On cohomology in symmetric tensor categories in prime characteristic

Abstract

We describe graded commutative Gorenstein algebras En(p) over a field of characteristic p, and we conjecture that ExtVerpn+1(1,1) En(p), where Verpn+1 are the new symmetric tensor categories recently constructed in Benson/Etingof:2019a,Benson/Etingof/Ostrik,Coulembier. We investigate the combinatorics of these algebras, and the relationship with Minc's partition function, as well as possible actions of the Steenrod operations on them. Evidence for the conjecture includes a large number of computations for small values of n. We also provide some theoretical evidence. Namely, we use a Koszul construction to identify a homogeneous system of parameters in En(p) with a homogeneous system of parameters in ExtVerpn+1(1,1). These parameters have degrees 2i-1 if p=2 and 2(pi-1) if p is odd, for 1 i n. This at least shows that ExtVerpn+1(1,1) is a finitely generated graded commutative algebra with the same Krull dimension as En(p). For p=2 we also show that ExtVer2n+1(1,1) has the expected rank 2n(n-1)/2 as a module over the subalgebra of parameters.