Preservation of Trees by semidirect Products

Abstract

We show that the semidirect product of a group C by A*D B is isomorphic to the free product of A C and B C amalgamated at D C, where A, B and C are arbitrary groups. Moreover, we apply this theorem to prove that any group G that acts without inversion on a tree T that possesses a segment for its quotient graph, such that, if the stabilizers of the vertex set \\,P,Q\,\ and edge y of a lift of \, in T are of the form GP\! H, GQ\! H and Gy\! H, then G is isomorphic to the semidirect product of H by (\,GP \,*Gy \,GQ \,). Using our results we conclude with a non-standard verification of the isomorphism between GL2(Z) and the free product of the dihedral groups D4 and D6 amalgamated at their Klein-four group.