  
  [1X3 [33X[0;0YBasic operations with numerical semigroups[133X[101X
  
  [33X[0;0YThis chapter describes some basic functions to deal with notable elements in
  a  numerical  semigroup.  A  section  including  functions  to  test  Wilf's
  conjecture  is also included in this chapter. We provide some functions that
  allow  to  treat  a numerical semigroup as a list, and thus easy the task to
  access to its elements.[133X
  
  
  [1X3.1 [33X[0;0YInvariants[133X[101X
  
  [33X[0;0YIn  this  section  we  present  formulas  to  compute invariants and notable
  elements  of a numerical semigroup. Some tests depending on these invariants
  are  provided heres, like being an acute or an ordinary numerical semigroup.
  We   also  present  procedures  to  construct  iterators  from  a  numerical
  semigroup,  or  to retrieve several elemements from a numerical semigroup as
  if it where a list (with infinitely many elements).[133X
  
  [1X3.1-1 Multiplicity[101X
  
  [33X[1;0Y[29X[2XMultiplicity[102X( [3XNS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XMultiplicityOfNumericalSemigroup[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0Y[3XNS[103X  is  a  numerical semigroup. Returns the multiplicity of [3XNS[103X, which is the
  smallest  positive  integer  belonging  to  [3XNS[103X. Depending on the information
  known  about [3XNS[103X different methods are implemented. There are methods for the
  following  cases:  generators are known, Apéry set is known, it is a modular
  numerical semigroup, or it is proportionally modular (and thus is defined by
  a closed interval [RV08]).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XNumericalSemigroup(3,5);[127X[104X
    [4X[28X<Numerical semigroup with 2 generators>[128X[104X
    [4X[25Xgap>[125X [27XMultiplicity(last);[127X[104X
    [4X[28X3[128X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 7,53);[127X[104X
    [4X[28X<Modular numerical semigroup satisfying 7x mod 53 <= x >[128X[104X
    [4X[25Xgap>[125X [27XMultiplicityOfNumericalSemigroup(S);[127X[104X
    [4X[28X8[128X[104X
  [4X[32X[104X
  
  [1X3.1-2 Generators[101X
  
  [33X[1;0Y[29X[2XGenerators[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XGeneratorsOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XMinimalGenerators[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XMinimalGeneratingSystemOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XMinimalGeneratingSystem[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0Y[3XS[103X  is a numerical semigroup. [10XGeneratorsOfNumericalSemigroup[110X returns a set of
  generators  of  [10XS[110X, which may not be minimal. The shorter name [10XGenerators[110X may
  be used. [10XMinimalGeneratingSystemOfNumericalSemigroup[110X returns the minimal set
  of    generators    of   [10XS[110X.   The   shorter   names   [10XMinimalGenerators[110X   or
  [10XMinimalGeneratingSystem[110X may be used.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 5,53);[127X[104X
    [4X[28X<Modular numerical semigroup satisfying 5x mod 53 <= x >[128X[104X
    [4X[25Xgap>[125X [27XGenerators(S);[127X[104X
    [4X[28X[ 11, 12, 13, 32, 53 ][128X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup(3, 5, 53);[127X[104X
    [4X[28X<Numerical semigroup with 3 generators>[128X[104X
    [4X[25Xgap>[125X [27XGeneratorsOfNumericalSemigroup(S);[127X[104X
    [4X[28X[ 3, 5, 53 ][128X[104X
    [4X[25Xgap>[125X [27XMinimalGenerators(S);[127X[104X
    [4X[28X[ 3, 5 ][128X[104X
    [4X[25Xgap>[125X [27XMinimalGeneratingSystemOfNumericalSemigroup(S);[127X[104X
    [4X[28X[ 3, 5 ][128X[104X
    [4X[25Xgap>[125X [27XMinimalGeneratingSystem(S)=MinimalGeneratingSystemOfNumericalSemigroup(S);[127X[104X
    [4X[28Xtrue[128X[104X
    [4X[25Xgap>[125X [27Xs := NumericalSemigroup(3,5,7,15);[127X[104X
    [4X[28X<Numerical semigroup with 4 generators>[128X[104X
    [4X[25Xgap>[125X [27XHasGenerators(s);[127X[104X
    [4X[28Xtrue[128X[104X
    [4X[25Xgap>[125X [27XHasMinimalGenerators(s);[127X[104X
    [4X[28Xfalse[128X[104X
    [4X[25Xgap>[125X [27XMinimalGenerators(s);[127X[104X
    [4X[28X[ 3, 5, 7 ][128X[104X
    [4X[25Xgap>[125X [27XGenerators(s);[127X[104X
    [4X[28X[ 3, 5, 7, 15 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-3 EmbeddingDimension[101X
  
  [33X[1;0Y[29X[2XEmbeddingDimension[102X( [3XNS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XEmbeddingDimensionOfNumericalSemigroup[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XNS[110X  is  a  numerical  semigroup.  It  returns the cardinality of its minimal
  generating system.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs := NumericalSemigroup(3,5,7,15);[127X[104X
    [4X[28X<Numerical semigroup with 4 generators>[128X[104X
    [4X[25Xgap>[125X [27XEmbeddingDimension(s);[127X[104X
    [4X[28X3[128X[104X
    [4X[25Xgap>[125X [27XEmbeddingDimensionOfNumericalSemigroup(s);[127X[104X
    [4X[28X3[128X[104X
  [4X[32X[104X
  
