dimensional quotient algebras\033[133X\\
033[101X", "3.5", [ 3, 5, 0 ], 1078, 29,
"finite-dimensional quotient algebras", "X7F387F7780425B9A" ],
[ "\033[1X\033[33X\033[0;-2YFiniteness and Hilbert series\033[133X\033[101X"
, "3.6", [ 3, 6, 0 ], 1375, 34, "finiteness and hilbert series",
"X79FE4A3983E2329F" ],
[
"\033[1X\033[33X\033[0;-2YFunctions of the trace variant\033[133X\033[101X"
, "3.7", [ 3, 7, 0 ], 1572, 37, "functions of the trace variant",
"X7BA5CAA07890F7AA" ],
[
"\033[1X\033[33X\033[0;-2YFunctions of the truncated variant\033[133X\033[1\
01X", "3.8", [ 3, 8, 0 ], 1735, 39, "functions of the truncated variant",
"X7E4E3AD07B2465F9" ],
[ "\033[1X\033[33X\033[0;-2YExamples\033[133X\033[101X", "3.8-1",
[ 3, 8, 1 ], 1738, 39, "examples", "X7A489A5D79DA9E5C" ],
[
"\033[1X\033[33X\033[0;-2YFunctions of the module variant\033[133X\033[101X\
", "3.9", [ 3, 9, 0 ], 2010, 44, "functions of the module variant",
"X8706DD3287E82019" ],
[ "\033[1X\033[33X\033[0;-2YInfo Level\033[133X\033[101X", "4",
[ 4, 0, 0 ], 1, 49, "info level", "X79C5DF3782576D98" ],
[ "\033[1X\033[33X\033[0;-2YIntroduction\033[133X\033[101X", "4.1",
[ 4, 1, 0 ], 4, 49, "introduction", "X7DFB63A97E67C0A1" ],
[ "\033[1X\033[33X\033[0;-2YInfoGBNP\033[133X\033[101X", "4.2",
[ 4, 2, 0 ], 19, 49, "infogbnp", "X82D40B0E84383BBC" ],
[
"\033[1X\033[33X\033[0;-2YWhat will be printed at level 0\033[133X\033[101X\
", "4.2-2", [ 4, 2, 2 ], 30, 49, "what will be printed at level 0",
"X8222A2F67E4CC62B" ],
[
"\033[1X\033[33X\033[0;-2YWhat will be printed at level 1\033[133X\033[101X\
", "4.2-3", [ 4, 2, 3 ], 40, 49, "what will be printed at level 1",
"X8552D1FF7EA2B8A6" ],
[
"\033[1X\033[33X\033[0;-2YWhat will be printed at level 2\033[133X\033[101X\
", "4.2-4", [ 4, 2, 4 ], 53, 50, "what will be printed at level 2",
"X7CC244E47F903B31" ],
[ "\033[1X\033[33X\033[0;-2YInfoGBNPTime\033[133X\033[101X", "4.3",
[ 4, 3, 0 ], 66, 50, "infogbnptime", "X7FAE244E80397B9A" ],
[
"\033[1X\033[33X\033[0;-2YWhat will be printed at level 0\033[133X\033[101X\
", "4.3-2", [ 4, 3, 2 ], 80, 50, "what will be printed at level 0",
"X8222A2F67E4CC62B" ],
[
"\033[1X\033[33X\033[0;-2YWhat will be printed at level 1\033[133X\033[101X\
", "4.3-3", [ 4, 3, 3 ], 86, 50, "what will be printed at level 1",
"X8552D1FF7EA2B8A6" ],
[
"\033[1X\033[33X\033[0;-2YWhat will be printed at level 2\033[133X\033[101X\
", "4.3-4", [ 4, 3, 4 ], 99, 50, "what will be printed at level 2",
"X7CC244E47F903B31" ],
[ "\033[1X\033[33X\033[0;-2YNMO Manual\033[133X\033[101X", "5",
[ 5, 0, 0 ], 1, 51, "nmo manual", "X8107DEB279100E13" ],
[ "\033[1X\033[33X\033[0;-2YIntroduction\033[133X\033[101X", "5.1",
