Quelle manual.six
Sprache: unbekannt
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[ [ "Title page", "0.0", [ 0, 0, 0 ], 1, 1, "title page", "X7D2C85EC87DD46E5"
],
[ "Copyright", "0.0-1", [ 0, 0, 1 ], 25, 2, "copyright",
"X81488B807F2A1CF1" ],
[ "Acknowledgements", "0.0-2", [ 0, 0, 2 ], 38, 2, "acknowledgements",
"X82A988D47DFAFCFA" ],
[ "Colophon", "0.0-3", [ 0, 0, 3 ], 108, 3, "colophon", "X7982162280BC7A61"
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[ "Table of Contents", "0.0-4", [ 0, 0, 4 ], 125, 4, "table of contents",
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[ "\033[1X\033[33X\033[0;-2YIntroduction\033[133X\033[101X", "1",
[ 1, 0, 0 ], 1, 7, "introduction", "X7DFB63A97E67C0A1" ],
[ "\033[1X\033[33X\033[0;-2YNumerical Semigroups\033[133X\033[101X", "2",
[ 2, 0, 0 ], 1, 10, "numerical semigroups", "X8324E5D97DC2A801" ],
[
"\033[1X\033[33X\033[0;-2YGenerating Numerical Semigroups\033[133X\033[101X\
", "2.1", [ 2, 1, 0 ], 7, 10, "generating numerical semigroups",
"X7E89D7EB7FCC2197" ],
[ "\033[1X\033[33X\033[0;-2YSome basic tests\033[133X\033[101X", "2.2",
[ 2, 2, 0 ], 309, 15, "some basic tests", "X7EF4254C81ED6665" ],
[
"\033[1X\033[33X\033[0;-2YBasic operations with numerical semigroups\033[13\
3X\033[101X", "3", [ 3, 0, 0 ], 1, 19,
"basic operations with numerical semigroups", "X7A9D13C778697F6C" ],
[ "\033[1X\033[33X\033[0;-2YInvariants\033[133X\033[101X", "3.1",
[ 3, 1, 0 ], 10, 19, "invariants", "X87AF9D4F7FD9E820" ],
[ "\033[1X\033[33X\033[0;-2YWilf's conjecture\033[133X\033[101X", "3.2",
[ 3, 2, 0 ], 656, 30, "wilfs conjecture", "X7EE22CA979CCAAB9" ],
[
"\033[1X\033[33X\033[0;-2YPresentations of Numerical Semigroups\033[133X\\
033[101X", "4", [ 4, 0, 0 ], 1, 32, "presentations of numerical semigroups",
"X7969F7F27AAF0BF1" ],
[
"\033[1X\033[33X\033[0;-2YPresentations of Numerical Semigroups\033[133X\\
033[101X", "4.1", [ 4, 1, 0 ], 17, 32, "presentations of numerical semigroups"
, "X7969F7F27AAF0BF1" ],
[
"\033[1X\033[33X\033[0;-2YBinomial ideals associated to numerical semigroup\
s\033[133X\033[101X", "4.2", [ 4, 2, 0 ], 165, 34,
"binomial ideals associated to numerical semigroups",
"X795E7F5682A6C8B3" ],
[
"\033[1X\033[33X\033[0;-2YUniquely Presented Numerical Semigroups\033[133X\\
033[101X", "4.3", [ 4, 3, 0 ], 202, 35,
"uniquely presented numerical semigroups", "X7D7EA20F818A5994" ],
[
"\033[1X\033[33X\033[0;-2YConstructing numerical semigroups from others\\
033[133X\033[101X", "5", [ 5, 0, 0 ], 1, 37,
"constructing numerical semigroups from others", "X8148F05A830EE2D5" ],
[ "\033[1X\033[33X\033[0;-2YAdding and removing elements of a numerical semi\
group\033[133X\033[101X", "5.1", [ 5, 1, 0 ], 8, 37,
"adding and removing elements of a numerical semigroup",
"X782F3AB97ACF84B8" ],
[
"\033[1X\033[33X\033[0;-2YIntersections, sums, quotients, dilatations, nume\