  [1X3.1-4 SmallElements[101X
  
  [33X[1;0Y[29X[2XSmallElements[102X( [3XNS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XSmallElementsOfNumericalSemigroup[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XNS[110X is a numerical semigroup. It returns the list of small elements of [10XNS[110X. Of
  course,  the  time  consumed  to  return  a result may depend on the way the
  semigroup is given.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XSmallElements(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X[ 0, 3, 5 ][128X[104X
    [4X[25Xgap>[125X [27XSmallElementsOfNumericalSemigroup(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X[ 0, 3, 5 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-5 Length[101X
  
  [33X[1;0Y[29X[2XLength[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XNS[110X  is  a numerical semigroup. It returns the number of small elements of [10XNS[110X
  below  the conductor. This corresponds with the length of the semigroup ring
  modulo the conductor ideal. See also [2XLengthOfGoodSemigroup[102X ([14X12.2-14[114X).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XLength(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X2[128X[104X
  [4X[32X[104X
  
  [1X3.1-6 FirstElementsOfNumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XFirstElementsOfNumericalSemigroup[102X( [3Xn[103X, [3XNS[103X ) [32X function[133X
  
  [33X[0;0Y[10XNS[110X  is  a numerical semigroup. It returns the list with the first [3Xn[103X elements
  of [10XNS[110X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XFirstElementsOfNumericalSemigroup(2,NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X[ 0, 3 ][128X[104X
    [4X[25Xgap>[125X [27XFirstElementsOfNumericalSemigroup(10,NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X[ 0, 3, 5, 6, 7, 8, 9, 10, 11, 12 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-7 ElementsUpTo[101X
  
  [33X[1;0Y[29X[2XElementsUpTo[102X( [3XNS[103X, [3Xb[103X ) [32X function[133X
  
  [33X[0;0Y[3XNS[103X  is  a  numerical  semigroup,  [3Xb[103X a positve integer. It returns the set of
  elements of [3XNS[103X up to [3Xb[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xns := NumericalSemigroup(5,7);;[127X[104X
    [4X[25Xgap>[125X [27XSmallElements(ns);[127X[104X
    [4X[28X[ 0, 5, 7, 10, 12, 14, 15, 17, 19, 20, 21, 22, 24 ][128X[104X
    [4X[25Xgap>[125X [27XElementsUpTo(ns,18);[127X[104X
    [4X[28X[ 0, 5, 7, 10, 12, 14, 15, 17 ][128X[104X
    [4X[25Xgap>[125X [27XElementsUpTo(ns,27);[127X[104X
    [4X[28X[ 0, 5, 7, 10, 12, 14, 15, 17, 19, 20, 21, 22, 24, 25, 26, 27 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-8 \[ \][101X
  
  [33X[1;0Y[29X[2X\[ \][102X( [3XS[103X, [3Xr[103X ) [32X operation[133X
  
  [33X[0;0Y[3XS[103X  is a numerical semigroup and [3Xr[103X is an integer. It returns the [3Xr[103X-th element
  of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup(7,8,17);;[127X[104X
    [4X[25Xgap>[125X [27XS[53];[127X[104X
    [4X[28X68[128X[104X
  [4X[32X[104X
  
  [1X3.1-9 \{ \}[101X
  
  [33X[1;0Y[29X[2X\{ \}[102X( [3XS[103X, [3Xls[103X ) [32X operation[133X
  
  [33X[0;0Y[3XS[103X is a numerical semigroup and [3Xls[103X is a list of integers. It returns the list
  [3X[S[r] : r in ls][103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup(7,8,17);;[127X[104X
    [4X[25Xgap>[125X [27XS{[1..5]};[127X[104X
    [4X[28X[ 0, 7, 8, 14, 15 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-10 NextElementOfNumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XNextElementOfNumericalSemigroup[102X( [3XS[103X, [3Xr[103X ) [32X operation[133X
  
  [33X[0;0Y[3XS[103X  is  a numerical semigroup and [3Xr[103X is an integer. It returns the returns the
  least integer greater than [3Xr[103X belonging to [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup(7,8,17);;[127X[104X
    [4X[25Xgap>[125X [27XNextElementOfNumericalSemigroup(S,9);[127X[104X
    [4X[28X14[128X[104X
    [4X[25Xgap>[125X [27XNextElementOfNumericalSemigroup(16,S);[127X[104X
    [4X[28X17[128X[104X
    [4X[25Xgap>[125X [27XNextElementOfNumericalSemigroup(S,FrobeniusNumber(S))=Conductor(S);[127X[104X
    [4X[28Xtrue[128X[104X
  [4X[32X[104X
  