[ 5, 1, 0 ], 4, 51, "introduction", "X7DFB63A97E67C0A1" ],
[ "\033[1X\033[33X\033[0;-2YNMO Files within GBNP\033[133X\033[101X",
"5.2", [ 5, 2, 0 ], 61, 52, "nmo files within gbnp",
"X8282EFF97FA1752A" ],
[ "\033[1X\033[33X\033[0;-2YQuickstart\033[133X\033[101X", "5.3",
[ 5, 3, 0 ], 103, 52, "quickstart", "X7F83DF528480AEA3" ],
[ "\033[1X\033[33X\033[0;-2YNMO Example 1\033[133X\033[101X", "5.3-1",
[ 5, 3, 1 ], 120, 53, "nmo example 1", "X7B44E73581910347" ],
[ "\033[1X\033[33X\033[0;-2YNMO Example 2\033[133X\033[101X", "5.3-2",
[ 5, 3, 2 ], 218, 54, "nmo example 2", "X82D4722E7A4DA58B" ],
[ "\033[1X\033[33X\033[0;-2YNMO Example 3\033[133X\033[101X", "5.3-3",
[ 5, 3, 3 ], 298, 55, "nmo example 3", "X85A401278794C813" ],
[ "\033[1X\033[33X\033[0;-2YNMO Example 4\033[133X\033[101X", "5.3-4",
[ 5, 3, 4 ], 338, 56, "nmo example 4", "X7C42487D8043F876" ],
[ "\033[1X\033[33X\033[0;-2YOrderings - Internals\033[133X\033[101X",
"5.4", [ 5, 4, 0 ], 391, 57, "orderings - internals",
"X86BAEB0C80A24491" ],
[ "\033[1X\033[33X\033[0;-2YProvided Orderings\033[133X\033[101X", "5.5",
[ 5, 5, 0 ], 592, 60, "provided orderings", "X7CDF05BD85AA0EE6" ],
[ "\033[1X\033[33X\033[0;-2YOrderings - Externals\033[133X\033[101X",
"5.6", [ 5, 6, 0 ], 644, 61, "orderings - externals",
"X8374E7B780EEE873" ],
[ "\033[1X\033[33X\033[0;-2YFlexibility vs. Efficiency\033[133X\033[101X",
"5.6-5", [ 5, 6, 5 ], 730, 63, "flexibility vs. efficiency",
"X8528D2528613E9A2" ],
[ "\033[1X\033[33X\033[0;-2YUtility Routines\033[133X\033[101X", "5.7",
[ 5, 7, 0 ], 751, 63, "utility routines", "X79B90CCE7A05DEEB" ],
[ "\033[1X\033[33X\033[0;-2YGBNP Patching Routines\033[133X\033[101X",
"5.7-1", [ 5, 7, 1 ], 754, 63, "gbnp patching routines",
"X7B758C747AD2344B" ],
[ "\033[1X\033[33X\033[0;-2YExamples\033[133X\033[101X", "a",
[ "A", 0, 0 ], 1, 64, "examples", "X7A489A5D79DA9E5C" ],
[ "\033[1X\033[33X\033[0;-2YIntroduction\033[133X\033[101X", "a.1",
[ "A", 1, 0 ], 4, 64, "introduction", "X7DFB63A97E67C0A1" ],
[
"\033[1X\033[33X\033[0;-2YA simple commutative Gr\303\266bner basis computa\
tion\033[133X\033[101X", "a.2", [ "A", 2, 0 ], 75, 65,
"a simple commutative gra\266bner basis computation",
"X784586E47E2739E3" ],
[
"\033[1X\033[33X\033[0;-2YA truncated Gr\303\266bner basis for Leonard pair\
s\033[133X\033[101X", "a.3", [ "A", 3, 0 ], 186, 67,
"a truncated gra\266bner basis for leonard pairs", "X7E1B57AA85C2BA70" ]
,
[
"\033[1X\033[33X\033[0;-2YThe truncated variant on two weighted homogeneous\
polynomials\033[133X\033[101X", "a.4", [ "A", 4, 0 ], 349, 69,
"the truncated variant on two weighted homogeneous polynomials",
"X79AC59C482A2E4C1" ],
[
