Non-Commutative Resolutions of Toric Varieties
Abstract
Let R be the coordinate ring of an affine toric variety. We show that the endomorphism ring EndR( A), where A is the (finite) direct sum of all (isomorphism classes of) conic R-modules, has finite global dimension. Furthermore, we show that EndR( A) is a non-commutative crepant resolution if and only if the toric variety is simplicial. For toric varieties over a perfect field k of prime characteristic, we show that the ring of differential operators Dk(R) has finite global dimension.
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