  [1X3.1-11 ElementNumber_NumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XElementNumber_NumericalSemigroup[102X( [3XS[103X, [3Xr[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X  is  a  numerical semigroup and [3Xr[103X is an integer. Both functions (which are
  like synonyms) return the [3Xr[103X-th element of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup(7,8,17);;[127X[104X
    [4X[25Xgap>[125X [27XElementNumber_NumericalSemigroup(S,53);[127X[104X
    [4X[28X68[128X[104X
    [4X[25Xgap>[125X [27XRthElementOfNumericalSemigroup(S,53);[127X[104X
    [4X[28X68[128X[104X
  [4X[32X[104X
  
  [1X3.1-12 RthElementOfNumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XRthElementOfNumericalSemigroup[102X( [3XS[103X, [3Xr[103X ) [32X operation[133X
  
  [33X[0;0YThis  operation  works  as  a  synonym  of  [2XElementNumber_NumericalSemigroup[102X
  ([14X3.1-11[114X).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup(7,8,17);;[127X[104X
    [4X[25Xgap>[125X [27XRthElementOfNumericalSemigroup(S,53);[127X[104X
    [4X[28X68[128X[104X
  [4X[32X[104X
  
  [1X3.1-13 NumberElement_NumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XNumberElement_NumericalSemigroup[102X( [3XS[103X, [3Xr[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X is a numerical semigroup and [3Xr[103X is an integer. It returns the position of [3Xr[103X
  in [3XS[103X (and [10Xfail[110X if the integer is not in the semigroup).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup(7,8,17);;[127X[104X
    [4X[25Xgap>[125X [27XNumberElement_NumericalSemigroup(S,68);[127X[104X
    [4X[28X53[128X[104X
  [4X[32X[104X
  
  [1X3.1-14 Iterator[101X
  
  [33X[1;0Y[29X[2XIterator[102X( [3XS[103X ) [32X operation[133X
  
  [33X[0;0Y[3XS[103X is a numerical semigroup. It returns an iterator over [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup(7,8,17);;[127X[104X
    [4X[25Xgap>[125X [27Xiter:=Iterator(S);[127X[104X
    [4X[28X<iterator>[128X[104X
    [4X[25Xgap>[125X [27XNextIterator(iter);[127X[104X
    [4X[28X0[128X[104X
    [4X[25Xgap>[125X [27XNextIterator(iter);[127X[104X
    [4X[28X7[128X[104X
    [4X[25Xgap>[125X [27XNextIterator(iter);[127X[104X
    [4X[28X8[128X[104X
  [4X[32X[104X
  
  [1X3.1-15 Difference[101X
  
  [33X[1;0Y[29X[2XDifference[102X( [3XS[103X, [3XT[103X ) [32X operation[133X
  [33X[1;0Y[29X[2XDifferenceOfNumericalSemigroups[102X( [3XS[103X, [3XT[103X ) [32X function[133X
  
  [33X[0;0Y[3XS, T[103X are numerical semigroups. The output is the set [22X[3XS[103X∖ [3XT[103X[122X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xns1 := NumericalSemigroup(5,7);;[127X[104X
    [4X[25Xgap>[125X [27Xns2 := NumericalSemigroup(7,11,12);;[127X[104X
    [4X[25Xgap>[125X [27XDifference(ns1,ns2);[127X[104X
    [4X[28X[ 5, 10, 15, 17, 20, 27 ][128X[104X
    [4X[25Xgap>[125X [27XDifference(ns2,ns1);[127X[104X
    [4X[28X[ 11, 18, 23 ][128X[104X
    [4X[25Xgap>[125X [27XDifferenceOfNumericalSemigroups(ns2,ns1);[127X[104X
    [4X[28X[ 11, 18, 23 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-16 AperyList[101X
  
  [33X[1;0Y[29X[2XAperyList[102X( [3XS[103X, [3Xn[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XAperyListOfNumericalSemigroupWRTElement[102X( [3XS[103X, [3Xn[103X ) [32X operation[133X
  
  [33X[0;0Y[3XS[103X  is  a  numerical semigroup and [3Xn[103X is a positive element of [3XS[103X. Computes the
  Apéry  list of [3XS[103X with respect to [3Xn[103X. It contains for every [22Xi∈ {0,...,[3Xn[103X-1}[122X, in
  the  [22Xi+1[122Xth  position, the smallest element in the semigroup congruent with [22Xi[122X
  modulo [3Xn[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 5,53);;[127X[104X
    [4X[25Xgap>[125X [27XAperyList(S,12);[127X[104X
    [4X[28X[ 0, 13, 26, 39, 52, 53, 54, 43, 32, 33, 22, 11 ][128X[104X
    [4X[25Xgap>[125X [27XAperyListOfNumericalSemigroupWRTElement(S,12);[127X[104X
    [4X[28X[ 0, 13, 26, 39, 52, 53, 54, 43, 32, 33, 22, 11 ][128X[104X
    [4X[25Xgap>[125X [27XFirst(S,x-> x mod 12 =1);[127X[104X
    [4X[28X13[128X[104X
  [4X[32X[104X
  
  [1X3.1-17 AperyList[101X
  
  [33X[1;0Y[29X[2XAperyList[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XAperyListOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0Y[3XS[103X  is a numerical semigroup. It computes the Apéry list of [3XS[103X with respect to
  the multiplicity of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XAperyList(NumericalSemigroup(5,7,11));[127X[104X
    [4X[28X[ 0, 11, 7, 18, 14 ][128X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 5,53);;[127X[104X
    [4X[25Xgap>[125X [27XAperyListOfNumericalSemigroup(S);[127X[104X
    [4X[28X[ 0, 12, 13, 25, 26, 38, 39, 51, 52, 53, 32 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-18 AperyList[101X
  
