On the realization of a class of SL(2,Z)-representations
Abstract
Let p<q be odd primes, 1 and 2 be irreducible representations of SL(2,Zp) and SL(2,Zq) of dimensions p+12 and q+12, respectively. We show that if 12 can be realized as modular representation associated to a modular fusion category C, then q-p=4. Moreover, if C contains a non-trivial \'etale algebra, then C(Zp,η)(A) as braided fusion category, where A is a near-group fusion category of type (Zp,p). And we show that there exists a non-trivial Z2-extension of A that contains simple objects of Frobenius-Perron dimension p+q2.
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