Constructing quantum vertex algebras

Abstract

This is a sequel to li-qva. In this paper, we focus on the construction of quantum vertex algebras over , whose notion was formulated in li-qva with Etingof and Kazhdan's notion of quantum vertex operator algebra (over [[h]]) as one of the main motivations. As one of the main steps in constructing quantum vertex algebras, we prove that every countable-dimensional nonlocal (namely noncommutative) vertex algebra over , which either is irreducible or has a basis of PBW type, is nondegenerate in the sense of Etingof and Kazhdan. Using this result, we establish the nondegeneracy of better known vertex operator algebras and some nonlocal vertex algebras. We then construct a family of quantum vertex algebras closely related to Zamolodchikov-Faddeev algebras.

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