  [33X[1;0Y[29X[2XAperyList[102X( [3XS[103X, [3Xn[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XAperyListOfNumericalSemigroupWRTInteger[102X( [3XS[103X, [3Xm[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X is a numerical semigroup and [3Xm[103X is an integer. Computes the Apéry list of [3XS[103X
  with  respect to [3Xm[103X, that is, the set of elements [22Xx[122X in [3XS[103X such that [22Xx-[122X[3Xm[103X is not
  in    [3XS[103X.    If    [3Xm[103X   is   an   element   in   [3XS[103X,   then   the   output   of
  [10XAperyListOfNumericalSemigroupWRTInteger[110X,   as   sets,   is   the   same   as
  [10XAperyListOfNumericalSemigroupWRTElement[110X, though without side effects, in the
  sense  that this information is no longer used by the package. The output of
  [10XAperyList[110X is the same as [10XAperyListOfNumericalSemigroupWRTElement[110X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(10,13,19,27);;[127X[104X
    [4X[25Xgap>[125X [27XAperyList(s,11);[127X[104X
    [4X[28X[ 0, 10, 13, 19, 20, 23, 26, 27, 29, 32, 33, 36, 39, 42, 45, 46, 52, 55 ][128X[104X
    [4X[25Xgap>[125X [27XAperyListOfNumericalSemigroupWRTInteger(s,11);[127X[104X
    [4X[28X[ 0, 10, 13, 19, 20, 23, 26, 27, 29, 32, 33, 36, 39, 42, 45, 46, 52, 55 ][128X[104X
    [4X[25Xgap>[125X [27XLength(last);[127X[104X
    [4X[28X18[128X[104X
    [4X[25Xgap>[125X [27XAperyListOfNumericalSemigroupWRTInteger(s,10);[127X[104X
    [4X[28X[ 0, 13, 19, 26, 27, 32, 38, 45, 51, 54 ][128X[104X
    [4X[25Xgap>[125X [27XAperyListOfNumericalSemigroupWRTElement(s,10);[127X[104X
    [4X[28X[ 0, 51, 32, 13, 54, 45, 26, 27, 38, 19 ][128X[104X
    [4X[25Xgap>[125X [27XAperyList(s,10);[127X[104X
    [4X[28X[ 0, 51, 32, 13, 54, 45, 26, 27, 38, 19 ][128X[104X
    [4X[25Xgap>[125X [27XLength(last);[127X[104X
    [4X[28X10[128X[104X
  [4X[32X[104X
  
  [1X3.1-19 AperyListOfNumericalSemigroupAsGraph[101X
  
  [33X[1;0Y[29X[2XAperyListOfNumericalSemigroupAsGraph[102X( [3Xap[103X ) [32X function[133X
  
  [33X[0;0Y[3Xap[103X  is  the  Apéry  list of a numerical semigroup. This function returns the
  adjacency  list of the graph [22X(ap, E)[122X where the edge [22Xu -> v[122X is in [22XE[122X iff [22Xv - u[122X
  is in [22Xap[122X. The 0 is ignored.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(3,7);;[127X[104X
    [4X[25Xgap>[125X [27XAperyListOfNumericalSemigroupWRTElement(s,10);[127X[104X
    [4X[28X[ 0, 21, 12, 3, 14, 15, 6, 7, 18, 9 ][128X[104X
    [4X[25Xgap>[125X [27XAperyListOfNumericalSemigroupAsGraph(last);[127X[104X
    [4X[28X[ ,, [ 3, 6, 9, 12, 15, 18, 21 ],,, [ 6, 9, 12, 15, 18, 21 ],[128X[104X
    [4X[28X[ 7, 14, 21 ],, [ 9, 12, 15, 18, 21 ],,, [ 12, 15, 18, 21 ],,[128X[104X
    [4X[28X[ 14, 21 ], [ 15, 18, 21 ],,, [ 18, 21 ],,, [ 21 ] ][128X[104X
  [4X[32X[104X
  
  [1X3.1-20 KunzCoordinates[101X
  
  [33X[1;0Y[29X[2XKunzCoordinates[102X( [3XS[103X[, [3Xm[103X] ) [32X operation[133X
  [33X[1;0Y[29X[2XKunzCoordinatesOfNumericalSemigroup[102X( [3XS[103X[, [3Xm[103X] ) [32X function[133X
  
  [33X[0;0Y[3XS[103X  is  a  numerical  semigroup,  and [3Xm[103X is a nonzero element of [3XS[103X. The second
  argument is optional, and if missing it is assumed to be the multiplicity of
  [3XS[103X.[133X
  
