Quelle  sims1.xml   Sprache: XML

      See <Ref Attr="IteratorOfRightCongruences" Label="for a semigroup"/> to
      actually obtain the congruences counted by this function.
<Example><![CDATA[
gap> S := PartitionMonoid(2);
<regular bipartition *-monoid of size 15, degree 2 with 3 generators>
gap> NumberOfRightCongruences(S, 10);
86
gap> NumberOfLeftCongruences(S, 10);
86
gap> NumberOfRightCongruences(S, Size(S), [[S.1, S.2], [S.1, S.3]]);
1
gap> NumberOfLeftCongruences(S, Size(S), [[S.1, S.2], [S.1, S.3]]);
1
]]></Example>
    </Description>
  </ManSection>
<#/GAPDoc>

<#GAPDoc Label="IteratorOfRightCongruences">
<ManSection>
  <Oper Name = "IteratorOfRightCongruences"
    Arg = "S, n, extra"
    Label="for a semigroup, positive integer, and list or collection"/>
  <Oper Name = "IteratorOfLeftCongruences"
    Arg = "S, n, extra"
    Label="for a semigroup, positive integer, and list or collection"/>
  <Oper Name = "IteratorOfRightCongruences"
    Arg = "S, n"
    Label="for a semigroup, and a positive integer"/>
  <Oper Name = "IteratorOfLeftCongruences"
    Arg = "S, n"
    Label="for a semigroup, and a positive integer"/>
  <Attr Name = "IteratorOfRightCongruences"
    Arg = "S"
    Label="for a semigroup"/>
  <Oper Name = "IteratorOfLeftCongruences"
    Arg = "S"
    Label="for a semigroup"/>
  <Returns>An iterator.</Returns>
  <Description>
    <C>IteratorOfRightCongruences</C> returns an iterator where calling
    <Ref Oper="NextIterator" BookName="ref"/> returns the next right congruence
    of the semigroup <A>S</A> with at most <A>n</A> classes that contain the
    pairs in <A>extra</A>; <C>IteratorOfLeftCongruences</C> is defined dually
    for left congruences rather than right congruences. <P/>

    If the optional third argument <A>extra</A> is not present, then
    <C>IteratorOfRightCongruences</C> uses an empty list by default. <P/>

    If the optional second argument <A>n</A> is not present, then
    <C>IteratorOfRightCongruences</C> uses <C>Size(<A>S</A>)</C> by default.
    <P/>

    Note that the 2 and 3 argument variants of this function can be applied
    to infinite semigroups, but the 1 argument variant cannot. <P/>

    If the lattice of right or left congruences of <A>S</A> is known, then
    that is used by <C>IteratorOfRightCongruences</C>.  If this lattice is not
    known, then Sim's low index congruence algorithm is used.

    <Example><![CDATA[
gap> F := FreeMonoidAndAssignGeneratorVars("a", "b");
<free monoid on the generators [ a, b ]>
gap> R := [[a ^ 3, a], [b ^ 2, b], [(a * b) ^ 2, a]];
[ [ a^3, a ], [ b^2, b ], [ (a*b)^2, a ] ]
gap> S := F / R;
<fp monoid with 2 generators and 3 relations of length 14>
gap> NumberOfRightCongruences(S);
6
gap> it := IteratorOfRightCongruences(S);
<iterator>
gap> OutNeighbours(WordGraph(NextIterator(it)));
[ [ 1, 1 ] ]
gap> OutNeighbours(WordGraph(NextIterator(it)));
[ [ 2, 1 ], [ 2, 2 ] ]
gap> OutNeighbours(WordGraph(NextIterator(it)));
[ [ 2, 2 ], [ 2, 2 ] ]
gap> OutNeighbours(WordGraph(NextIterator(it)));
[ [ 2, 3 ], [ 2, 2 ], [ 2, 3 ] ]
gap> OutNeighbours(WordGraph(NextIterator(it)));
[ [ 2, 3 ], [ 2, 2 ], [ 3, 3 ] ]
gap> OutNeighbours(WordGraph(NextIterator(it)));
[ [ 2, 3 ], [ 2, 2 ], [ 4, 3 ], [ 4, 4 ] ]
gap> NextIterator(it);
fail]]></Example>
    </Description>
  </ManSection>
<#/GAPDoc>

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