On factors of Gibbs measures for almost additive potentials

Abstract

Let (X, σX), (Y, σY) be one-sided subshifts with the specification property and π:X→ Y a factor map. Let μ be a unique invariant Gibbs measure for a sequence of continuous functions =\ fn\n=1∞ on X, which is an almost additive potential with bounded variation. We show that πμ is also a unique invariant Gibbs measure for a sequence of continuous functions =\ gn\n=1∞ on Y. When (X, σX) is a full shift, we characterize and μ by using relative pressure. This almost additive potential is a generalization of a continuous function found by Pollicott and Kempton in their work on the images of Gibbs measures for continuous functions under factor maps. We also consider the following question: Given a unique invariant Gibbs measure for a sequence of continuous functions 2 on Y, can we find an invariant Gibbs measure μ for a sequence of continuous functions 1 on X such that πμ=? We show that such a measure exists under a certain condition. If (X, σX) is a full shift and is a unique invariant Gibbs measure for a function in the Bowen class, then we can find a preimage μ of which is a unique invariant Gibbs measure for a function in the Bowen class.