"\033[1X\033[33X\033[0;-2YThe order of the Weyl group of type E\033[22X_6\\
033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "a.5", [ "A", 5, 0 ],
560, 73, "the order of the weyl group of type e_6", "X7C7742957CEC6E7B"
],
[
"\033[1X\033[33X\033[0;-2YThe gcd of some univariate polynomials\033[133X\\
033[101X", "a.6", [ "A", 6, 0 ], 743, 76,
"the gcd of some univariate polynomials", "X7E39C9738509A036" ],
[ "\033[1X\033[33X\033[0;-2YFrom the Tapas book\033[133X\033[101X", "a.7",
[ "A", 7, 0 ], 839, 78, "from the tapas book", "X7F5A6ABA85CDB6E2" ],
[
"\033[1X\033[33X\033[0;-2YThe Birman-Murakami-Wenzl algebra of type A\033[2\
2X_3\033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "a.8",
[ "A", 8, 0 ], 1007, 80, "the birman-murakami-wenzl algebra of type a_3"
, "X7C2CD4FA838EEE64" ],
[
"\033[1X\033[33X\033[0;-2YThe Birman-Murakami-Wenzl algebra of type A\033[2\
2X_2\033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "a.9",
[ "A", 9, 0 ], 1220, 84, "the birman-murakami-wenzl algebra of type a_2"
, "X7B5CA7F379B78CE0" ],
[ "\033[1X\033[33X\033[0;-2YA commutative example by Mora\033[133X\033[101X"
, "a.10", [ "A", 10, 0 ], 1424, 88, "a commutative example by mora",
"X83C81C987A4DE15F" ],
[ "\033[1X\033[33X\033[0;-2YTracing an example by Mora\033[133X\033[101X",
"a.11", [ "A", 11, 0 ], 1551, 90, "tracing an example by mora",
"X7CAB94A37D580C4A" ],
[
"\033[1X\033[33X\033[0;-2YFiniteness of the Weyl group of type E\033[22X_6\\
033[122X\033[101X\027\033[1X\027\033[133X\033[101X", "a.12", [ "A", 12, 0 ],
1644, 91, "finiteness of the weyl group of type e_6",
"X8599AE8F7E9E0368" ],
[
"\033[1X\033[33X\033[0;-2YPreprocessing for Weyl group computations\033[133\
X\033[101X", "a.13", [ "A", 13, 0 ], 1735, 93,
"preprocessing for weyl group computations", "X7B1822C67CF83041" ],
[
"\033[1X\033[33X\033[0;-2YA quotient algebra with exponential growth\033[13\
3X\033[101X", "a.14", [ "A", 14, 0 ], 1842, 94,
"a quotient algebra with exponential growth", "X7BE4A97886B0930E" ],
[
"\033[1X\033[33X\033[0;-2YA commutative quotient algebra of polynomial grow\
th\033[133X\033[101X", "a.15", [ "A", 15, 0 ], 1942, 96,
"a commutative quotient algebra of polynomial growth",
"X78679D7D80CD8822" ],
[
"\033[1X\033[33X\033[0;-2YAn algebra over a finite field\033[133X\033[101X"
, "a.16", [ "A", 16, 0 ], 2107, 98, "an algebra over a finite field",
"X7CE3005580EF632D" ],
[ "\033[1X\033[33X\033[0;-2YThe dihedral group of order 8\033[133X\033[101X"
, "a.17", [ "A", 17, 0 ], 2221, 100, "the dihedral group of order 8",
"X7E4CEC577A18C8ED" ],
[
"\033[1X\033[33X\033[0;-2YThe dihedral group of order 8 on another module\\
033[133X\033[101X", "a.18", [ "A", 18, 0 ], 2370, 103,
