Categorical diagonalization and p-cells

Abstract

In the Iwahori-Hecke algebra, the full twist acts on cell modules by a scalar, and the half twist acts by a scalar and an involution. A categorification of this statement, describing the action of the half and full twist Rouquier complexes on the Hecke category, was conjectured by Elias-Hogancamp, and proven in type A. In this paper we make analogous conjectures for the p-canonical basis, and the Hecke category in characteristic p. We prove the categorified conjecture in type C2, where the situation is already interesting. The decategorified conjecture is confirmed by computer in rank at most 6; information is found in the appendix, written by Joel Gibson.