Towards a mod-p Lubin-Tate theory for 2 over totally real fields

Abstract

We show that the conjectural mod p local Langlands correspondence can be realised in the mod p cohomology of the Lubin-Tate towers. The proof utilizes a well known conjecture of Buzzard-Diamond-Jarvis [Conj. 4.9]BDJ10, a study of completed cohomology of the ordinary and supersingular locus of the Shimura curves for a totally real field F and of mod l(≠ p) local Langlands correspondence as given by Emerton-Helm EmertonHelm14. %And then we connect the completed cohomlgy with the cohomology of Lubin-Tate towers. In the case of modular curves a similar theorem was obtained by Chojecki Cho15.