The H\"older exponent of Anosov limit maps

Abstract

Let be a non-elementary word hyperbolic group and da, a>1, a visual metric on its Gromov boundary ∂∞. For an 1-Anosov representation : → GLd(K), where K=R or C, we calculate the H\"older exponent of the Anosov limit map 1:(∂∞, da)→ (P(Kd),dP) of in terms of the moduli of eigenvalues of elements in () and the stable translation length on . If is either irreducible or 1(∂∞) spans Kd and is \1,2\-Anosov, then 1 attains its H\"older exponent. We also provide an analogous calculation for the exponent of the inverse limit map of (1,1,2)-hyperconvex representations. Finally, we exhibit examples of non semisimple 1-Anosov representations of surface groups in SL4(R) whose Anosov limit map in P(R4) does not attain its H\"older exponent.