Weighted equilibrium states for factor maps between subshifts

Abstract

Let π:X Y be a factor map, where (X,σX) and (Y,σY) are subshifts over finite alphabets. Assume that X satisfies weak specification. Let =(a1,a2)∈ 2 with a1>0 and a2≥ 0. Let f be a continuous function on X with sufficient regularity (H\"older continuity, for instance). We show that there is a unique shift invariant measure μ on X that maximizes μ(f)+a1hμ(σX)+ a2hμ π-1(σY). In particular, taking f 0 we see that there is a unique invariant measure μ on X that maximizes the weighted entropy a1hμ(σX)+ a2hμ π-1(σY). This answers an open question raised by Gatzouras and Peres in GaPe96. An extension is also given to high dimensional cases. As an application, we show the uniqueness of invariant measures with full Hausdorff dimension for certain affine invariant sets on the k-torus under a diagonal endomorphism.