Higher Chiral Algebras in a Polysimplicial Model

Abstract

Vertex algebras are equivalent to translation-equivariant chiral algebras on A1, in the sense of Beilinson and Drinfeld. In this paper we give an algebraic construction of a chiral algebra on An; this can be seen as an algebraic construction of a higher-dimensional vertex algebra. We introduce a model, in dg commutative algebras, of the derived algebra of functions on the configuration space of k distinct labelled marked points in An. Working in this model -- which we call the polysimplicial model -- we obtain a dg operad of chiral operations on a degree-shifted copy of the canonical sheaf. We prove that there is a quasi-isomorphism, to this dg operad, from the Lie-infinity operad. This result makes the shifted canonical sheaf into a first example of a homotopy polysimplicial chiral algebra on An, in a sense which generalizes to higher dimensions Malikov and Schechtman's notion of a homotopy chiral algebra.