Rate of convergence in periodic homogenization of Hamilton-Jacobi equations: the convex setting

Abstract

We study the rate of convergence of uε, as ε 0+, to u in periodic homogenization of Hamilton-Jacobi equations. Here, uε and u are viscosity solutions to the oscillatory Hamilton-Jacobi equation and its effective equation equation* (C)ε cases utε+H(xε,Duε)=0 &in \ Rn × (0,∞), uε(x,0)=g(x) &on \ Rn, cases equation* and equation* (C) cases ut+H(Du)=0 &in \ Rn × (0,∞), u(x,0)=g(x) &on \ Rn, cases equation* respectively. We assume that the Hamiltonian H=H(y,p) is coercive and convex in the p variable and is Zn-periodic in the y variable, and the initial data g is bounded and Lipschitz continuous.