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Modules Over a Chiral Algebra

Published 11 Oct 2010 in math.AG and math.RT | (1010.1998v1)

Abstract: Given a chiral algebra, we study modules over an arbitrary power of a curve. We describe this category in three different ways: in terms of factorization, in terms of certain chiral operations and as modules for a lie algebra in a certain tensor category. In addition, we consider analogous questions for LIe-* algebras and factorization spaces. For factorization spaces, we give a construction of multijets in terms of a certain Weil restriction which lets us characterize counital factorizable algebraic stacks as multijets.

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