Modular categories and orbifold models II

Abstract

This is a continuation of the paper "Modular tensor categories and orbifold theories", arXiv:math.QA/0104242. It discusses orbifold models of conformal filed theory, or, in mathematical language, question of constructing the category of representations of the fixed point algebra VG for a given vertex operator algebra V with an action of a finite group G. The previous paper gave a proof of well-known conjecture of Dijkgraaf-Vafa-Verlinde-Verlinde giving a complete answer to this question in the holomorphic case (when V has a unique simple module, V itself) under the assumption that categories of rrepresentations of V, VG are modular tensor categories. In the current paper, we give a partial answer in non-holomorphic case. In particular, we show that the category of representations of VG is completely determined by the category of twisted V-modules together with the action of G on this category. Our approach is based on describing representations of V, VG and relation between them in terms of tensor categories and avoids using the technique of VOAs as much as possible.

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