rical duplications and multiples by integers\033[133X\033[101X", "5.2",
[ 5, 2, 0 ], 56, 38,
"intersections sums quotients dilatations numerical duplications and mul\
tiples by integers", "X7DC65D547FB274D8" ],
[
"\033[1X\033[33X\033[0;-2YConstructing the set of all numerical semigroups \
containing a given numerical semigroup\033[133X\033[101X", "5.3",
[ 5, 3, 0 ], 216, 41,
"constructing the set of all numerical semigroups containing a given num\
erical semigroup", "X867D9A9A87CEB869" ],
[
"\033[1X\033[33X\033[0;-2YConstructing the set of numerical semigroups with\
given Frobenius number\033[133X\033[101X", "5.4", [ 5, 4, 0 ], 249, 41,
"constructing the set of numerical semigroups with given frobenius numbe\
r", "X8634CFB1848430DC" ],
[
"\033[1X\033[33X\033[0;-2YConstructing the set of numerical semigroups with\
given maximum primitive\033[133X\033[101X", "5.5", [ 5, 5, 0 ], 312, 42,
"constructing the set of numerical semigroups with given maximum primiti\
ve", "X8021419483185FE3" ],
[
"\033[1X\033[33X\033[0;-2YConstructing the set of numerical semigroups with\
genus g\033[133X\033[101X", "5.6", [ 5, 6, 0 ], 364, 43,
"constructing the set of numerical semigroups with genus g",
"X7D6635CB7D041A54" ],
[
"\033[1X\033[33X\033[0;-2YConstructing the set of numerical semigroups with\
a given set of pseudo-Frobenius numbers\033[133X\033[101X", "5.7",
[ 5, 7, 0 ], 417, 44,
"constructing the set of numerical semigroups with a given set of pseudo\
-frobenius numbers", "X8265233586477CC7" ],
[
"\033[1X\033[33X\033[0;-2YIrreducible numerical semigroups\033[133X\033[101\
X", "6", [ 6, 0, 0 ], 1, 47, "irreducible numerical semigroups",
"X83C597EC7FAA1C0F" ],
[
"\033[1X\033[33X\033[0;-2YIrreducible numerical semigroups\033[133X\033[101\
X", "6.1", [ 6, 1, 0 ], 28, 47, "irreducible numerical semigroups",
"X83C597EC7FAA1C0F" ],
[
"\033[1X\033[33X\033[0;-2YComplete intersection numerical semigroups\033[13\
3X\033[101X", "6.2", [ 6, 2, 0 ], 148, 49,
"complete intersection numerical semigroups", "X7D3FD9C8786B5D72" ],
[
"\033[1X\033[33X\033[0;-2YAlmost-symmetric numerical semigroups\033[133X\\
033[101X", "6.3", [ 6, 3, 0 ], 400, 54,
"almost-symmetric numerical semigroups", "X7998FF857F70C9A2" ],
[
"\033[1X\033[33X\033[0;-2YSeveral approaches generalizing the concept of sy\
mmetry\033[133X\033[101X", "6.4", [ 6, 4, 0 ], 492, 55,
"several approaches generalizing the concept of symmetry",
"X7FDC79A285EE016B" ],
[
"\033[1X\033[33X\033[0;-2YIdeals of numerical semigroups\033[133X\033[101X"
, "7", [ 7, 0, 0 ], 1, 57, "ideals of numerical semigroups",
"X83C2F0CF825B3869" ],
[
"\033[1X\033[33X\033[0;-2YDefinitions and basic operations\033[133X\033[101\
X", "7.1", [ 7, 1, 0 ], 15, 57, "definitions and basic operations",
"X84B6453A8015B40B" ],
[
"\033[1X\033[33X\033[0;-2YDecomposition into irreducibles\033[133X\033[101X\
", "7.2", [ 7, 2, 0 ], 617, 67, "decomposition into irreducibles",
