Twisted conformal blocks and their dimension
Abstract
Let be a finite group acting on a simple Lie algebra g and acting on a s-pointed projective curve (, p=\p1, …, ps\) faithfully (for s≥ 1). Also, let an integrable highest weight module Hc(λi) of an appropriate twisted affine Lie algebra determined by the ramification at pi with a fixed central charge c is attached to each pi. We prove that the space of twisted conformal blocks attached to this data is isomorphic to the space associated to a quotient group of acting on g by diagram automorphisms and acting on a quotient of . Under some mild conditions on ramification types, we prove that calculating the dimension of twisted conformal blocks can be reduced to the situation when acts on g by diagram automorphisms and covers of P1 with 3 marked points. Assuming a twisted analogue of Teleman's vanishing theorem of Lie algebra homology, we derive an analogue of the Kac-Walton formula and the Verlinde formula for general -curves (with mild restrictions on ramification types). In particular, if the Lie algebra g is not of type D4, there are no restrictions on ramification types.
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