Categorification via blocks of modular representations for sl(n)

Abstract

Bernstein, Frenkel, and Khovanov have constructed a categorification of tensor products of the standard representation of sl2, where they use singular blocks of category O for sln and translation functors. Here we construct a positive characteristic analogue using blocks of representations of sln over a field k of characteristic p with zero Frobenius character, and singular Harish-Chandra character. We show that the aforementioned categorification admits a Koszul graded lift, which is equivalent to a geometric categorification constructed by Cautis, Kamnitzer, and Licata using coherent sheaves on cotangent bundles to Grassmanians. In particular, the latter admits an abelian refinement. With respect to this abelian refinement, the stratified Mukai flop induces a perverse equivalence on the derived categories for complementary Grassmanians. This is part of a larger project to give a combinatorial approach to Lusztig's conjectures for representations of Lie algebras in positive characteristic.