Quantitative homogenization for static contact Hamilton-Jacobi equations

Abstract

We characterize possible pairs (u,c)∈ C(Rnn,R)×R addressing the homogenization problem for Hamilton--Jacobi equations H(x, d u, u)=c, ( resp. H(x, d u, u)= u+c ) for all >0. Under a (not necessarily strict) monotonicity assumption on the Hamiltonian, we proposed certain criteria (based on the structure of Mather measures), under which all possible solutions u converge to a uniquely identified limit u∈ C(Rn,R) solving the effective equation \[ H( du,u)=c, ( resp. H(du,u)= u+c) \] as → 0+ with a uniform rate O().