"the dihedral group of order 8 on another module", "X83328C357FB33D17" ]
,
[
"\033[1X\033[33X\033[0;-2YThe dihedral group on a non-cyclic module\033[133\
X\033[101X", "a.19", [ "A", 19, 0 ], 2453, 104,
"the dihedral group on a non-cyclic module", "X85DBF3967C4DF5FE" ],
[ "\033[1X\033[33X\033[0;-2YThe icosahedral group\033[133X\033[101X",
"a.20", [ "A", 20, 0 ], 2622, 106, "the icosahedral group",
"X78FCAC347D9D607E" ],
[
"\033[1X\033[33X\033[0;-2YThe symmetric inverse monoid for a set of size fo\
ur\033[133X\033[101X", "a.21", [ "A", 21, 0 ], 2793, 109,
"the symmetric inverse monoid for a set of size four",
"X780C4B777FEA9080" ],
[
"\033[1X\033[33X\033[0;-2YA module of the Hecke algebra of type A\033[22X_3\
\033[122X\033[101X\027\033[1X\027 over GF(3)\033[133X\033[101X", "a.22",
[ "A", 22, 0 ], 2978, 112,
"a module of the hecke algebra of type a_3 over gf 3",
"X84C07DC479FBBCD5" ],
[
"\033[1X\033[33X\033[0;-2YGeneralized Temperley-Lieb algebras\033[133X\033[\
101X", "a.23", [ "A", 23, 0 ], 3118, 115,
"generalized temperley-lieb algebras", "X78C01D1987FEF3FE" ],
[
"\033[1X\033[33X\033[0;-2YThe universal enveloping algebra of a Lie algebra\
\033[133X\033[101X", "a.24", [ "A", 24, 0 ], 3233, 116,
"the universal enveloping algebra of a lie algebra",
"X85A9CEF087F3936B" ],
[ "\033[1X\033[33X\033[0;-2YSerre's exercise\033[133X\033[101X", "a.25",
[ "A", 25, 0 ], 3388, 119, "serres exercise", "X8498D69D8160E5FF" ],
[
"\033[1X\033[33X\033[0;-2YBaur and Draisma's transformations\033[133X\033[1\
01X", "a.26", [ "A", 26, 0 ], 3477, 120, "baur and draismas transformations",
"X8116448A84D69022" ],
[ "\033[1X\033[33X\033[0;-2YThe cola gene puzzle\033[133X\033[101X",
"a.27", [ "A", 27, 0 ], 3567, 122, "the cola gene puzzle",
"X7912E411867E5F8B" ],
[ "Bibliography", "bib", [ "Bib", 0, 0 ], 1, 130, "bibliography",
"X7A6F98FD85F02BFE" ],
[ "References", "bib", [ "Bib", 0, 0 ], 1, 130, "references",
"X7A6F98FD85F02BFE" ],
[ "Index", "ind", [ "Ind", 0, 0 ], 1, 132, "index", "X83A0356F839C696F" ],
[ "\033[2XGP2NP\033[102X", "3.1-1", [ 3, 1, 1 ], 7, 13, "gp2np",
"X7B0EBCBC7857F1AE" ],
[ "\033[2XGP2NPList\033[102X", "3.1-2", [ 3, 1, 2 ], 65, 14, "gp2nplist",
"X7CF0ED937DDA5A7E" ],
[ "\033[2XNP2GP\033[102X", "3.1-3", [ 3, 1, 3 ], 107, 14, "np2gp",
"X86C3912F781ABEDC" ],
[ "\033[2XNP2GPList\033[102X", "3.1-4", [ 3, 1, 4 ], 175, 15, "np2gplist",
"X844A23EA7D97150C" ],
[ "\033[2XPrintNP\033[102X", "3.2-1", [ 3, 2, 1 ], 230, 16, "printnp",
"X7B63BEA87A8D6162" ],
[ "\033[2XGBNP.ConfigPrint\033[102X", "3.2-2", [ 3, 2, 2 ], 255, 17,
"gbnp.configprint", "X7F7510A878045D3A" ],
[ "\033[2XPrintNPList\033[102X", "3.2-3", [ 3, 2, 3 ], 368, 18,
