Twisted vertex representations via spin groups and the McKay correspondence

Abstract

We establish a twisted analog of our recent work on vertex representations and the McKay correspondence. For each finite group and a virtual character of we construct twisted vertex operators on the Fock space spanned by the super spin characters of the spin wreath products Sn of and a double cover of the symmetric group Sn for all n. When is a subgroup of SL2( C) with the McKay virtual character, our construction gives a group theoretic realization of the basic representations of the twisted affine and twisted toroidal algebras. When is an arbitrary finite group and the virtual character is trivial, our vertex operator construction yields the spin character tables for Sn.

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