On the universal mod p supersingular quotients for GL2(F) over Fp for a general F/Qp

Abstract

Let F/Qp be a finite extension. We explore the universal supersingular mod p representations of GL2(F) through computing a basis of their invariant space under the pro-p Iwahori subgroup. This generalizes works of Breuil and Schein from Qp and the totally ramified cases to the arbitrary one. Using these results we then construct for an unramified F/Qp a quotient of the universal supersingular module which has as quotients all the supersingular representations of GL2(F) with a GL2(OF)-socle that is expected to appear in the mod p local Langlands correspondence. A construction for the case of an extension of Qp with inertia degree 2 and suitable ramification index is also presented.