Quantization of nilpotent coadjoint GLN-orbit closures in positive characteristics

Abstract

Let G be a reductive group over an algebraically closed field of positive characteristic p, good for the root system of G. The closures of G-orbits in the Hilbert nullcone of the coadjoint representation are conical affine Poisson varieties, generically of full rank, known as nilpotent coadjoint orbits. In this paper, we classify the filtered Hamiltonian quantizations of these orbit closures for G = GLN and any p > 0. Our main new technique is a construction of quantizations from certain primitive quotients of the enveloping algebra, inducing them from the stabiliser in G of the Frobenius twisted p-character.