"X7F09B9A085E226EF" ],
[ "\033[1X\033[33X\033[0;-2YBlow ups and closures\033[133X\033[101X",
"7.3", [ 7, 3, 0 ], 670, 68, "blow ups and closures",
"X81CD9B12807EEA85" ],
[ "\033[1X\033[33X\033[0;-2YPatterns for ideals\033[133X\033[101X", "7.4",
[ 7, 4, 0 ], 941, 73, "patterns for ideals", "X78F124CC82E7B585" ],
[
"\033[1X\033[33X\033[0;-2YGraded associated ring of numerical semigroup\\
033[133X\033[101X", "7.5", [ 7, 5, 0 ], 1087, 76,
"graded associated ring of numerical semigroup", "X79C6CE8D7EF1632D" ],
[ "\033[1X\033[33X\033[0;-2YNumerical semigroups with maximal embedding dime\
nsion\033[133X\033[101X", "8", [ 8, 0, 0 ], 1, 79,
"numerical semigroups with maximal embedding dimension",
"X7D2E70FC82D979D3" ],
[
"\033[1X\033[33X\033[0;-2YNumerical semigroups with maximal embedding dimen\
sion\033[133X\033[101X", "8.1", [ 8, 1, 0 ], 21, 79,
"numerical semigroups with maximal embedding dimension",
"X7D2E70FC82D979D3" ],
[
"\033[1X\033[33X\033[0;-2YNumerical semigroups with the Arf property and Ar\
f closures\033[133X\033[101X", "8.2", [ 8, 2, 0 ], 71, 80,
"numerical semigroups with the arf property and arf closures",
"X82E40EFD83A4A186" ],
[
"\033[1X\033[33X\033[0;-2YSaturated numerical semigroups\033[133X\033[101X"
, "8.3", [ 8, 3, 0 ], 273, 84, "saturated numerical semigroups",
"X7E6D857179E5BF1B" ],
[
"\033[1X\033[33X\033[0;-2YNonunique invariants for factorizations in numeri\
cal semigroups\033[133X\033[101X", "9", [ 9, 0, 0 ], 1, 86,
"nonunique invariants for factorizations in numerical semigroups",
"X7B6F914879CD505F" ],
[
"\033[1X\033[33X\033[0;-2YFactorizations in Numerical Semigroups\033[133X\\
033[101X", "9.1", [ 9, 1, 0 ], 39, 86,
"factorizations in numerical semigroups", "X7FDB54217B15148F" ],
[ "\033[1X\033[33X\033[0;-2YInvariants based on lengths\033[133X\033[101X",
"9.2", [ 9, 2, 0 ], 201, 89, "invariants based on lengths",
"X846FEE457D4EC03D" ],
[ "\033[1X\033[33X\033[0;-2YInvariants based on distances\033[133X\033[101X"
, "9.3", [ 9, 3, 0 ], 507, 94, "invariants based on distances",
"X84F5CA8D7B0F6C02" ],
[ "\033[1X\033[33X\033[0;-2YPrimality\033[133X\033[101X", "9.4",
[ 9, 4, 0 ], 737, 98, "primality", "X78EBC6A57B8167E6" ],
[
"\033[1X\033[33X\033[0;-2YHomogenization of Numerical Semigroups\033[133X\\
033[101X", "9.5", [ 9, 5, 0 ], 808, 100,
"homogenization of numerical semigroups", "X86735EEA780CECDA" ],
[ "\033[1X\033[33X\033[0;-2YDivisors, posets\033[133X\033[101X", "9.6",
[ 9, 6, 0 ], 891, 101, "divisors posets", "X7A54E9FD7D4CB18F" ],
[
"\033[1X\033[33X\033[0;-2YFeng-Rao distances and numbers\033[133X\033[101X"
, "9.7", [ 9, 7, 0 ], 1015, 103, "feng-rao distances and numbers",
"X82D8A59083FCDF46" ],
[
"\033[1X\033[33X\033[0;-2YNumerical semigroups with Ap\303\251ry sets havin\
g special factorization properties\033[133X\033[101X", "9.8", [ 9, 8, 0 ],
1052, 104,
