Nodal degeneration of chiral algebras II: Local structure and chiral Zhu algebras

Abstract

Given a vertex algebra V, Zhu constructed an associative algebra A(V), whose representation theory provides an approximation to the category of V-modules. We describe a geometric construction of a certain derived associative algebra ZA0 associated to any universal factorization algebra A, whose zeroth homology recovers Zhu's associative algebra in the case where A is obtained from a vertex algebra. The construction is given by integrating A over stable configurations parametrized by two-pointed semistable genus zero curves. By a variant of this construction, we obtained a chiral A-bimodule ZA describing the value of a factorization algebra at a nodal point. We show that its zeroth homology recovers the bimodule underlying the mode-transition algebra A(V) defined by Damiolini, Gibney, and Krashen, which they use to describes a vertex algebra at a node. Finally, the value over a formal smoothing of a node provides a deformation ZA of ZA, whose zeroth homology describes a deformation of the mode-transition algebra in the case of a vertex algebra.