The Mather measure and a Large Deviation Principle for the Entropy Penalized Method

Abstract

We present a large deviation principle for the entropy penalized Mather problem when the Lagrangian L is generic (in this case the Mather measure μ is unique and the support of μ is the Aubry set). Consider, for each value of ε and h, the entropy penalized Mather problem \∫× L(x,v)dμ(x,v)+ε S[μ]\, where the entropy S is given by S[μ]=∫×μ(x,v)μ(x,v)∫μ(x,w)dwdxdv, and the minimization is performed over the space of probability densities μ(x,v) that satisfy the holonomy constraint It follows from D. Gomes and E. Valdinoci that there exists a minimizing measure με, h which converges to the Mather measure μ. We show a LDP ε,h0 ε με,h(A), where A⊂ TN×RN. The deviation function I is given by I(x,v)= L(x,v)+∇φ0(x)(v)-H0, where φ0 is the unique viscosity solution for L.