"numerical semigroups with apa\251ry sets having special factorization p\
roperties", "X79A8A15087CEE8C1" ],
[
"\033[1X\033[33X\033[0;-2YPolynomials and numerical semigroups\033[133X\\
033[101X", "10", [ 10, 0, 0 ], 1, 106, "polynomials and numerical semigroups",
"X7D2C77607815273E" ],
[
"\033[1X\033[33X\033[0;-2YGenerating functions or Hilbert series\033[133X\\
033[101X", "10.1", [ 10, 1, 0 ], 12, 106,
"generating functions or hilbert series", "X808FAEE28572191C" ],
[
"\033[1X\033[33X\033[0;-2YSemigroup of values of algebraic curves\033[133X\\
033[101X", "10.2", [ 10, 2, 0 ], 200, 109,
"semigroup of values of algebraic curves", "X7EEF2A1781432A2D" ],
[
"\033[1X\033[33X\033[0;-2YSemigroups and Legendrian curves\033[133X\033[101\
X", "10.3", [ 10, 3, 0 ], 423, 113, "semigroups and legendrian curves",
"X84C670E1826F8B92" ],
[ "\033[1X\033[33X\033[0;-2YAffine semigroups\033[133X\033[101X", "11",
[ 11, 0, 0 ], 1, 114, "affine semigroups", "X7D92A1997D098A00" ],
[ "\033[1X\033[33X\033[0;-2YDefining affine semigroups\033[133X\033[101X",
"11.1", [ 11, 1, 0 ], 15, 114, "defining affine semigroups",
"X7E39DA7780D02DF5" ],
[ "\033[1X\033[33X\033[0;-2YGluings of affine semigroups\033[133X\033[101X",
"11.2", [ 11, 2, 0 ], 516, 122, "gluings of affine semigroups",
"X7F13DF9D7A4FB547" ],
[
"\033[1X\033[33X\033[0;-2YPresentations of affine semigroups\033[133X\033[1\
01X", "11.3", [ 11, 3, 0 ], 544, 123, "presentations of affine semigroups",
"X86A1018D7CB7BA81" ],
[
"\033[1X\033[33X\033[0;-2YFactorizations in affine semigroups\033[133X\033[\
101X", "11.4", [ 11, 4, 0 ], 736, 126, "factorizations in affine semigroups",
"X80A934B0826E21A6" ],
[
"\033[1X\033[33X\033[0;-2YFinitely generated ideals of affine semigroups\\
033[133X\033[101X", "11.5", [ 11, 5, 0 ], 955, 130,
"finitely generated ideals of affine semigroups", "X849D1ECC808F2BBA" ],
[ "\033[1X\033[33X\033[0;-2YGood semigroups\033[133X\033[101X", "12",
[ 12, 0, 0 ], 1, 135, "good semigroups", "X7A9271AC84C7277F" ],
[ "\033[1X\033[33X\033[0;-2YDefining good semigroups\033[133X\033[101X",
"12.1", [ 12, 1, 0 ], 23, 135, "defining good semigroups",
"X82B9F71084D2358E" ],
[ "\033[1X\033[33X\033[0;-2YNotable elements\033[133X\033[101X", "12.2",
[ 12, 2, 0 ], 111, 137, "notable elements", "X8431465B82643392" ],
[ "\033[1X\033[33X\033[0;-2YSymmetric good semigroups\033[133X\033[101X",
"12.3", [ 12, 3, 0 ], 472, 143, "symmetric good semigroups",
"X87FE42227F47666F" ],
[ "\033[1X\033[33X\033[0;-2YArf good closure\033[133X\033[101X", "12.4",
[ 12, 4, 0 ], 496, 143, "arf good closure", "X80A3D64386A152EB" ],
[ "\033[1X\033[33X\033[0;-2YGood ideals\033[133X\033[101X", "12.5",
[ 12, 5, 0 ], 527, 144, "good ideals", "X7FA8DCAC7951F7FB" ],
[ "\033[1X\033[33X\033[0;-2YExternal packages\033[133X\033[101X", "13",
[ 13, 0, 0 ], 1, 148, "external packages", "X84A2793F7A9F3E6A" ],
