Compactness of the dbar-Neumann operator and commutators of the Bergman projection with continuous functions

Abstract

Let D be a bounded pseudoconvex domain in Cn, n≥ 2, 0≤ p≤ n, and 1≤ q≤ n-1. We show that compactness of the dbar-Neumann operator, Np,q+1, on square integrable (p,q+1)-forms is equivalent to compactness of the commutators [Pp,q, zj] on square integrable dbar-closed (p,q)-forms for 1≤ j≤ n where Pp,q is the Bergman projection on (p,q)-forms. We also show that compactness of the commutator of the Bergman projection with functions continuous on the closure percolates up in the dbar-complex on dbar-closed forms and square integrable holomorphic forms.