Some computations in the cyclic permutations of completely rational nets
Abstract
In this paper we calculate certain chiral quantities from the cyclic permutation orbifold of a general completely rational net. We determine the fusion of a fundamental soliton, and by suitably modified arguments of A. Coste , T. Gannon and especially P. Bantay to our setting we are able to prove a number of arithmetic properties including congruence subgroup properties for S, T matrices of a completely rational net defined by K.-H. Rehren .
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