Embeddings for A-weakly differentiable functions on domains

Abstract

We prove that the critical embedding WA,1(B) Wk-1,nn-1 holds if and only if the k-homogeneous, linear differential operator A on Rn from RN to Rm has finite dimensional null-space. Here B is a ball in Rn and WA,1(B) denotes the space of maps u∈ L1(B,RN) such that the vector valued distribution Au is an integrable map. The result was previously known only for several examples of A. Our result contrasts the homogeneous embedding in full-space. Namely, Van Schaftingen proved that WA,1(Rn) Wk-1,nn-1 if and only if A is elliptic and cancelling. We show that this condition is (strictly) implied by A having finite dimensional null-space.