  [33X[0;0YThen the Apéry set of [3Xm[103X in [3XS[103X has the form [22X[0,k_1m+1,...,k_m-1m+m-1][122X, and the
  output is the [22X(m-1)[122X-uple [22X[k_1,k_2,...,k_m-1][122X[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(3,5,7);[127X[104X
    [4X[28X<Numerical semigroup with 3 generators>[128X[104X
    [4X[25Xgap>[125X [27XKunzCoordinates(s);[127X[104X
    [4X[28X[ 2, 1 ][128X[104X
    [4X[25Xgap>[125X [27XKunzCoordinatesOfNumericalSemigroup(s);[127X[104X
    [4X[28X[ 2, 1 ][128X[104X
    [4X[25Xgap>[125X [27XKunzCoordinates(s,5);[127X[104X
    [4X[28X[ 1, 1, 0, 1 ][128X[104X
    [4X[25Xgap>[125X [27XKunzCoordinatesOfNumericalSemigroup(s,5);[127X[104X
    [4X[28X[ 1, 1, 0, 1 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-21 KunzPolytope[101X
  
  [33X[1;0Y[29X[2XKunzPolytope[102X( [3Xm[103X ) [32X function[133X
  
  [33X[0;0Y[3Xm[103X is a positive integer.[133X
  
  [33X[0;0YThe  Kunz coordinates of the semigroups with multiplicity [3Xm[103X are solutions of
  a  system  of  inequalities [22XAxge b[122X (see [CAGGB02]). The output is the matrix
  [22X(A|-b)[122X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XKunzPolytope(3);[127X[104X
    [4X[28X[ [ 1, 0, -1 ], [ 0, 1, -1 ], [ 2, -1, 0 ], [ -1, 2, 1 ] ][128X[104X
  [4X[32X[104X
  
  [1X3.1-22 CocycleOfNumericalSemigroupWRTElement[101X
  
  [33X[1;0Y[29X[2XCocycleOfNumericalSemigroupWRTElement[102X( [3XS[103X, [3Xm[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X  is  a numerical semigroup, and [3Xm[103X is a nonzero element of [3XS[103X. The output is
  the  matrix  [22Xh(i,j)=(w(i)+w(j)-w((i+j)mod  m))/m[122X, where [22Xw(i)[122X is the smallest
  element  in  [3XS[103X congruent with [22Xi[122X modulo [22Xm[122X (and thus it is in the Apéry set of
  [22Xm[122X), [GSHKR17].[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(3,5,7);;[127X[104X
    [4X[25Xgap>[125X [27XCocycleOfNumericalSemigroupWRTElement(s,3);[127X[104X
    [4X[28X[ [ 0, 0, 0 ], [ 0, 3, 4 ], [ 0, 4, 1 ] ][128X[104X
  [4X[32X[104X
  
  [1X3.1-23 FrobeniusNumber[101X
  
  [33X[1;0Y[29X[2XFrobeniusNumber[102X( [3XNS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XFrobeniusNumberOfNumericalSemigroup[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0YThe  largest nonnegative integer not belonging to a numerical semigroup [22XS[122X is
  the  [13XFrobenius  number[113X  of  [22XS[122X. If [22XS[122X is the set of nonnegative integers, then
  clearly its Frobenius number is [22X-1[122X, otherwise its Frobenius number coincides
  with the maximum of the gaps (or fundamental gaps) of [22XS[122X.[133X
  
  [33X[0;0Y[10XNS[110X  is  a  numerical  semigroup.  It  returns the Frobenius number of [10XNS[110X. Of
  course,  the  time  consumed  to  return  a result may depend on the way the
  semigroup is given or on the knowledge already produced on the semigroup.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XFrobeniusNumber(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X4[128X[104X
    [4X[25Xgap>[125X [27XFrobeniusNumberOfNumericalSemigroup(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X4[128X[104X
  [4X[32X[104X
  
  [1X3.1-24 Conductor[101X
  
  [33X[1;0Y[29X[2XConductor[102X( [3XNS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XConductorOfNumericalSemigroup[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0YThis is just a synonym of [10X FrobeniusNumberOfNumericalSemigroup[110X ([10XNS[110X)[22X+1[122X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XConductor(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X5[128X[104X
    [4X[25Xgap>[125X [27XConductorOfNumericalSemigroup(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X5[128X[104X
  [4X[32X[104X
  
  [1X3.1-25 PseudoFrobenius[101X
  
  [33X[1;0Y[29X[2XPseudoFrobenius[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XPseudoFrobeniusOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0YAn integer [22Xz[122X is a [13Xpseudo-Frobenius number[113X of [22XS[122X if [22Xz+S∖{0}⊆ S[122X.[133X
  
  [33X[0;0Y[10XS[110X  is  a numerical semigroup. It returns the set of pseudo-Frobenius numbers
  of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 5,53);[127X[104X
    [4X[28X<Modular numerical semigroup satisfying 5x mod 53 <= x >[128X[104X
    [4X[25Xgap>[125X [27XPseudoFrobenius(S);[127X[104X
    [4X[28X[ 21, 40, 41, 42 ][128X[104X
    [4X[25Xgap>[125X [27XPseudoFrobeniusOfNumericalSemigroup(S);[127X[104X
    [4X[28X[ 21, 40, 41, 42 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-26 Type[101X
  