"printnplist", "X832103DC79A9E9D0" ],
[ "\033[2XNumAlgGensNP\033[102X", "3.3-1", [ 3, 3, 1 ], 406, 19,
"numalggensnp", "X7DB3792385AAA805" ],
[ "\033[2XNumAlgGensNPList\033[102X", "3.3-2", [ 3, 3, 2 ], 427, 19,
"numalggensnplist", "X865548F07C74AB0A" ],
[ "\033[2XNumModGensNP\033[102X", "3.3-3", [ 3, 3, 3 ], 450, 20,
"nummodgensnp", "X782647C57D148379" ],
[ "\033[2XNumModGensNPList\033[102X", "3.3-4", [ 3, 3, 4 ], 471, 20,
"nummodgensnplist", "X8119282084CA8076" ],
[ "\033[2XAddNP\033[102X", "3.3-5", [ 3, 3, 5 ], 494, 20, "addnp",
"X788E1ACA82A833A8" ],
[ "\033[2XBimulNP\033[102X", "3.3-6", [ 3, 3, 6 ], 516, 21, "bimulnp",
"X84FC611A822D808F" ],
[ "\033[2XCleanNP\033[102X", "3.3-7", [ 3, 3, 7 ], 542, 21, "cleannp",
"X855F3D4C783000E3" ],
[ "\033[2XGtNP\033[102X", "3.3-8", [ 3, 3, 8 ], 580, 22, "gtnp",
"X7D05B60E83FDA567" ],
[ "\033[2XLtNP\033[102X", "3.3-9", [ 3, 3, 9 ], 605, 22, "ltnp",
"X8075AE7E7A8088FF" ],
[ "\033[2XLMonNP\033[102X", "3.3-10", [ 3, 3, 10 ], 629, 22, "lmonnp",
"X7A42AE79811CC5D7" ],
[ "\033[2XLMonsNP\033[102X", "3.3-10", [ 3, 3, 10 ], 629, 22, "lmonsnp",
"X7A42AE79811CC5D7" ],
[ "\033[2XLTermNP\033[102X", "3.3-11", [ 3, 3, 11 ], 663, 23, "ltermnp",
"X80CD462F794A8095" ],
[ "\033[2XLTermsNP\033[102X", "3.3-11", [ 3, 3, 11 ], 663, 23, "ltermsnp",
"X80CD462F794A8095" ],
[ "\033[2XMkMonicNP\033[102X", "3.3-12", [ 3, 3, 12 ], 686, 23,
"mkmonicnp", "X878A8C027DA25196" ],
[ "\033[2XFactorOutGcdNP\033[102X", "3.3-13", [ 3, 3, 13 ], 710, 24,
"factoroutgcdnp", "X818147CD841BD490" ],
[ "\033[2XMulNP\033[102X", "3.3-14", [ 3, 3, 14 ], 739, 24, "mulnp",
"X7ABA720E87EFF040" ],
[ "\033[2XGrobner\033[102X", "3.4-1", [ 3, 4, 1 ], 772, 25, "grobner",
"X7CD9F9C97B2563E2" ],
[ "\033[2XSGrobner\033[102X", "3.4-2", [ 3, 4, 2 ], 848, 26, "sgrobner",
"X7FEDA29E78B0CEED" ],
[ "\033[2XIsGrobnerBasis\033[102X", "3.4-3", [ 3, 4, 3 ], 914, 27,
"isgrobnerbasis", "X80D4D22C7E643C7B" ],
[ "\033[2XIsStrongGrobnerBasis\033[102X", "3.4-4", [ 3, 4, 4 ], 948, 27,
"isstronggrobnerbasis", "X7D17F9027F08CF0B" ],
[ "\033[2XIsGrobnerPair\033[102X", "3.4-5", [ 3, 4, 5 ], 999, 28,
"isgrobnerpair", "X7E0105ED7FF4210F" ],
[ "\033[2XMakeGrobnerPair\033[102X", "3.4-6", [ 3, 4, 6 ], 1039, 29,
"makegrobnerpair", "X8752DA1A7CAF77D3" ],
[ "\033[2XBaseQA\033[102X", "3.5-1", [ 3, 5, 1 ], 1081, 29, "baseqa",
"X7EAA04247B2C6330" ],
[ "\033[2XDimQA\033[102X", "3.5-2", [ 3, 5, 2 ], 1142, 30, "dimqa",
"X81A50EEE7B56C723" ],
[ "\033[2XMatrixQA\033[102X", "3.5-3", [ 3, 5, 3 ], 1179, 31, "matrixqa",
"X7DFA841A8425DD94" ],
[ "\033[2XMatricesQA\033[102X", "3.5-4", [ 3, 5, 4 ], 1249, 32,
"matricesqa", "X78E4BF2F7F0D5E74" ],
[ "\033[2XMulQA\033[102X", "3.5-5", [ 3, 5, 5 ], 1303, 33, "mulqa",
