On the superadditive pressure for 1-typical, one-step, matrix-cocycle potentials

Abstract

Let (T,σ) be a subshift of finite type with primitive adjacency matrix T, :T → R a H\"older continuous potential, and A:T → GLd(R) a 1-typical, one-step cocycle. For t ∈ R consider the sequences of potentials t=(t,n)n ∈ N defined by t,n(x):=Sn (x) + t \|An(x)\|, \: ∀ n ∈ N. Using the family of transfer operators defined in this setting by Park and Piraino, for all t<0 sufficiently close to 0 we prove the existence of Gibbs-type measures for the superadditive sequences of potentials t. This extends the results of the well-understood subadditive case where t ≥ 0. Prior to this, Gibbs-type measures were only known to exist for t<0 in the conformal, the reducible, the positive, or the dominated, planar settings, in which case they are Gibbs measures in the classical sense. We further prove that the topological pressure function t Ptop(t,σ) is analytic in an open neighbourhood of 0 and has derivative given by the Lyapunov exponents of these Gibbs-type measures.