Robust quasi-isometric embeddings of virtually free groups

Abstract

Let k be a nonarchimedean local field. For any n≥ 3, we construct the first examples of robust quasi-isometric embeddings of non-elementary free groups into GLn(k) which are not limits of Anosov representations. If K=R,C, we exhibit examples of non-locally rigid, robust quasi-isometric embeddings of virtually free groups into GLn(K), n≥ 3, which are not limits of Anosov representations. Moreover, we exhibit a non-Anosov robust quasi-isometric embedding of the free semigroup Z Z+ into GL3(C), which is a limit of Anosov representations.

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