Pre-modular fusion categories of global dimensions p2
Abstract
Let p≥5 be a prime, we show that a non-pointed modular fusion category C is Grothendieck equivalent to C(sl2,2(p-1))A0 if and only if (C)=p· u, where u is a certain totally positive algebraic unit and A is the regular algebra of the Tannakian subcategory Rep(Z2)⊂eqC(sl2,2(p-1)). As a direct corollary, we classify non-simple modular fusion categories of global dimensions p2.
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