[ "\033[1X\033[33X\033[0;-2YUsing external packages\033[133X\033[101X",
"13.1", [ 13, 1, 0 ], 13, 148, "using external packages",
"X7BD18FC581F0C4D3" ],
[ "\033[1X\033[33X\033[0;-2YDot functions\033[133X\033[101X", "14",
[ 14, 0, 0 ], 1, 150, "dot functions", "X7B8D661F79E957A6" ],
[ "\033[1X\033[33X\033[0;-2YDot functions\033[133X\033[101X", "14.1",
[ 14, 1, 0 ], 4, 150, "dot functions", "X7B8D661F79E957A6" ],
[ "\033[1X\033[33X\033[0;-2YGeneralities\033[133X\033[101X", "a",
[ "A", 0, 0 ], 1, 156, "generalities", "X7AF8D94A7E56C049" ],
[ "\033[1X\033[33X\033[0;-2YB\303\251zout sequences\033[133X\033[101X",
"a.1", [ "A", 1, 0 ], 8, 156, "ba\251zout sequences",
"X7A5D608487A8C98F" ],
[
"\033[1X\033[33X\033[0;-2YPeriodic subadditive functions\033[133X\033[101X"
, "a.2", [ "A", 2, 0 ], 59, 157, "periodic subadditive functions",
"X7D3D347987953F44" ],
[ "\033[1X\033[33X\033[0;-2Y\"Random\" functions\033[133X\033[101X", "b",
[ "B", 0, 0 ], 1, 158, "random functions", "X86746B487B54A2D6" ],
[
"\033[1X\033[33X\033[0;-2YRandom functions for numerical semigroups\033[133\
X\033[101X", "b.1", [ "B", 1, 0 ], 7, 158,
"random functions for numerical semigroups", "X7F3FF11486C5CA4B" ],
[
"\033[1X\033[33X\033[0;-2YRandom functions for affine semigroups\033[133X\\
033[101X", "b.2", [ "B", 2, 0 ], 121, 160,
"random functions for affine semigroups", "X7D86D133840F6860" ],
[
"\033[1X\033[33X\033[0;-2YRandom functions for good semigroups\033[133X\\
033[101X", "b.3", [ "B", 3, 0 ], 179, 161,
"random functions for good semigroups", "X7DB89F2078A6095F" ],
[ "\033[1X\033[33X\033[0;-2YContributions\033[133X\033[101X", "c",
[ "C", 0, 0 ], 1, 162, "contributions", "X7F1146137C92FF0E" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by A. Sammartano\033[133X\\
033[101X", "c.1", [ "C", 1, 0 ], 12, 162,
"functions implemented by a. sammartano", "X8516272A7ACC7C02" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by C. O'Neill\033[133X\033[\
101X", "c.2", [ "C", 2, 0 ], 41, 162, "functions implemented by c. oneill",
"X821A695C7C0BDF59" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by K. Stokes\033[133X\033[1\
01X", "c.3", [ "C", 3, 0 ], 66, 163, "functions implemented by k. stokes",
"X7F4C9F8A7F7CDBC8" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by I. Ojeda and C. J. Moren\
o \303\201vila\033[133X\033[101X", "c.4", [ "C", 4, 0 ], 72, 163,
"functions implemented by i. ojeda and c. j. moreno a\201vila",
"X81478D2D862B6213" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by I. Ojeda\033[133X\033[10\
1X", "c.5", [ "C", 5, 0 ], 80, 163, "functions implemented by i. ojeda",
"X7C7DCFA37C8B5260" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by A. S\303\241nchez-R. Nav\
arro\033[133X\033[101X", "c.6", [ "C", 6, 0 ], 99, 163,
"functions implemented by a. sa\241nchez-r. navarro",
"X8549AE427919FFDC" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by G. Zito\033[133X\033[101\
