  
  [1X8 [33X[0;0YNumerical semigroups with maximal embedding dimension[133X[101X
  
  [33X[0;0YIf  [22XS[122X is a numerical semigroup and [22Xm[122X is its multiplicity (the least positive
  integer  belonging  to  it),  then  the  embedding  dimension  [22Xe[122X  of  [22XS[122X (the
  cardinality  of the minimal system of generators of [22XS[122X) is less than or equal
  to  [22Xm[122X.  We  say  that [22XS[122X has [13Xmaximal embedding dimension[113X (MED for short) when
  [22Xe=m[122X. The intersection of two numerical semigroups with the same multiplicity
  and  maximal  embedding  dimension  is again of maximal embedding dimension.
  Thus  we  define  the MED closure of a non-empty subset of positive integers
  [22XM={m  <  m_1  <  ⋯  <  m_n  <⋯}[122X with [22Xgcd(M)=1[122X as the intersection of all MED
  numerical semigroups with multiplicity [22Xm[122X.[133X
  
  [33X[0;0YGiven  a  MED  numerical  semigroup [22XS[122X, we say that [22XM={m_1 < ⋯< m_k}[122X is a MED
  system  of generators if the MED closure of [22XM[122X is [22XS[122X. Moreover, [22XM[122X is a minimal
  MED  generating system for [22XS[122X provided that every proper subset of [22XM[122X is not a
  MED  system  of  generators of [22XS[122X. Minimal MED generating systems are unique,
  and  in  general  are  smaller than the classical minimal generating systems
  (see [RGSGGB03]).[133X
  
  
  [1X8.1 [33X[0;0YNumerical semigroups with maximal embedding dimension[133X[101X
  
  [33X[0;0YThis  section  describes  the basic functions to deal with maximal embedding
  dimension numerical semigroups, and MED generating systems.[133X
  
  [1X8.1-1 IsMED[101X
  
  [33X[1;0Y[29X[2XIsMED[102X( [3XS[103X ) [32X property[133X
  [33X[1;0Y[29X[2XIsMEDNumericalSemigroup[102X( [3XS[103X ) [32X property[133X
  
  [33X[0;0Y[3XS[103X  is  a numerical semigroup. Returns true if [3XS[103X is a MED numerical semigroup
  and false otherwise.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XIsMED(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28Xtrue[128X[104X
    [4X[25Xgap>[125X [27XIsMEDNumericalSemigroup(NumericalSemigroup(3,5));[127X[104X
    [4X[28Xfalse[128X[104X
  [4X[32X[104X
  
  [1X8.1-2 MEDClosure[101X
  
  [33X[1;0Y[29X[2XMEDClosure[102X( [3XS[103X ) [32X operation[133X
  [33X[1;0Y[29X[2XMEDNumericalSemigroupClosure[102X( [3XS[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X is a numerical semigroup. Returns the MED closure of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs := MEDClosure(NumericalSemigroup(3,5));[127X[104X
    [4X[28X<Numerical semigroup>[128X[104X
    [4X[25Xgap>[125X [27XMinimalGenerators(s);[127X[104X
    [4X[28X[ 3, 5, 7 ][128X[104X
    [4X[25Xgap>[125X [27XMEDNumericalSemigroupClosure(NumericalSemigroup(3,5)) = s;[127X[104X
    [4X[28Xtrue[128X[104X
  [4X[32X[104X
  
  [1X8.1-3 MinimalMEDGeneratingSystemOfMEDNumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XMinimalMEDGeneratingSystemOfMEDNumericalSemigroup[102X( [3XS[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X is a MED numerical semigroup. Returns the minimal MED generating system of
  [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XMinimalMEDGeneratingSystemOfMEDNumericalSemigroup([127X[104X
    [4X[25X>[125X [27XNumericalSemigroup(3,5,7));[127X[104X
    [4X[28X[ 3, 5 ][128X[104X
  [4X[32X[104X
  
  
  [1X8.2 [33X[0;0YNumerical semigroups with the Arf property and Arf closures[133X[101X
  
  [33X[0;0YA numerical semigroup [22XS[122X is [13XArf[113X if for every [22Xx,y,z[122X in [22XS[122X with [22Xx≥ y≥ z[122X, one has
  that [22Xx+y-z∈ S[122X. Numerical semigroups with the Arf property are a special kind
  of numerical semigroups with maximal embedding dimension.[133X
  