  [33X[1;0Y[29X[2XType[102X( [3XNS[103X ) [32X operation[133X
  [33X[1;0Y[29X[2XTypeOfNumericalSemigroup[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0YStands for [10XLength(PseudoFrobeniusOfNumericalSemigroup (NS))[110X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 5,53);[127X[104X
    [4X[28X<Modular numerical semigroup satisfying 5x mod 53 <= x >[128X[104X
    [4X[25Xgap>[125X [27XType(S);[127X[104X
    [4X[28X4[128X[104X
    [4X[25Xgap>[125X [27XTypeOfNumericalSemigroup(S);[127X[104X
    [4X[28X4[128X[104X
  [4X[32X[104X
  
  [1X3.1-27 Gaps[101X
  
  [33X[1;0Y[29X[2XGaps[102X( [3XNS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XGapsOfNumericalSemigroup[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0YA  [13Xgap[113X  of a numerical semigroup [22XS[122X is a nonnegative integer not belonging to
  [22XS[122X. [10XNS[110X is a numerical semigroup. Both return the set of gaps of [10XNS[110X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XGaps(NumericalSemigroup(5,7,11));[127X[104X
    [4X[28X[ 1, 2, 3, 4, 6, 8, 9, 13 ][128X[104X
    [4X[25Xgap>[125X [27XGapsOfNumericalSemigroup(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28X[ 1, 2, 4 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-28 Weight[101X
  
  [33X[1;0Y[29X[2XWeight[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0YIf  [22Xl_1<⋯  <l_g[122X are the gaps of [10XNS[110X, then its (Weierstrass) weight is [22X∑_i=1^g
  (l_i-i)[122X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XWeight(NumericalSemigroup(4,5,6,7));[127X[104X
    [4X[28X0[128X[104X
    [4X[25Xgap>[125X [27XWeight(NumericalSemigroup(4,5));    [127X[104X
    [4X[28X9[128X[104X
  [4X[32X[104X
  
  [1X3.1-29 Deserts[101X
  
  [33X[1;0Y[29X[2XDeserts[102X( [3XNS[103X ) [32X operation[133X
  [33X[1;0Y[29X[2XDesertsOfNumericalSemigroup[102X( [3XNS[103X ) [32X function[133X
  
  [33X[0;0Y[3XNS[103X is a numerical semigroup. The output is the list with the runs of gaps of
  [3XNS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(3,5,7);;[127X[104X
    [4X[25Xgap>[125X [27XDeserts(s);[127X[104X
    [4X[28X[ [ 1, 2 ], [ 4 ] ][128X[104X
    [4X[25Xgap>[125X [27XDesertsOfNumericalSemigroup(s);[127X[104X
    [4X[28X[ [ 1, 2 ], [ 4 ] ][128X[104X
  [4X[32X[104X
  
  [1X3.1-30 IsOrdinary[101X
  
  [33X[1;0Y[29X[2XIsOrdinary[102X( [3XNS[103X ) [32X property[133X
  [33X[1;0Y[29X[2XIsOrdinaryNumericalSemigroup[102X( [3XNS[103X ) [32X property[133X
  
  [33X[0;0Y[3XNS[103X is a numerical semigroup. Dectects if the semigroup is ordinary, that is,
  with less than two deserts.[133X
  
  [33X[0;0YThis filter implies [2XIsAcuteNumericalSemigroup[102X ([14X3.1-31[114X).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(3,5,7);;[127X[104X
    [4X[25Xgap>[125X [27XIsOrdinary(s);[127X[104X
    [4X[28Xfalse[128X[104X
  [4X[32X[104X
  
  [1X3.1-31 IsAcute[101X
  
  [33X[1;0Y[29X[2XIsAcute[102X( [3XNS[103X ) [32X property[133X
  [33X[1;0Y[29X[2XIsAcuteNumericalSemigroup[102X( [3XNS[103X ) [32X property[133X
  
  [33X[0;0Y[3XNS[103X is a numerical semigroup. Dectects if the semigroup is acute, that is, it
  is  either  ordinary  or its last desert (the one with the Frobenius number)
  has less elements than the preceding one ([BA04]).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(3,5,7);;[127X[104X
    [4X[25Xgap>[125X [27XIsAcute(s);[127X[104X
    [4X[28Xtrue[128X[104X
  [4X[32X[104X
  
  [1X3.1-32 Holes[101X
  
  [33X[1;0Y[29X[2XHoles[102X( [3XNS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XHolesOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XS[110X  is a numerical semigroup. Returns the set of gaps [22Xx[122X of [10XS[110X such that [22XF(S)-x[122X
  is also a gap, where [22XF(S)[122X stands for the Frobenius number of [10XS[110X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(3,5);;[127X[104X
    [4X[25Xgap>[125X [27XHoles(s);[127X[104X
    [4X[28X[  ][128X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(3,5,7);;[127X[104X
    [4X[25Xgap>[125X [27XHolesOfNumericalSemigroup(s);[127X[104X
    [4X[28X[ 2 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-33 LatticePathAssociatedToNumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XLatticePathAssociatedToNumericalSemigroup[102X( [3XS[103X, [3Xp[103X, [3Xq[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XS[110X is a numerical semigroup and [10Xp,q[110X are two coprime elements in [10XS[110X.[133X
  
