Sufficient conditions for compactness of the ∂-Neumann operator on high level forms

Abstract

By establishing a unified estimate of the twisted Kohn-Morrey-H\"ormander estimate and the q-pseudoconvex Ahn-Zampieri estimate, we discuss variants of Property (Pq) of Catlin and Property (Pq) of McNeal on the boundary of a smooth pseudoconvex domain in Cn for certain high level forms. These variant conditions on the one side, imply L2-compactness of the ∂-Neumann operator on the associated domain, on the other side, are different from the classical Property (Pq) and Property (Pq). As an application of our result, we show that if the Hausdorff (2n-2)-dimensional measure of the weakly pseudoconvex points on the boundary of a smooth bounded pseudoconvex domain is zero, then the ∂-Neumann operator Nn-1 is L2-compact on (0,n-1)-level forms. This result generalizes Boas and Sibony's results on (0,1)-level forms.