  [33X[0;0YThe  intersection  of two Arf numerical semigroups is again Arf, and thus we
  can  consider the Arf closure of a set of nonnegative integers with greatest
  common  divisor  equal to one. Analogously as with MED numerical semigroups,
  we define Arf systems of generators and minimal Arf generating system for an
  Arf numerical semigroup. These are also unique (see [RGSGGB04]).[133X
  
  [1X8.2-1 IsArf[101X
  
  [33X[1;0Y[29X[2XIsArf[102X( [3XS[103X ) [32X property[133X
  [33X[1;0Y[29X[2XIsArfNumericalSemigroup[102X( [3XS[103X ) [32X property[133X
  
  [33X[0;0Y[3XS[103X  is a numerical semigroup. Returns true if [3XS[103X is an Arf numerical semigroup
  and false otherwise.[133X
  
  [33X[0;0YThis property implies [2XIsMED[102X ([14X8.1-1[114X) and [2XIsAcuteNumericalSemigroup[102X ([14X3.1-28[114X).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27X IsArf(NumericalSemigroup(3,5,7));[127X[104X
    [4X[28Xtrue[128X[104X
    [4X[25Xgap>[125X [27X IsArfNumericalSemigroup(NumericalSemigroup(3,7,11));[127X[104X
    [4X[28Xfalse[128X[104X
    [4X[25Xgap>[125X [27XIsMED(NumericalSemigroup(3,7,11));[127X[104X
    [4X[28Xtrue[128X[104X
  [4X[32X[104X
  
  [1X8.2-2 ArfClosure[101X
  
  [33X[1;0Y[29X[2XArfClosure[102X( [3XS[103X ) [32X operation[133X
  [33X[1;0Y[29X[2XArfNumericalSemigroupClosure[102X( [3XS[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X is a numerical semigroup. Returns the Arf closure of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs := NumericalSemigroup(3,7,11);;[127X[104X
    [4X[25Xgap>[125X [27Xt := ArfClosure(s);[127X[104X
    [4X[28X<Numerical semigroup>[128X[104X
    [4X[25Xgap>[125X [27XMinimalGenerators(t);[127X[104X
    [4X[28X[ 3, 7, 8 ][128X[104X
    [4X[25Xgap>[125X [27XArfNumericalSemigroupClosure(s) = t;[127X[104X
    [4X[28Xtrue[128X[104X
  [4X[32X[104X
  
  [1X8.2-3 ArfCharactersOfArfNumericalSemigroup[101X
  
  [33X[1;0Y[29X[2XArfCharactersOfArfNumericalSemigroup[102X( [3XS[103X ) [32X function[133X
  [33X[1;0Y[29X[2XMinimalArfGeneratingSystemOfArfNumericalSemigroup[102X( [3XS[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X  is  an Arf numerical semigroup. Returns the minimal Arf generating system
  of [3XS[103X. The current version of this algorithm is due to G. Zito.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs := NumericalSemigroup(3,7,8);[127X[104X
    [4X[28X<Numerical semigroup with 3 generators>[128X[104X
    [4X[25Xgap>[125X [27XArfCharactersOfArfNumericalSemigroup(s);[127X[104X
    [4X[28X[ 3, 7 ][128X[104X
    [4X[25Xgap>[125X [27XMinimalArfGeneratingSystemOfArfNumericalSemigroup(s);[127X[104X
    [4X[28X[ 3, 7 ][128X[104X
  [4X[32X[104X
  
  [1X8.2-4 ArfNumericalSemigroupsWithFrobeniusNumber[101X
  
  [33X[1;0Y[29X[2XArfNumericalSemigroupsWithFrobeniusNumber[102X( [3Xf[103X ) [32X function[133X
  
  [33X[0;0Y[3Xf[103X  is an integer. The output is the set of all Arf numerical semigroups with
  Frobenius number [3Xf[103X. The current version of this algorithm is due to G. Zito.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XArfNumericalSemigroupsWithFrobeniusNumber(10);[127X[104X
    [4X[28X[ <Numerical semigroup>, <Numerical semigroup>, <Numerical semigroup>,[128X[104X
    [4X[28X  <Numerical semigroup>, <Numerical semigroup>, <Numerical semigroup>,[128X[104X
    [4X[28X  <Numerical semigroup>, <Numerical semigroup>, <Numerical semigroup> ][128X[104X
    [4X[25Xgap>[125X [27XSet(last,MinimalGenerators);[127X[104X
    [4X[28X[ [ 3, 11, 13 ], [ 4, 11, 13, 14 ], [ 6, 9, 11, 13, 14, 16 ],[128X[104X
    [4X[28X  [ 6, 11, 13, 14, 15, 16 ], [ 7, 9, 11, 12, 13, 15, 17 ],[128X[104X
    [4X[28X  [ 7, 11, 12, 13, 15, 16, 17 ], [ 8, 11, 12, 13, 14, 15, 17, 18 ],[128X[104X
    [4X[28X  [ 9, 11, 12, 13, 14, 15, 16, 17, 19 ], [ 11 .. 21 ] ][128X[104X
  [4X[32X[104X
  