  [33X[0;0YIn  this setting [10XS[110X is an oversemigroup of [22X⟨ p,q⟩[122X, and consequently every gap
  of  [10XS[110X  is a gap of [22X⟨ p,q⟩[122X. If [22Xc[122X is the conductor of [22X⟨ p,q⟩[122X, then every gap [22Xg[122X
  of  [22X⟨  p,q⟩[122X  can  be  written uniquely as [22Xg=c-1-(ap+bp)[122X for some nonnegative
  integers [22Xa,b[122X. We say that [22X(a,b)[122X are the coordinates associated to [22Xg[122X.[133X
  
  [33X[0;0YThe  output  is  a  path  in  [22XN^2[122X such that the coordinates of the gaps of [22XS[122X
  correspond  exactly with the points in [22XN^2[122X that are between the path and the
  line [22Xax+by=c-1[122X. See [KW14].[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(16,17,71,72);;[127X[104X
    [4X[25Xgap>[125X [27XLatticePathAssociatedToNumericalSemigroup(s,16,17);[127X[104X
    [4X[28X[ [ 0, 14 ], [ 1, 13 ], [ 2, 12 ], [ 3, 11 ], [ 4, 10 ], [ 5, 9 ], [ 6, 8 ],[128X[104X
    [4X[28X  [ 7, 7 ], [ 8, 6 ], [ 9, 5 ], [ 10, 4 ], [ 11, 3 ], [ 12, 2 ], [ 13, 1 ],[128X[104X
    [4X[28X  [ 14, 0 ] ][128X[104X
  [4X[32X[104X
  
  [1X3.1-34 Genus[101X
  
  [33X[1;0Y[29X[2XGenus[102X( [3XNS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XGenusOfNumericalSemigroup[102X( [3XNS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XNS[110X is a numerical semigroup. It returns the number of gaps of [10XNS[110X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(16,17,71,72);;[127X[104X
    [4X[25Xgap>[125X [27XGenus(s);[127X[104X
    [4X[28X80[128X[104X
    [4X[25Xgap>[125X [27XGenusOfNumericalSemigroup(s);[127X[104X
    [4X[28X80[128X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 5,53);[127X[104X
    [4X[28X<Modular numerical semigroup satisfying 5x mod 53 <= x >[128X[104X
    [4X[25Xgap>[125X [27XGenus(S);[127X[104X
    [4X[28X26[128X[104X
  [4X[32X[104X
  
  [1X3.1-35 FundamentalGaps[101X
  
  [33X[1;0Y[29X[2XFundamentalGaps[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XFundamentalGapsOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XS[110X  The [13Xfundamental gaps[113X of [22XS[122X are those gaps that are maximal with respect to
  the  partial  order  induced  by  division  in  [22XN[122X.  It  returns  the  set of
  fundamental gaps of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XFundamentalGaps(NumericalSemigroup(5,7,11));[127X[104X
    [4X[28X[ 6, 8, 9, 13 ][128X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 5,53);[127X[104X
    [4X[28X<Modular numerical semigroup satisfying 5x mod 53 <= x >[128X[104X
    [4X[25Xgap>[125X [27XFundamentalGapsOfNumericalSemigroup(S);[127X[104X
    [4X[28X[ 16, 17, 18, 19, 27, 28, 29, 30, 31, 40, 41, 42 ][128X[104X
    [4X[25Xgap>[125X [27XGapsOfNumericalSemigroup(S);[127X[104X
    [4X[28X[ 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 14, 15, 16, 17, 18, 19, 20, 21, 27, 28, 29,[128X[104X
    [4X[28X  30, 31, 40, 41, 42 ][128X[104X
    [4X[25Xgap>[125X [27XGaps(NumericalSemigroup(5,7,11));[127X[104X
    [4X[28X[ 1, 2, 3, 4, 6, 8, 9, 13 ][128X[104X
  [4X[32X[104X
  
  [1X3.1-36 SpecialGaps[101X
  
  [33X[1;0Y[29X[2XSpecialGaps[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XSpecialGapsOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0YThe  [13Xspecial gaps[113X of a numerical semigroup [22XS[122X are those fundamental gaps such
  that  if they are added to the given numerical semigroup, then the resulting
  set  is  again a numerical semigroup. [10XS[110X is a numerical semigroup. It returns
  the special gaps of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XS := NumericalSemigroup("modular", 5,53);[127X[104X
    [4X[28X<Modular numerical semigroup satisfying 5x mod 53 <= x >[128X[104X
    [4X[25Xgap>[125X [27XSpecialGaps(S);[127X[104X
    [4X[28X[ 40, 41, 42 ][128X[104X
    [4X[25Xgap>[125X [27XSpecialGapsOfNumericalSemigroup(S);[127X[104X
    [4X[28X[ 40, 41, 42 ][128X[104X
  [4X[32X[104X
  
  
  [1X3.2 [33X[0;0YWilf's conjecture[133X[101X
  
  [33X[0;0YLet  [22XS[122X be a numerical semigroup, with conductor [22Xc[122X and embedding dimension [22Xe[122X.
  Denote by [22Xl[122X the cardinality of the set of elements in [22XS[122X smaller than [22Xc[122X. Wilf
  in  [Wil78]  asked whether or not [22Xl/cge 1/e[122X for all numerical semigroups. In
  this  section  we give some functions to experiment with this conjecture, as
  defined in [Eli18].[133X
  
