On the structure of Witt groups and minimal extension conjecture
Abstract
Let E=Rep(G) be a Tannakian fusion category. For a braided fusion category C over E we give sufficient and necessary conditions that characterize the Witt relation [C]=[E]. Then we show the Witt group W(E) is naturally a direct sum of Witt group W:=W(Vec) and the group H4(G,K×). Consequently, for any non-degenerate fusion category C over E, there is a positive integer n (e.g. n=|G|) such that CEn admits a minimal extension.
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