Robust quasi-isometric embeddings inapproximable by Anosov representations

Abstract

Let K=R or C. For all but finitely many m∈ N, we exhibit the first examples of non-locally rigid, Zariski dense, robust quasi-isometric embeddings of hyperbolic groups in SLm(K) which are not limits of Anosov representations. As a consequence, we show that higher rank analogues of Sullivan's structural stabilty theorem and of the density theorem for Kleinian groups fail for Anosov representations in SLm(C), m≥ 30.