Algebra of q-difference operators, affine vertex algebras, and their modules

Abstract

In this paper, we explore a canonical connection between the algebra of q-difference operators Vq, affine Lie algebra and affine vertex algebras associated to certain subalgebra A of the Lie algebra gl∞. We also introduce and study a category O of Vq-modules. More precisely, we obtain a realization of Vq as a covariant algebra of the affine Lie algebra A*, where A* is a 1-dimensional central extension of A. We prove that restricted Vq-modules of level 12 correspond to Z-equivariant φ-coordinated quasi-modules for the vertex algebra VA(12,0), where A is a generalized affine Lie algebra of A. In the end, we show that objects in the category O are restricted Vq-modules, and we classify simple modules in the category O.

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