Solutions of the divergence equation in Hardy and lipschitz spaces

Abstract

Given a bounded domain and f of zero integral, the existence of a vector fields vanishing on ∂ and satisfying =f has been widely studied because of its connection with many important problems. It is known that for f∈ Lp(), 1<p<∞, there exists a solution ∈ W1,p0(), and also that an analogous result is not true for p=1 or p=∞. The goal of this paper is to prove results for Hardy spaces when nn+1<p 1, and in the other limiting case, for bounded mean oscillation and Lipschitz spaces. As a byproduct of our analysis we obtain a Korn inequality for vector fields in Hardy-Sobolev spaces.

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