Lefschetz decompositions and Categorical resolutions of singularities
Abstract
Let Y be a singular algebraic variety and let be a resolution of singularities of Y. Assume that the exceptional locus of over Y is an irreducible divisor in . For every Lefschetz decomposition of we construct a triangulated subcategory ⊂ b() which gives a desingularization of b(Y). If the Lefschetz decomposition is generated by a vector bundle tilting over Y then is a noncommutative resolution, and if the Lefschetz decomposition is rectangular, then is a crepant resolution.
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