Velocity averaging -- a general framework

Abstract

We prove that the sequence of averaged quantities ∫mun(,) ()d, is strongly precompact in , where ∈ m, and un∈ m; s, s≥ 2, are weak solutions to differential operator equations with variable coefficients. In particular, this includes differential operators of hyperbolic, parabolic or ultraparabolic type, but also fractional differential operators. If s>2 then the coefficients can be discontinuous with respect to the space variable ∈ d, otherwise, the coefficients are continuous functions. In order to obtain the result we prove a representation theorem for an extension of the H-measures.