Spectral Flow Equivariance for Calabi-Yau Sigma Models

Abstract

We write down an explicit operator on the chiral de Rham complex of a Calabi-Yau variety X which intertwines the usual N=2 module structure with its twist by the spectral flow automorphism of the N=2, producing the expected spectral flow equivariance. Taking the trace of the operators L0 and J0 on cohomology, and using the obvious interaction of spectral flow with characters, we obtain an explicit categorification of ellipticity of the elliptic genus of X, which is well known by other means.

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