Finite symmetric tensor categories with the Chevalley property in characteristic 2

Abstract

We prove an analog of Deligne's theorem for finite symmetric tensor categories C with the Chevalley property over an algebraically closed field k of characteristic 2. Namely, we prove that every such category C admits a symmetric fiber functor to the symmetric tensor category D of representations of the triangular Hopf algebra (k[]/(2),1 1 + ). Equivalently, we prove that there exists a unique finite group scheme G in D such that C is symmetric tensor equivalent to D(G). Finally, we compute the group H2 inv(A,K) of equivalence classes of twists for the group algebra K[A] of a finite abelian p-group A over an arbitrary field K of characteristic p>0, and the Sweedler cohomology groups HiSw(O(A),K), i 1, of the function algebra O(A) of A.