"X80C4D0E882B05FDF" ],
[ "\033[2XStrongNormalFormNP\033[102X", "3.5-6", [ 3, 5, 6 ], 1340, 33,
"strongnormalformnp", "X8563683E7FA604F8" ],
[ "\033[2XDetermineGrowthQA\033[102X", "3.6-1", [ 3, 6, 1 ], 1378, 34,
"determinegrowthqa", "X83C57C3A7DCF0471" ],
[ "\033[2XFinCheckQA\033[102X", "3.6-2", [ 3, 6, 2 ], 1455, 35,
"fincheckqa", "X792E39A98717D779" ],
[ "\033[2XHilbertSeriesQA\033[102X", "3.6-3", [ 3, 6, 3 ], 1499, 35,
"hilbertseriesqa", "X7CFD47367CF309EB" ],
[ "\033[2XPreprocessAnalysisQA\033[102X", "3.6-4", [ 3, 6, 4 ], 1530, 36,
"preprocessanalysisqa", "X863124677B933CEE" ],
[ "\033[2XEvalTrace\033[102X", "3.7-1", [ 3, 7, 1 ], 1575, 37, "evaltrace",
"X813454F6799B1D57" ],
[ "\033[2XPrintTraceList\033[102X", "3.7-2", [ 3, 7, 2 ], 1605, 37,
"printtracelist", "X83D1560C7F2A04BA" ],
[ "\033[2XPrintTracePol\033[102X", "3.7-3", [ 3, 7, 3 ], 1625, 37,
"printtracepol", "X8039BEE77C070FB1" ],
[ "\033[2XPrintNPListTrace\033[102X", "3.7-4", [ 3, 7, 4 ], 1646, 38,
"printnplisttrace", "X7DD0B56D7BD6CD98" ],
[ "\033[2XSGrobnerTrace\033[102X", "3.7-5", [ 3, 7, 5 ], 1666, 38,
"sgrobnertrace", "X78AE6EED83B97595" ],
[ "\033[2XStrongNormalFormTraceDiff\033[102X", "3.7-6", [ 3, 7, 6 ], 1695,
39, "strongnormalformtracediff", "X8219059A86A54130" ],
[ "\033[2XSGrobnerTrunc\033[102X", "3.8-2", [ 3, 8, 2 ], 1743, 39,
"sgrobnertrunc", "X7CD043E081BF2302" ],
[ "\033[2XCheckHomogeneousNPs\033[102X", "3.8-3", [ 3, 8, 3 ], 1780, 40,
"checkhomogeneousnps", "X83C9E598798D5809" ],
[ "\033[2XBaseQATrunc\033[102X", "3.8-4", [ 3, 8, 4 ], 1813, 40,
"baseqatrunc", "X7E33C064875D95CA" ],
[ "\033[2XDimsQATrunc\033[102X", "3.8-5", [ 3, 8, 5 ], 1889, 42,
"dimsqatrunc", "X7C6882DB837A9F5A" ],
[ "\033[2XFreqsQATrunc\033[102X", "3.8-6", [ 3, 8, 6 ], 1922, 42,
"freqsqatrunc", "X7FBA7F1D79DA883F" ],
[ "\033[2XSGrobnerModule\033[102X", "3.9-1", [ 3, 9, 1 ], 2013, 44,
"sgrobnermodule", "X860966487ED88A43" ],
[ "\033[2XBaseQM\033[102X", "3.9-2", [ 3, 9, 2 ], 2066, 45, "baseqm",
"X7E3160E67C504F37" ],
[ "\033[2XDimQM\033[102X", "3.9-3", [ 3, 9, 3 ], 2156, 46, "dimqm",
"X813E6A2C8709C9F3" ],
[ "\033[2XMulQM\033[102X", "3.9-4", [ 3, 9, 4 ], 2215, 47, "mulqm",
"X805FB42A7EEF510F" ],
[ "\033[2XStrongNormalFormNPM\033[102X", "3.9-5", [ 3, 9, 5 ], 2273, 48,
"strongnormalformnpm", "X87D51A8379C50A80" ],
[ "\033[2XInfoGBNP\033[102X", "4.2-1", [ 4, 2, 1 ], 22, 49, "infogbnp",
"X82D40B0E84383BBC" ],
[ "\033[2XInfoGBNPTime\033[102X", "4.3-1", [ 4, 3, 1 ], 69, 50,
"infogbnptime", "X7FAE244E80397B9A" ],
[ "\033[2XInstallNoncommutativeMonomialOrdering\033[102X", "5.4-1",
[ 5, 4, 1 ], 453, 58, "installnoncommutativemonomialordering",
"X867E06688761CB24" ],
