On the velocity averaging for equations with optimal heterogeneous rough coefficients

Abstract

Assume that (un) is a sequence of solutions to heterogeneous equations with rough coefficients and fractional derivatives, weakly converging to zero in Lp(d+m), with p>1. We prove that the sequence of averaged quantities (∫ () un(,) d) is strongly precompact in for any ∈ m, provided that restrictive non-degeneracy conditions are satisfied. These are fulfilled for elliptic, parabolic, fractional convection-diffusion equations, as well as for parabolic equations with a fractional time derivative. The main tool that we are using is an adapted version of H-distributions. As a consequence of the introduced methods, we obtain an optimal velocity averaging result in the p, p≥ 2, framework under the standard non-degeneracy conditions, as well as a connection between the H-measures and the H-distributions.