Twisted modules and co-invariants for commutative vertex algebras of jet schemes

Abstract

Let Z ⊂ Ak be an affine scheme over and Z its jet scheme. It is well-known that C[ Z], the coordinate ring of Z, has the structure of a commutative vertex algebra. This paper develops the orbifold theory for C[ Z]. A finite-order linear automorphism g of Z acts by vertex algebra automorphisms on C[ Z]. We show that C[g Z], where g Z is the scheme of g--twisted jets has the structure of a g-twisted C[ Z] module. We consider spaces of orbifold coinvariants valued in the modules C[g Z] on orbicurves [Y/G], with Y a smooth projective curve and G a finite group, and show that these are isomorphic to C[ZG].