Moduli of G-constellations and crepant resolutions I: the abelian case
Abstract
For a finite abelian subgroup G⊂ SLn(C), we study whether a given crepant resolution X of the quotient variety Cn/G is obtained as a moduli space of G-constellations. In particular we show that, if X admits a natural G-constellation family in the sense of Logvinenko over it with all fibers being indecomposable as C[Cn]-modules, then X is isomorphic to the normalization of a fine moduli space of G-constellations.
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