M\"uller-Zhang truncation for general linear constraints with first or second order potential

Abstract

Let B be a homogeneous differential operator of order l=1 or l=2. We show that a sequence of functions of the form (Buj)j converging in the L1-sense to a compact, convex set K can be modified into a sequence converging uniformly to this set provided that the derivatives of order l are uniformly bounded. We prove versions of our result on the whole space, an open domain, and for K varying uniformly continuously on an open, bounded domain. This is a conditional generalization of a theorem proved by S. M\"uller for sequences of gradients, cf. [6]. Moreover, a potential of order two for the linearized isentropic Euler system is constructed.