Approximation in higher-order Sobolev spaces and Hodge systems

Abstract

Let d≥ 2 be an integer, 1≤ l≤ d-1 and be a differential l-form on Rd with W1,d coefficients. It was proved by Bourgain and Brezis ([Theorem 5]MR2293957) that there exists a differential l-form on Rd with coefficients in L∞ W1,d such that d=d. Bourgain and Brezis also asked whether this result can be extended to differential forms with coefficients in the fractional Sobolev space Ws,p with sp=d. We give a positive answer to this question, in the more general context of Triebel-Lizorkin spaces, provided that d-≤ l≤ d-1, where is the largest positive integer such that <(p,d). The proof relies on an approximation result for functions in Ws,p by functions in Ws,p L∞, even though Ws,p does not embed into L∞ in this critical case.