On the smooth dependence of SRB measures for partially hyperbolic systems

Abstract

In this paper, we study the differentiability of SRB measures for partially hyperbolic systems. We show that for any s ≥ 1, for any integer ≥ 2, any sufficiently large r, any ∈ Cr(, ) such that the map f : 2 2, f(x,y) = ( x, y + (x)) is Cr-stably ergodic, there exists an open neighbourhood of f in Cr(2,2) such that any map in this neighbourhood has a unique SRB measure with Cs-1 density, which depends on the dynamics in a Cs fashion. We also construct a C∞ mostly contracting partially hyperbolic diffeomorphism f: 3 3 such that all f' in a C2 open neighbourhood of f possess a unique SRB measure μf' and the map f' μf' is strictly H\"older at f, in particular, non-differentiable. This gives a partial answer to Dolgopyat's Question 13.3 in Do1.