  [1X8.2-5 ArfNumericalSemigroupsWithFrobeniusNumberUpTo[101X
  
  [33X[1;0Y[29X[2XArfNumericalSemigroupsWithFrobeniusNumberUpTo[102X( [3Xf[103X ) [32X function[133X
  
  [33X[0;0Y[3Xf[103X  is an integer. The output is the set of all Arf numerical semigroups with
  Frobenius  number  less  than  or  equal  to  [3Xf[103X. The current version of this
  algorithm is due to G. Zito.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XLength(ArfNumericalSemigroupsWithFrobeniusNumberUpTo(10));[127X[104X
    [4X[28X46[128X[104X
  [4X[32X[104X
  
  [1X8.2-6 ArfNumericalSemigroupsWithGenus[101X
  
  [33X[1;0Y[29X[2XArfNumericalSemigroupsWithGenus[102X( [3Xg[103X ) [32X function[133X
  
  [33X[0;0Y[3Xg[103X  is  a  nonnegative  integer.  The  output is the set of all Arf numerical
  semigroups  with  genus equal to [3Xg[103X. The current version of this algorithm is
  due to G. Zito.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XLength(ArfNumericalSemigroupsWithGenus(10));[127X[104X
    [4X[28X21[128X[104X
  [4X[32X[104X
  
  [1X8.2-7 ArfNumericalSemigroupsWithGenusUpTo[101X
  
  [33X[1;0Y[29X[2XArfNumericalSemigroupsWithGenusUpTo[102X( [3Xg[103X ) [32X function[133X
  
  [33X[0;0Y[3Xg[103X  is  a  nonnegative  integer.  The  output is the set of all Arf numerical
  semigroups  with  genus less than or equal to [3Xg[103X. The current version of this
  algorithm is due to G. Zito.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XLength(ArfNumericalSemigroupsWithGenusUpTo(10));[127X[104X
    [4X[28X86[128X[104X
  [4X[32X[104X
  
  [1X8.2-8 ArfNumericalSemigroupsWithGenusAndFrobeniusNumber[101X
  
  [33X[1;0Y[29X[2XArfNumericalSemigroupsWithGenusAndFrobeniusNumber[102X( [3Xg[103X, [3Xf[103X ) [32X function[133X
  
  [33X[0;0Y[3Xf[103X  and [3Xg[103X are integers. The output is the set of all Arf numerical semigroups
  with  genus  [3Xg[103X  and  Frobenius  number  [3Xf[103X.  The  algorithm  is  explained in
  [GSHKR17].[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XArfNumericalSemigroupsWithGenusAndFrobeniusNumber(10,13);[127X[104X
    [4X[28X[ <Numerical semigroup>, <Numerical semigroup>, <Numerical semigroup>,[128X[104X
    [4X[28X  <Numerical semigroup>, <Numerical semigroup> ][128X[104X
    [4X[25Xgap>[125X [27XList(last,MinimalGenerators);[127X[104X
    [4X[28X[ [ 8, 10, 12, 14, 15, 17, 19, 21 ], [ 6, 10, 14, 15, 17, 19 ],[128X[104X
    [4X[28X  [ 5, 12, 14, 16, 18 ], [ 6, 9, 14, 16, 17, 19 ], [ 4, 14, 15, 17 ] ][128X[104X
  [4X[32X[104X
  
  
  [1X8.3 [33X[0;0YSaturated numerical semigroups[133X[101X
  
  [33X[0;0YA  numerical  semigroup  [22XS[122X is [13Xsaturated[113X if the following condition holds: [22Xs,
  s_1 , ... , s_r[122X in [22XS[122X are such that [22Xs_i ≤ s[122X for all [22Xi[122X in [22X{1, ... , r}[122X and [22Xz_1
  ,  ... , z_r[122X in [22XZ[122X are such that [22Xz_1 s_1 + ⋯ + z_r s_r≥ 0[122X, then [22Xs + z_1 s_1 +
  ⋯  +  z_r  s_r[122X  in  [22XS[122X.  Saturated numerical semigroups are a special kind of
  numerical semigroups with maximal embedding dimension.[133X
  
