$L^2$-theory for the $\overline\partial$-operator on compact complex spaces
Abstract
Let be a singular Hermitian complex space of pure dimension . We use a resolution of singularities to give a smooth representation of the --cohomology of -forms on . The central tool is an -resolution for the Grauert-Riemenschneider canonical sheaf . As an application, we obtain a Grauert-Riemenschneider-type vanishing theorem for forms with values in almost positive line bundles. If is a Gorenstein space with canonical singularities, then we get also an -representation of the flabby cohomology of the structure sheaf . To understand also the --cohomology of -forms on , we introduce a new kind of canonical sheaf, namely the canonical sheaf of square-integrable holomorphic -forms with some (Dirichlet) boundary condition at the singular set of . If has only isolated singularities, then we use an -resolution for that sheaf and a resolution of singularities to give a smooth representation of the --cohomology of -forms.
Cite
@article{arxiv.1004.0396,
title = {$L^2$-theory for the $\overline\partial$-operator on compact complex spaces},
author = {Jean Ruppenthal},
journal= {arXiv preprint arXiv:1004.0396},
year = {2015}
}
Comments
34 pages