Quantum affine vertex algebra at root of unity

Abstract

Let g be a finite simple Lie algebra, and let r denote the ratio of the square length of long roots to that of short roots. Let >2r be an integer and ζ a primitive -th root of unity. Denote by Uζ( g) the Lusztig big quantum affine algebra at root of unity defined by divided powers. In this paper, we establish a current algebra presentation of Uζ( g). Based on this presentation, we construct a Z-module quantum vertex algebras V,τ( g) for each integer . Moreover, we establish a fully faithful functor from the category of smooth weighted Uζ( g)-modules of level to the category of ( Z,φ)-equivariant φ-coordinated quasi-modules of V,τ( g), where φ: Z C× is the group homomorphism defined by s ζs. We also determine the image of this functor. The structure V,τ( g) is substantially different from that of affine vertex algebras. We realize V,τ( g) as a deformation of a simpler quantum vertex algebra V,( g) by using vertex bialgebras, and decompose V,( g) into a Heisenberg vertex algebra and a more interesting quantum vertex algebra determined by a quiver.