Stochastic homogenization of a class of quasiconvex viscous Hamilton-Jacobi equations in one space dimension

Abstract

We prove homogenization for a class of viscous Hamilton-Jacobi equations in the stationary and ergodic setting in one space dimension. Our assumptions include most notably the following: the Hamiltonian is of the form G(p) + β V(x,ω), the function G is coercive and strictly quasiconvex, G = 0, β>0, the random potential V takes values in [0,1] with full support and it satisfies a hill condition that involves the diffusion coefficient. Our approach is based on showing that, for every direction outside of a bounded interval (θ1(β),θ2(β)), there is a unique sublinear corrector with certain properties. We obtain a formula for the effective Hamiltonian and deduce that it is coercive, identically equal to β on (θ1(β),θ2(β)), and strictly monotone elsewhere.