Homogenization of nonlinear scalar conservation laws

Abstract

We study the limit as 0 of the entropy solutions of the equation t + x[A(x,)] =0. We prove that the sequence two-scale converges towards a function u(t,x,y), and u is the unique solution of a limit evolution problem. The remarkable point is that the limit problem is not a scalar conservation law, but rather a kinetic equation in which the macroscopic and microscopic variables are mixed. We also prove a strong convergence result in L1loc.