A Modified Morrey-Kohn-H\"ormander Identity and Applications
Complex Variables
2018-12-18 v2
Abstract
We prove a modified form of the classical Morrey-Kohn-H\"ormander identity, adapted to pseudoconcave boundaries. Applying this result to an annulus between two bounded pseudoconvex domains in , where the inner domain has boundary, we show that the Dolbeault cohomology group in bidegree vanishes if and is Hausdorff and infinite-dimensional if , so that the Cauchy-Riemann operator has closed range in each bidegree. As a dual result, we prove that the Cauchy-Riemann operator is solvable in the Sobolev space on any pseudoconvex domain with boundary. We also generalize our results to annuli between domains which are weakly -convex in the sense of Ho for appropriate values of .
Cite
@article{arxiv.1811.03715,
title = {A Modified Morrey-Kohn-H\"ormander Identity and Applications},
author = {Debraj Chakrabarti and Phillip S. Harrington},
journal= {arXiv preprint arXiv:1811.03715},
year = {2018}
}
Comments
Version 2: some minor typos have been fixed