New incompressible symmetric tensor categories in positive characteristic

Abstract

We propose a method of constructing abelian envelopes of symmetric rigid monoidal Karoubian categories over an algebraically closed field k. If char( k)=p>0, we use this method to construct generalizations Verpn, Verpn+ of the incompressible abelian symmetric tensor categories defined in arXiv:1807.05549 for p=2 and by Gelfand-Kazhdan and Georgiev-Mathieu for n=1. Namely, Verpn is the abelian envelope of the quotient of the category of tilting modules for SL2( k) by the n-th Steinberg module, and Verpn+ is its subcategory generated by PGL2( k)-modules. We show that Verpn are reductions to characteristic p of Verlinde braided tensor categories in characteristic zero, which explains the notation. We study the structure of these categories in detail, and in particular show that they categorify the real cyclotomic rings Z[2(2π/pn)], and that Verpn embeds into Verpn+1. We conjecture that every symmetric tensor category of moderate growth over k admits a fiber functor to the union Verp∞ of the nested sequence Verp⊂ Verp2⊂·s. This would provide an analog of Deligne's theorem in characteristic zero and a generalization of the result of arXiv:1503.01492, which shows that this conjecture holds for fusion categories, and then moreover the fiber functor lands in Verp.