  [1X3.2-1 WilfNumber[101X
  
  [33X[1;0Y[29X[2XWilfNumber[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XWilfNumberOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XS[110X  is  a  numerical  semigroup.  Let  [22Xc[122X, [22Xe[122X and [22Xl[122X be the conductor, embedding
  dimension  and  number of elements smaller than [22Xc[122X in [3XS[103X. Returns [22Xe l-c[122X, which
  was conjetured by Wilf to be nonnegative.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs := NumericalSemigroup(13,25,37);;[127X[104X
    [4X[25Xgap>[125X [27XWilfNumber(s);[127X[104X
    [4X[28X96[128X[104X
    [4X[25Xgap>[125X [27Xl:=NumericalSemigroupsWithGenus(10);;[127X[104X
    [4X[25Xgap>[125X [27XFiltered(l, s->WilfNumber(s)<0);[127X[104X
    [4X[28X[  ][128X[104X
    [4X[25Xgap>[125X [27XMaximum(Set(l, s->WilfNumberOfNumericalSemigroup(s)));[127X[104X
    [4X[28X70[128X[104X
  [4X[32X[104X
  
  [1X3.2-2 EliahouNumber[101X
  
  [33X[1;0Y[29X[2XEliahouNumber[102X( [3XS[103X ) [32X attribute[133X
  [33X[1;0Y[29X[2XTruncatedWilfNumberOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XS[110X  is  a  numerical  semigroup.  Let  [22Xc[122X,  [22Xm[122X,  [22Xs[122X  and  [22Xl[122X  be  the  conductor,
  multiplicity,  number  of  generators smaller than [22Xc[122X, and number of elements
  smaller  than  [22Xc[122X  in  [3XS[103X,  respectively.  Let  [22Xq[122X  and  [22Xr[122X  be the quotient and
  nonpositive  remainder of the division of [22Xc[122X by [22Xm[122X, that is, [22Xc=qm-r[122X. Returns [22Xs
  l-qd_q+r[122X,  where [22Xd_q[122X corresponds with the number of integers in [22X[c,c+m[[122X that
  are not minimal generators of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroupWithGivenElementsAndFrobenius([14,22,23],55);;[127X[104X
    [4X[25Xgap>[125X [27XEliahouNumber(s);[127X[104X
    [4X[28X-1[128X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(5,7,9);;[127X[104X
    [4X[25Xgap>[125X [27XTruncatedWilfNumberOfNumericalSemigroup(s);[127X[104X
    [4X[28X4[128X[104X
  [4X[32X[104X
  
  [1X3.2-3 ProfileOfNumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XProfileOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XS[110X is a numerical semigroup. Let [22Xc[122X and [22Xm[122X be the conductor and multiplicity of
  [3XS[103X,  respectively.  Let  [22Xq[122X and [22Xr[122X be the quotient and nonpositive remainder of
  the  division  of  [22Xc[122X  by  [22Xm[122X,  that  is,  [22Xc=qm-r[122X.  Returns a list of lists of
  integers,  each  list  is  the cardinality of [22XS ∩ [jm-r, (j+1)m-r[[122X with [22Xj[122X in
  [1..q-1].[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(5,7,9);;[127X[104X
    [4X[25Xgap>[125X [27XProfileOfNumericalSemigroup(s);[127X[104X
    [4X[28X[ 2, 1 ][128X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroupWithGivenElementsAndFrobenius([14,22,23],55);;[127X[104X
    [4X[25Xgap>[125X [27XProfileOfNumericalSemigroup(s);[127X[104X
    [4X[28X[ 3, 0, 0 ][128X[104X
  [4X[32X[104X
  
  [1X3.2-4 EliahouSlicesOfNumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XEliahouSlicesOfNumericalSemigroup[102X( [3XS[103X ) [32X attribute[133X
  
  [33X[0;0Y[10XS[110X is a numerical semigroup. Let [22Xc[122X and [22Xm[122X be the conductor and multiplicity of
  [3XS[103X,  respectively.  Let  [22Xq[122X and [22Xr[122X be the quotient and nonpositive remainder of
  the  division  of  [22Xc[122X  by  [22Xm[122X,  that  is,  [22Xc=qm-r[122X.  Returns a list of lists of
  integers,  each  list  is  the set [22XS ∩ [jm-r, (j+1)m-r[[122X with [22Xj[122X in [1..q]. So
  this is a partition of the set of small elements of [3XS[103X (without [22X0[122X and [22Xc[122X).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs:=NumericalSemigroup(5,7,9);;                                     [127X[104X
    [4X[25Xgap>[125X [27XEliahouSlicesOfNumericalSemigroup(s);[127X[104X
    [4X[28X[ [ 5, 7 ], [ 9, 10, 12 ] ][128X[104X
    [4X[25Xgap>[125X [27XSmallElements(s);[127X[104X
    [4X[28X[ 0, 5, 7, 9, 10, 12, 14 ][128X[104X
  [4X[32X[104X
  
