Hearing pseudoconvexity in Lipschitz domains with holes via ∂

Abstract

Let = D where is a bounded domain with connected complement in Cn (or more generally in a Stein manifold) and D is relatively compact open subset of with connected complement in . We obtain characterizations of pseudoconvexity of and D through the vanishing or Hausdorff property of the Dolbeault cohomology groups on various function spaces. In particular, we show that if the boundaries of and D are Lipschitz and C2-smooth respectively, then both and D are pseudoconvex if and only if 0 is not in the spectrum of the ∂-Neumann Laplacian on (0, q)-forms for 1 q n-2 when n≥ 3; or 0 is not a limit point of the spectrum of the ∂-Neumannn Laplacian on (0, 1)-forms when n=2.