Half-integrable modules over algebras of twisted chiral differential operators
Abstract
A module M over a vertex algebra V is half-integrable if an act locally nilpotently on M for all a in V, m in M, n>0. We study half-integrable modules over sheaves of twisted chiral differential operators (TCDO) on a smooth variety X. We prove an equivalence between certain categories of half-integrable modules over TCDO and categories of (twisted) D-modules on X.
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