X", "c.7", [ "C", 7, 0 ], 133, 164, "functions implemented by g. zito",
"X7FAE71B27B0E3889" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by A. Herrera-Poyatos\033[1\
33X\033[101X", "c.8", [ "C", 8, 0 ], 148, 164,
"functions implemented by a. herrera-poyatos", "X85067C3383705D0B" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by Benjamin Heredia\033[133\
X\033[101X", "c.9", [ "C", 9, 0 ], 158, 164,
"functions implemented by benjamin heredia", "X81EA8996840BD031" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by Juan Ignacio Garc\303\\
255a-Garc\303\255a\033[133X\033[101X", "c.10", [ "C", 10, 0 ], 165, 164,
"functions implemented by juan ignacio garca\255a-garca\255a",
"X7ED672F578B6FDC3" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by C. Cisto\033[133X\033[10\
1X", "c.11", [ "C", 11, 0 ], 172, 164, "functions implemented by c. cisto",
"X8348844883A78B05" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by N. Matsuoka\033[133X\\
033[101X", "c.12", [ "C", 12, 0 ], 185, 164,
"functions implemented by n. matsuoka", "X8130D17C7D6B5096" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by N. Maugeri\033[133X\033[\
101X", "c.13", [ "C", 13, 0 ], 191, 164, "functions implemented by n. maugeri"
, "X78ED0D447B74A9FF" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by H. Mart\303\255n Cruz\\
033[133X\033[101X", "c.14", [ "C", 14, 0 ], 214, 165,
"functions implemented by h. marta\255n cruz", "X8283CFD584D2E3EE" ],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by J. Angulo Rodr\303\255gu\
ez\033[133X\033[101X", "c.15", [ "C", 15, 0 ], 220, 165,
"functions implemented by j. angulo rodra\255guez", "X82919F927DC72A52"
],
[
"\033[1X\033[33X\033[0;-2YFunctions implemented by F. Strazzanti\033[133X\\
033[101X", "c.16", [ "C", 16, 0 ], 227, 165,
"functions implemented by f. strazzanti", "X7C4C93CD8200C606" ],
[ "Bibliography", "bib", [ "Bib", 0, 0 ], 1, 166, "bibliography",
"X7A6F98FD85F02BFE" ],
[ "References", "bib", [ "Bib", 0, 0 ], 1, 166, "references",
"X7A6F98FD85F02BFE" ],
[ "Index", "ind", [ "Ind", 0, 0 ], 1, 174, "index", "X83A0356F839C696F" ],
[ "\033[2XNumericalSemigroup\033[102X by generators", "2.1-1", [ 2, 1, 1 ],
40, 10, "numericalsemigroup by generators", "X7D74299B8083E882" ],
[ "\033[2XNumericalSemigroupByGenerators\033[102X", "2.1-1", [ 2, 1, 1 ],
40, 10, "numericalsemigroupbygenerators", "X7D74299B8083E882" ],
[ "\033[2XNumericalSemigroupBySubAdditiveFunction\033[102X", "2.1-2",
[ 2, 1, 2 ], 73, 11, "numericalsemigroupbysubadditivefunction",
"X86D9D2EE7E1C16C2" ],
[ "\033[2XNumericalSemigroup\033[102X by subadditive function", "2.1-2",
[ 2, 1, 2 ], 73, 11, "numericalsemigroup by subadditive function",
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[ Dauer der Verarbeitung: 0.18 Sekunden
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