[ "\033[2XIsNoncommutativeMonomialOrdering\033[102X", "5.4-2", [ 5, 4, 2 ],
500, 58, "isnoncommutativemonomialordering", "X804F724282FBA063" ],
[ "\033[2XLtFunctionListRep\033[102X", "5.4-3", [ 5, 4, 3 ], 508, 59,
"ltfunctionlistrep", "X7939A8DF8662C60C" ],
[ "\033[2XNextOrdering\033[102X", "5.4-4", [ 5, 4, 4 ], 516, 59,
"nextordering", "X7E74196084AE9036" ],
[ "\033[2XParentAlgebra\033[102X", "5.4-5", [ 5, 4, 5 ], 524, 59,
"parentalgebra", "X7B593F517FF63CDD" ],
[ "\033[2XLexicographicTable\033[102X", "5.4-6", [ 5, 4, 6 ], 530, 59,
"lexicographictable", "X850E1F2583F6E2A4" ],
[ "\033[2XLexicographicIndexTable\033[102X", "5.4-7", [ 5, 4, 7 ], 537, 59,
"lexicographicindextable", "X82F2AD2583B3CD48" ],
[ "\033[2XLexicographicPermutation\033[102X", "5.4-8", [ 5, 4, 8 ], 564,
60, "lexicographicpermutation", "X7E1C8F05791E283E" ],
[ "\033[2XAuxilliaryTable\033[102X", "5.4-9", [ 5, 4, 9 ], 573, 60,
"auxilliarytable", "X7EBBF4A07F46E0DD" ],
[ "\033[2XOrderingLtFunctionListRep\033[102X", "5.4-10", [ 5, 4, 10 ], 580,
60, "orderingltfunctionlistrep", "X8228458B86A85279" ],
[ "\033[2XOrderingGtFunctionListRep\033[102X", "5.4-10", [ 5, 4, 10 ], 580,
60, "orderinggtfunctionlistrep", "X8228458B86A85279" ],
[ "\033[2XNCMonomialLeftLengthLexicographicOrdering\033[102X", "5.5-1",
[ 5, 5, 1 ], 595, 60, "ncmonomialleftlengthlexicographicordering",
"X784587377CC4D41F" ],
[ "\033[2XNCMonomialLengthOrdering\033[102X", "5.5-2", [ 5, 5, 2 ], 609,
60, "ncmonomiallengthordering", "X7996C01681EC5585" ],
[ "\033[2XNCMonomialLeftLexicographicOrdering\033[102X", "5.5-3",
[ 5, 5, 3 ], 617, 61, "ncmonomialleftlexicographicordering",
"X7BD70B9C7998C0A7" ],
[ "\033[2XNCMonomialCommutativeLexicographicOrdering\033[102X", "5.5-4",
[ 5, 5, 4 ], 625, 61, "ncmonomialcommutativelexicographicordering",
"X7E06DFFA7C4E50C1" ],
[ "\033[2XNCMonomialWeightOrdering\033[102X", "5.5-5", [ 5, 5, 5 ], 635,
61, "ncmonomialweightordering", "X7B3183F67AEF3C67" ],
[ "\033[2XNCLessThanByOrdering\033[102X", "5.6-1", [ 5, 6, 1 ], 653, 61,
"nclessthanbyordering", "X7C81894D7A9E9E92" ],
[ "\033[2XNCGreaterThanByOrdering\033[102X", "5.6-2", [ 5, 6, 2 ], 662, 61,
"ncgreaterthanbyordering", "X84BC0A8478272486" ],
[ "\033[2XNCEquivalentByOrdering\033[102X", "5.6-3", [ 5, 6, 3 ], 671, 62,
"ncequivalentbyordering", "X817144A57BF6865A" ],
[ "\033[2XNCSortNP\033[102X", "5.6-4", [ 5, 6, 4 ], 720, 62, "ncsortnp",
"X86A2533780F2BC8C" ],
[ "\033[2XPatchGBNP\033[102X", "5.7-1", [ 5, 7, 1 ], 754, 63, "patchgbnp",
"X7B758C747AD2344B" ],
[ "\033[2XUnpatchGBNP\033[102X", "5.7-1", [ 5, 7, 1 ], 754, 63,
"unpatchgbnp", "X7B758C747AD2344B" ] ]
);
[ 0.111Quellennavigators
]
|
2026-03-28
|
