Statistical properties of equilibrium states for fiber-bunched matrix cocycles and applications

Abstract

We contribute to the thermodynamic formalism of H\"older continuous fiber-bunched matrix cocycles, Anosov diffeomorphisms, and hyperbolic repellers. Specifically, we prove that 1-typical fiber-bunched cocycles A over topologically mixing subshifts of finite type admit a unique Gibbs equilibrium state μt associated with the non-additive family of potentials \t \|An\|\n ∈ N, for a range of parameters t ∈ (-t*, +∞), where t* > 0. Furthermore, these equilibrium states are -mixing, therefore weak Bernoulli. In addition, these results allow us to derive consequences for the thermodynamic formalism of open sets of hyperbolic repellers and Anosov diffeomorphisms. In particular, it provides a positive answer to a conjecture posed by Gatzouras and Peres for C1-open sets of α-fiber-bunched hyperbolic repellers.