∂ Sobolev-type inequality and an improved L2-estimate of ∂ on bounded strictly pseudoconvex domains

Abstract

We prove several Sobolev-type inequalities related to the ∂-operator on bounded domains in Cn, which can be viewed as a ∂-version of the classical Sobolev inequality and its various generalizations, and apply them to derive a generalization of the Sobolev Inequality with Trace in Rn. As applications to complex analysis, we get an integral form of Maximum Modulus Principle for holomorphic functions, and an improvement of H\"ormander's L2-estimate for ∂ on bounded strictly pseudoconvex domains.