Diederich--Forn ss index and global regularity in the ∂--Neumann problem: domains with comparable Levi eigenvalues

Abstract

Let be a smooth bounded pseudoconvex domain in Cn. Let 1≤ q0≤ (n-1). We show that if q0--sums of eigenvalues of the Levi form are comparable, then if the Diederich--Forn ss index of is 1, the ∂--Neumann operators Nq and the Bergman projections Pq-1 are regular in Sobolev norms for q0≤ q≤ n. In particular, for domains in C2, Diederich--Forn ss index 1 implies global regularity in the ∂--Neumann problem.

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