  [33X[0;0YThe  intersection  of two saturated numerical semigroups is again saturated,
  and  thus  we  can  consider  the  saturated closure of a set of nonnegative
  integers with greatest common divisor equal to one (see [RGS09]).[133X
  
  [1X8.3-1 IsSaturated[101X
  
  [33X[1;0Y[29X[2XIsSaturated[102X( [3XS[103X ) [32X property[133X
  [33X[1;0Y[29X[2XIsSaturatedNumericalSemigroup[102X( [3XS[103X ) [32X property[133X
  
  [33X[0;0Y[3XS[103X  is  a  numerical  semigroup.  Returns  [10Xtrue[110X if [3XS[103X is a saturated numerical
  semigroup and [10Xfalse[110X otherwise.[133X
  
  [33X[0;0YThis property implies [2XIsArf[102X ([14X8.2-1[114X).[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XIsSaturated(NumericalSemigroup(4,6,9,11));[127X[104X
    [4X[28Xtrue[128X[104X
    [4X[25Xgap>[125X [27XIsSaturatedNumericalSemigroup(NumericalSemigroup(8, 9, 12, 13, 15, 19 ));[127X[104X
    [4X[28Xfalse[128X[104X
  [4X[32X[104X
  
  [1X8.3-2 SaturatedClosure[101X
  
  [33X[1;0Y[29X[2XSaturatedClosure[102X( [3XS[103X ) [32X operation[133X
  [33X[1;0Y[29X[2XSaturatedNumericalSemigroupClosure[102X( [3XS[103X ) [32X function[133X
  
  [33X[0;0Y[3XS[103X is a numerical semigroup. Returns the saturated closure of [3XS[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27Xs := NumericalSemigroup(8, 9, 12, 13, 15);;[127X[104X
    [4X[25Xgap>[125X [27XSaturatedClosure(s);[127X[104X
    [4X[28X<Numerical semigroup>[128X[104X
    [4X[25Xgap>[125X [27XMinimalGenerators(last);[127X[104X
    [4X[28X[ 8 .. 15 ][128X[104X
    [4X[25Xgap>[125X [27XSaturatedNumericalSemigroupClosure(s) = SaturatedClosure(s);[127X[104X
    [4X[28Xtrue[128X[104X
  [4X[32X[104X
  
  [1X8.3-3 SaturatedNumericalSemigroupsWithFrobeniusNumber[101X
  
  [33X[1;0Y[29X[2XSaturatedNumericalSemigroupsWithFrobeniusNumber[102X( [3Xf[103X ) [32X function[133X
  
  [33X[0;0Y[3Xf[103X is an integer. The output is the set of all saturated numerical semigroups
  with Frobenius number [3Xf[103X.[133X
  
  [4X[32X  Example  [32X[104X
    [4X[25Xgap>[125X [27XSaturatedNumericalSemigroupsWithFrobeniusNumber(10);[127X[104X
    [4X[28X[ <Numerical semigroup with 3 generators>,[128X[104X
    [4X[28X  <Numerical semigroup with 4 generators>,[128X[104X
    [4X[28X  <Numerical semigroup with 6 generators>,[128X[104X
    [4X[28X  <Numerical semigroup with 6 generators>,[128X[104X
    [4X[28X  <Numerical semigroup with 7 generators>,[128X[104X
    [4X[28X  <Numerical semigroup with 8 generators>,[128X[104X
    [4X[28X  <Numerical semigroup with 9 generators>,[128X[104X
    [4X[28X  <Numerical semigroup with 11 generators> ][128X[104X
    [4X[25Xgap>[125X [27X List(last,MinimalGenerators);[127X[104X
    [4X[28X[ [ 3, 11, 13 ], [ 4, 11, 13, 14 ], [ 6, 9, 11, 13, 14, 16 ],[128X[104X
    [4X[28X  [ 6, 11, 13, 14, 15, 16 ], [ 7, 11, 12, 13, 15, 16, 17 ],[128X[104X
    [4X[28X  [ 8, 11, 12, 13, 14, 15, 17, 18 ], [ 9, 11, 12, 13, 14, 15, 16, 17, 19 ],[128X[104X
    [4X[28X  [ 11 .. 21 ] ][128X[104X
  [4X[32X[104X
  
