A representation of Out(Fn) by counting subwords of cyclic words
Abstract
We generalize the combinatorial approaches of Rapaport and Higgins--Lyndon to the Whitehead algorithm. We show that for every automorphism of a free group F and every word u∈ F there exists a finite multiset of words Su, satisfying the following property: For every cyclic word w, the number of times u appears as a subword of (w) depends only on the appearances of words in Su, as subwords of w. We use this fact to construct a faithful representation of Out(Fn) on an inverse limit of Z-modules, so that each automorphism is represented by sequence of finite rectangular matrices, which can be seen as successively better approximations of the automorphism.
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