Chiral de Rham complex

Abstract

The aim of this note is to define certain sheaves of vertex algebras on smooth manifolds. For each smooth complex algebraic (or analytic) manifold X, we construct a sheaf chX, called the chiral de Rham complex of X. It is a sheaf of vertex algebras in the Zarisky (or classical) topology, It comes equipped with a -grading by fermionic charge, and the chiral de Rham differential dDRch, which is an endomorphism of degree 1 such that (dDRch)2=0. One has a canonical embedding of the usual de Rham complex (X, dDR) (Xch, dDRch) which is a quasiisomorphism. If X is Calabi-Yau then this sheaf admits an N=2 supersymmetry. For some X (for example, for curves or for the flag spaces G/B), one can construct also a purely even analogue of this sheaf, a chiral structure sheaf chX. For the projective line, the space of global sections of the last sheaf is the irreducible vacuum (2)-module on the critical level.

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