Hydrodynamic limit of gradient exclusion processes with conductances

Abstract

Fix a strictly increasing right continuous with left limits function W: R R and a smooth function : [l,r] R, defined on some interval [l,r] of R, such that 0<b ' b-1. We prove that the evolution, on the diffusive scale, of the empirical density of exclusion processes, with conductances given by W, is described by the weak solutions of the non-linear differential equation ∂t = (d/dx)(d/dW) (). We derive some properties of the operator (d/dx)(d/dW) and prove uniqueness of weak solutions of the previous non-linear differential equation.