Quasi-isometric embeddings inapproximable by Anosov representations

Abstract

We construct examples of quasi-isometric embeddings of word hyperbolic groups into SL(d,R) for d ≥slant 5 which are not limits of Anosov representations into SL(d,R). As a consequence, we conclude that an analogue of the density theorem for PSL(2,C) does not hold for SL(d,R) when d ≥slant 5.