Symmetric tensor categories in characteristic 2
Abstract
We construct and study a nested sequence of finite symmetric tensor categories Vec=C0⊂ C1⊂·s⊂ Cn⊂·s over a field of characteristic 2 such that C2n are incompressible, i.e., do not admit tensor functors into tensor categories of smaller Frobenius--Perron dimension. This generalizes the category C1 described by Venkatesh and the category C2 defined by Ostrik. The Grothendieck rings of the categories C2n and C2n+1 are both isomorphic to the ring of real cyclotomic integers defined by a primitive 2n+2-th root of unity, On= Z[2(π/2n+1)].
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