Cat1MorphismSourceHomomorphism ( C, D, phi )
Given a homomorphism from the source of
C to the source of
function defines the corresponding cat1-group morphism.
gap> GSC := SC.source;; gap> homsrc := GroupHomomorphismByImages( a4, GSC, [(1,2,3),(2,3,4)],[(4,5,6),(4,6,5)]);; gap> musrc := Cat1MorphismSourceHomomorphism( AC, SC, homsrc ); Morphism of cat1-groups <[a4 ==> a4]-->[c3^2
Xc2 ==> s3]> gap> IsCat1Morphism( musrc ); true gap> Cat1MorphismPrint( musrc ); Morphism of cat1-groups := : Source = cat1-group [a4 ==> a4] : Range = cat1-group [c3^2
Xc2 ==> s3] : Source homomorphism maps source generators to: [ (4,5,6), (4,6,5) ] : Range homomorphism maps range generators to: [ (4,5,6), (4,6,5) ]
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