| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/GAP/pkg/semigroups/doc/ (Algebra von RWTH Aachen Version 4.15.1©) Datei vom 29.7.2025 mit Größe 4 kB |
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Quelle freeinverse.xml Sprache: XML |
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############################################################################# ## #W freeinverse.xml #Y Copyright (C) 2011-14 Julius Jonusas ## ## Licensing information can be found in the README file of this package. ## ############################################################################# <#GAPDoc Label="FreeInverseSemigroup" > <ManSection> <Func Name = "FreeInverseSemigroup" Arg = "rank[, name]" Label="for a given rank"/> <Func Name = "FreeInverseSemigroup" Arg = "name1, name2, ..." Label="for a list of names"/> <Func Name = "FreeInverseSemigroup" Arg = "names" Label="for various names"/> <Returns> A free inverse semigroup. </Returns> <Description> Returns a free inverse semigroup on <A>rank</A> generators, where <A>rank</A> is a positive integer. If <A>rank</A> is not specified, the number of <A>names</A> is used. If <C>S</C> is a free inverse semigroup, then the generators can be accessed by <C>S.1</C>, <C>S.2</C> and so on. <Example><![CDATA[ gap> S := FreeInverseSemigroup(7); <free inverse semigroup on the generators [ x1, x2, x3, x4, x5, x6, x7 ]> gap> S := FreeInverseSemigroup(7, "s"); <free inverse semigroup on the generators [ s1, s2, s3, s4, s5, s6, s7 ]> gap> S := FreeInverseSemigroup("a", "b", "c"); <free inverse semigroup on the generators [ a, b, c ]> gap> S := FreeInverseSemigroup(["a", "b", "c"]); <free inverse semigroup on the generators [ a, b, c ]> gap> S.1; a gap> S.2; b]]></Example> </Description> </ManSection> <#/GAPDoc> <#GAPDoc Label="IsFreeInverseSemigroupCategory"> <ManSection> <Filt Name = "IsFreeInverseSemigroupCategory" Arg = "obj" Type = "Category"/> <Description> Every free inverse semigroup in &GAP; created by <Ref Oper = "FreeInverseSemigroup" Label = "for a given rank"/> belongs to the category <C>IsFreeInverseSemigroup</C>. Basic operations for a free inverse semigroup are: <Ref Attr = "GeneratorsOfInverseSemigroup" BookName = "ref"/> and <Ref Attr = "GeneratorsOfSemigroup" BookName = "ref"/>. Elements of a free inverse semigroup belong to the category <Ref Filt = "IsFreeInverseSemigroupElement"/>. </Description> </ManSection> <#/GAPDoc> <#GAPDoc Label="IsFreeInverseSemigroup"> <ManSection> <Prop Name="IsFreeInverseSemigroup" Arg="S" /> <Returns> <K>true</K> or <K>false</K> </Returns> <Description> Attempts to determine whether the given semigroup <A>S</A> is a free inverse semigroup. </Description> </ManSection> <#/GAPDoc> <#GAPDoc Label="IsFreeInverseSemigroupElement"> <ManSection> <Filt Name="IsFreeInverseSemigroupElement" Type='Category'/> <Description> Every element of a free inverse semigroup belongs to the category <C>IsFreeInverseSemigroupElement</C>. </Description> </ManSection> <#/GAPDoc> <#GAPDoc Label="IsFreeInverseSemigroupElementCollection"> <ManSection> <Filt Name="IsFreeInverseSemigroupElementCollection" Type='Category'/> <Description> Every collection of elements of a free inverse semigroup belongs to the category <C>IsFreeInverseSemigroupElementCollection</C>. For example, every free inverse semigroup belongs to <C>IsFreeInverseSemigroupElementCollection</C>. </Description> </ManSection> <#/GAPDoc> <#GAPDoc Label="CanonicalForm" > <ManSection> <Attr Name = "CanonicalForm" Arg = "w" Label = "for a free inverse semigroup element" /> <Returns> A string. </Returns> <Description> Every element of a free inverse semigroup has a unique canonical form. If <A>w</A> is such an element, then <C>CanonicalForm</C> returns the canonical form of <A>w</A> as a string. <Example><![CDATA[ gap> S := FreeInverseSemigroup(3); <free inverse semigroup on the generators [ x1, x2, x3 ]> gap> x := S.1; y := S.2; x1 x2 gap> CanonicalForm(x ^ 3 * y ^ 3); "x1x1x1x2x2x2x2^-1x2^-1x2^-1x1^-1x1^-1x1^-1x1x1x1x2x2x2"]]></Example> </Description> </ManSection> <#/GAPDoc> <#GAPDoc Label="MinimalWord" > <ManSection> <Attr Name = "MinimalWord" Arg = "w" Label = "for free inverse semigroup element" /> <Returns> A string. </Returns> <Description> For an element <A>w</A> of a free inverse semigroup <C>S</C>, <C>MinimalWord</C> returns a word of minimal length equal to <A>w</A> in <C>S</C> as a string.<P/> Note that there maybe more than one word of minimal length which is equal to <A>w</A> in <C>S</C>. <Example><![CDATA[ gap> S := FreeInverseSemigroup(3); <free inverse semigroup on the generators [ x1, x2, x3 ]> gap> x := S.1; x1 gap> y := S.2; x2 gap> MinimalWord(x ^ 3 * y ^ 3); "x1*x1*x1*x2*x2*x2"]]></Example> </Description> </ManSection> <#/GAPDoc>
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2026-04-02