English

Weighted equilibrium states for factor maps between subshifts

Dynamical Systems 2009-09-24 v1 Classical Analysis and ODEs

Abstract

Let π:XY\pi:X\to Y be a factor map, where (X,σX)(X,\sigma_X) and (Y,σY)(Y,\sigma_Y) are subshifts over finite alphabets. Assume that XX satisfies weak specification. Let \ba=(a1,a2)R2\ba=(a_1,a_2)\in \R^2 with a1>0a_1>0 and a20a_2\geq 0. Let ff be a continuous function on XX with sufficient regularity (H\"{o}lder continuity, for instance). We show that there is a unique shift invariant measure μ\mu on XX that maximizes μ(f)+a1hμ(σX)+a2hμπ1(σY)\mu(f)+a_1h_\mu(\sigma_X)+ a_2h_{\mu\circ \pi^{-1}}(\sigma_Y). In particular, taking f0f\equiv 0 we see that there is a unique invariant measure μ\mu on XX that maximizes the weighted entropy a1hμ(σX)+a2hμπ1(σY)a_1h_\mu(\sigma_X)+ a_2h_{\mu\circ \pi^{-1}}(\sigma_Y). This answers an open question raised by Gatzouras and Peres in \cite{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 kk-torus under a diagonal endomorphism.

Keywords

Cite

@article{arxiv.0909.4250,
  title  = {Weighted equilibrium states for factor maps between subshifts},
  author = {De-Jun Feng},
  journal= {arXiv preprint arXiv:0909.4250},
  year   = {2009}
}

Comments

30 pages

R2 v1 2026-06-21T13:49:37.727Z