Spectral mod p Satake isomorphism for GLn

Abstract

Let K/Qp be a finite extension with residue field k. By a work of Emerton--Gee, irreducible components inside the reduced special fiber of the moduli stack of rank n \'etale (,)-modules are labeled by Serre weights of GLn(k). Let σ be a non-Steinberg Serre weight and Cσ be the corresponding irreducible component. Motivated by the categorical p-adic local Langlands program, we construct a natural injective map O(Cσ) H(σ) from the ring of global functions on Cσ to the Hecke algebra of σ compatible with the mod p Satake isomorphism by Herzig and Henniart--Vign\'eras in a suitable sense. For sufficiently generic σ, we prove that it is an isomorphism. As an application, we obtain a natural stratification of the irreducible component whose strata are equipped with a parabolic structure. Our main input is a construction of a morphism from an integral Hecke algebra of a generic tame type to the ring of global functions on a tamely potentially crystalline Emerton--Gee stack.