Admissible metrics on compact K\"ahler varieties
Abstract
Let X be a normal compact K\"ahler variety, and F a coherent reflexive sheaf on X. We investigate the existence of admissible Hermitian metrics on F. If moreover F is slope stable, we also study the existence of admissible Hermitian-Yang-Mills metrics on it. The existence will hold if one can prove a uniform Sobolev inequality on singular spaces.
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