Equilibrium states of the pressure function for products of matrices
Abstract
Let \Mi\i=1 be a non-trivial family of d× d complex matrices, in the sense that for any n∈ , there exists i1... in∈ \1,..., \n such that Mi1... Min≠ 0. Let P (0,∞) be the pressure function of \Mi\i=1. We show that for each q>0, there are at most d ergodic q-equilibrium states of P, and each of them satisfies certain Gibbs property.
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