Lubin-Tate moduli space of semisimple mod p Galois representations for GL2 and Hecke modules

Abstract

Let p be an odd prime. Let F be a non-archimedean local field of residue characteristic p, and let Fq be its residue field. Let H(1)Fq be the pro-p-Iwahori-Hecke algebra of the p-adic group GL2(F) with coefficients in Fq, and let Z(H(1)Fq) be its center. We define a scheme X(q)Fq whose geometric points parametrize the semisimple two-dimensional Galois representations of Gal(F/F) over Fq. Then we construct a morphism from the spectrum of Z(H(1)Fq) to X(q)Fq generalizing the morphism appearing in PS2 for F=Qp. In the case F/Qp, we show that the induced map from Hecke modules to Galois representations, when restricted to supersingular modules, coincides with Grosse-Kl\"onne's bijection GK18. For this, we determine the Lubin-Tate (,)-modules associated to absolutely irreducible Galois representations.