Potential maps, Hardy spaces, and tent spaces on special Lipschitz domains

Abstract

Suppose that is the open region in Rn above a Lipschitz graph and let d denote the exterior derivative on Rn. We construct a convolution operator T which preserves support in , is smoothing of order 1 on the homogeneous function spaces, and is a potential map in the sense that dT is the identity on spaces of exact forms with support in . Thus if f is exact and supported in , then there is a potential u, given by u=Tf, of optimal regularity and supported in , such that du=f. This has implications for the regularity in homogeneous function spaces of the de Rham complex on with or without boundary conditions. The operator T is used to obtain an atomic characterisation of Hardy spaces Hp of exact forms with support in when n/(n+1)<p≤1. This is done via an atomic decomposition of functions in the tent spaces Tp(Rn×R+) with support in a tent T() as a sum of atoms with support away from the boundary of . This new decomposition of tent spaces is useful, even for scalar valued functions.