Logarithmic jets and the chiral de Rham complex of a pair

Abstract

To a smooth variety X with simple normal crossings divisor D, we associate a sheaf of vertex algebras on X, denoted chX(logD), whose conformal weight 0 subspace is the algebra X(logD) of forms with log poles along D. We prove various basic structural results about chX(logD). In particular, if X*=X D has a volume form then we show that chX(logD) admits a topological structure of rank d=dim(X), which is enhanced to an extended topological structure if D -KX is in fact anticanonical. In this latter case we also show that the resulting (q,y) character Ell(X,D)(q,y) is a section of the line bundle d on the elliptic curve E=C*/qZ. We further show how chX(logD) can be understood in terms of a simple birational modification of the space of jets into X.

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