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# This file contains obsolet functions which are to be kept during a while for
# compatibility
# WARNING: the manual must be updated before removing the functions
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##
#F GeneratorsOfNumericalSemigroupNC(S)
##
## Returns a set of generators of the numerical
## semigroup S.
##
#####From version 0.980 is just a synonym of the check version of the function
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DeclareSynonym( "GeneratorsOfNumericalSemigroupNC",GeneratorsOfNumericalSemigroup);
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##
#F ReducedSetOfGeneratorsOfNumericalSemigroup(arg)
####From version 0.980 is a synonym of MinimalGenerating...
##
## Returns a set with possibly fewer generators than those recorded in <C>S!.generators</C>. It changes <C>S!.generators</C> to the set returned.
##The function has 1 to 3 arguments. One of them a numerical semigroup. Then an argument is a boolean (<E>true</E> means that all the elements not belonging to the Apery set with respect to the multiplicity are removed; the default is "false") and another argument is a positive integer <M>n</M> (meaning that generators that can be written as the sum of <n> or less generators are removed; the default is "2"). The boolean or the integer may not be present. If a minimal generating set for <M>S</M> is known or no generating set is known, then the minimal generating system is returned.
##
#DeclareGlobalFunction("ReducedSetOfGeneratorsOfNumericalSemigroup");
DeclareSynonym("ReducedSetOfGeneratorsOfNumericalSemigroup",MinimalGeneratingSystemOfNumericalSemigroup);
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## the name "RandomNumericalSemigroupWithPseudoFrobeniusNumbers" should be removed in a further version... (it is not documented)
DeclareSynonym("RandomNumericalSemigroupWithPseudoFrobeniusNumbers",ANumericalSemigroupWithPseudoFrobeniusNumbers);
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##
#F NumericalSemigroupByMinimalGenerators(arg)
##
## Returns the numerical semigroup minimally generated by arg.
## If the generators given are not minimal, the minimal ones
## are computed and used.
##
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DeclareGlobalFunction( "NumericalSemigroupByMinimalGenerators" );
#A
#DeclareAttribute( "MinimalGeneratorsNS", IsNumericalSemigroup);
#DeclareAttribute( "MinimalGenerators", IsNumericalSemigroup);
DeclareSynonymAttr( "IsNumericalSemigroupByMinimalGenerators", HasMinimalGenerators);
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##
#F NumericalSemigroupByMinimalGeneratorsNC(arg)
##
## Returns the numerical semigroup minimally generated by arg.
## No test is made about args' minimality.
##
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DeclareGlobalFunction( "NumericalSemigroupByMinimalGeneratorsNC" );
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##
#F FortenTruncatedNCForNumericalSemigroups(l)
##
## l contains the list of coefficients of a
## single linear equation. FortenTruncatedNCForNumericalSemigroups
## gives a minimal generator
## of the affine semigroup of nonnegative solutions of this equation
## with the first coordinate equal to one.
##
## Used for computing minimal presentations.
##
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DeclareGlobalFunction("FortenTruncatedNCForNumericalSemigroups");
## The NC version of CatenaryDegreeOfElementNS works well for numbers
## bigger than the Frobenius number
DeclareGlobalFunction( "CatenaryDegreeOfElementInNumericalSemigroup_NC" );
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##
#F IsConnectedGraphNCForNumericalSemigroups(l)
##
## This function returns true if the graph is connected an false otherwise
##
## It is part of the NumericalSGPS package just to avoid the need of using
## other graph packages only to this effect. It is used in
## CatenaryDegreeOfElementNS
##
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DeclareGlobalFunction("IsConnectedGraphNCForNumericalSemigroups");
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