Chiralization of Quiver Varieties

Abstract

Given a quiver Q with gauge dimension v and framing dimension w, one can define the extended quiver variety M( v, w), which is a smooth family of deformations of the Nakajima quiver variety M( v, w). In this paper we discuss two vertex algebras which chiralize the geometry M( v, w). We construct a sheaf of -adic vertex superalgebras Dch M( v, w), on M( v, w) which quantizes the jet bundle of M( v, w), and define a vertex algebra Dch( M( v, w)) to be the =1 specialization of the C×-finite part of the vector space of global sections Γ( M( v, w), Dch M( v, w),). We define another vertex superalgebra V( v, w) by BRST reduction of the tensor product of the βγbc-system and Heisenberg VOA associated to the quiver Q, and show that there exists a natural vertex superalgebra map from V( v, w) to Dch( M( v, w)). Under certain technical assumptions, we prove that the negative degree BRST cohomologies of the tensor product of βγbc-systems and Heisenberg VOA associated to the quiver Q are zero, and under stronger assumptions, that the aforementioned vertex superalgebra map is injective. Physically, the vertex superalgebra V( v, w) is closely related to the boundary VOA of the H-twisted 3D N=4 quiver gauge theory associated to the quiver Q with gauge and framing dimension vectors v and w.