1201.6644 (Siu-Hung Ng)
Siu-Hung Ng
In this paper, we prove the congruence property and Galois symmetry of the
modular representations associated with any modular tensor category. The result
was conjectured by Coste, Gannon, Eholzer and many other authors. We apply this
result to determine the order of the anomaly $\alpha$ for those modular
categories $A$ satisfying some integrality conditions. Moreover, if the global
dimension $\dim A$ is an odd integer, we prove that the parity of the order of
$\alpha$ is given by the Jacobi symbol $(\frac{-1}{\dim A})$.
View original:
http://arxiv.org/abs/1201.6644
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