Prime decomposition of modular tensor categories of local modules of Type D

Abstract

Let C(g,k) be the unitary modular tensor categories arising from the representation theory of quantum groups at roots of unity for arbitrary simple finite-dimensional complex Lie algebra g and positive integer levels k. Here we classify nondegenerate fusion subcategories of the modular tensor categories of local modules C(g,k)R0 where R is the regular algebra of Tannakian Rep(H)⊂C(g,k)pt. For g=so5 we describe the decomposition of C(g,k)R0 into prime factors explicitly and as an application we classify relations in the Witt group of nondegenerately braided fusion categories generated by the equivalency classes of C(so5,k) and C(g2,k) for k∈Z≥1.