Closed range of ∂ on unbounded domains in Cn

Abstract

In this article, we establish a general sufficient condition for closed range of the Cauchy-Riemann operator ∂ in appropriately weighted L2 and L2-Sobolev spaces on (0,q)-forms for a fixed q on domains in Cn. The domains we consider may be neither bounded nor pseudoconvex, and our condition is a generalization of the classical Z(q) condition that we call weak Z(q). We provide examples that explain the necessity of working in weighted spaces both for closed range in L2 and even more critically, in L2-Sobolev spaces.