On regularity of ∂-solutions on aq domains with C2 boundary in complex manifolds

Abstract

We study regularity of solutions u to ∂ u=f on a relatively compact C2 domain D in a complex manifold of dimension n, where f is a (0,q) form. Assume that there are either (q+1) negative or (n-q) positive Levi eigenvalues at each point of boundary ∂ D. Under the necessary condition that a locally L2 solution exists on the domain, we show the existence of the solutions on the closure of the domain that gain 1/2 derivative when q=1 and f is in the H\"older-Zygmund space r( D) with r>1. For q>1, the same regularity for the solutions is achieved when ∂ D is either sufficiently smooth or of (n-q) positive Levi eigenvalues everywhere on ∂ D.

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