Canonical sheaves at isolated canonical Gorenstein singularities
Abstract
It is well known that the Grauert-Riemenschneider canonical sheaf KX of holomorphic square-integrable n-forms is a central tool in L2-theory for the ∂-operator on a singular complex space X of pure dimension n. It was shown a few years ago that a comprehensive L2-theory requires also the study of the sheaf KXs of holomorphic square-integrable n-forms with a Dirichlet boundary condition at the singular set of X. In the present paper, we describe and classify the behaviour of KXs in isolated canonical Gorenstein singularities, and give applications to the L2-theory for the ∂-operator on such spaces.
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