Homogenization of an advection equation with locally stationary random coefficients

Abstract

In the paper we consider the solution of an advection equation with rapidly changing coefficients ∂t u+(1/)V(t-2,x/)·∇x u=0 for t<T and u(T,x)=u0(x), x∈d. Here >0 is some small parameter and the drift term (V(t,x))(t,x)∈ 1+d is assumed to be a d-dimensional, vector valued random field with incompressible spatial realizations. We prove that when the field is Gaussian, locally stationary, quasi-periodic in the x variable and strongly mixing in time the solutions u(t,x) converge in law, as 0, to u0(x(T;t,x)), where (x(s;t,x))s t is a diffusion satisfying x(t;t,x)=x. The averages of u(T,x) converge then to the solution of the corresponding Kolmogorov backward equation.