Commensurations of the outer automorphism group of a universal Coxeter group
Abstract
This paper studies the rigidity properties of the abstract commensurator of the outer automorphism group of a universal Coxeter group of rank n, which is the free product Wn of n copies of Z/2Z. We prove that for n≥ 5 the natural map Out(Wn) Comm(Out(Wn)) is an isomorphism and that every isomorphism between finite index subgroups of Out(Wn) is given by a conjugation by an element of Out(Wn).
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