Galois irreducibility implies cohomology freeness for KHT Shimura varieties

Abstract

Given a KHT Shimura variety provided with an action of its unramified Hecke algebra T, we proved in a previous work, see also the work of Caraiani-Scholze for other PEL Shimura varieties, that its localized cohomology groups at a generic maximal ideal m of T, appear to be free. In this work, we obtain the same result for m such that its associated Galois Fl-representation m is irreducible, under the hypothesis that [F((2iπ/l):F]>d where F is the reflex field, d the dimension of the KHT Shimura variety and l the residual characteristic.