Toroidal prefactorization algebras associated to holomorphic fibrations and a relationship to vertex algebras

Abstract

Let X be a complex manifold, π: E → X a locally trivial holomorphic fibration with fiber F, and g a Lie algebra with an invariant symmetric form. We associate to this data a holomorphic prefactorization algebra Fg, π on X in the formalism of Costello-Gwilliam. When X=C, g is simple, and F is a smooth affine variety, we extract from Fg, π a vertex algebra which is a vacuum module for the universal central extension of the Lie algebra g H0(F, O)[z,z-1]. As a special case, when F is an algebraic torus (C*)n, we obtain a vertex algebra naturally associated to an (n+1)--toroidal algebra, generalizing the affine vacuum module.