A new construction of vertex algebras and quasi modules for vertex algebras
Abstract
In this paper, a new construction of vertex algebras from more general vertex operators is given and a notion of quasi module for vertex algebras is introduced and studied. More specifically, a notion of quasi local subset(space) of (W,W((x))) for any vector space W is introduced and studied, generalizing the notion of usual locality in the most possible way, and it is proved that on any maximal quasi local subspace there exists a natural vertex algebra structure and that any quasi local subset of (W,W((x))) generates a vertex algebra. Furthermore, a notion of quasi module for a vertex algebra is introduced and it is proved that W is a quasi module for each of the vertex algebras generated by quasi local subsets of (W,W((x))). A notion of -vertex algebra is also introduced and studied, where is a subgroup of the multiplicative group × of nonzero complex numbers. It is proved that any maximal quasi local subspace of (W,W((x))) is naturally a -vertex algebra and that any quasi local subset of (W,W((x))) generates a -vertex algebra. It is also proved that a -vertex algebra exactly amounts to a vertex algebra equipped with a -module structure which satisfies a certain compatibility condition. Finally, three families of examples are given, involving twisted affine Lie algebras, certain quantum Heisenberg algebras and certain quantum torus Lie algebras.
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