A Refined Lifting Theorem for Supersingular Galois Representations

Abstract

Let p≥ 5 be a prime number, F a finite field of characteristic p and let be the mod-p cyclotomic character. Let :GQ→ GL2(F) be a Galois representation such that the local representation GQp is flat and irreducible. Further, assume that det=. The celebrated theorem of Khare and Wintenberger asserts that if satisfies some natural conditions, there exists a normalized Hecke-eigencuspform f=Σn≥ 1 an qn and a prime p|p in its field of Fourier coefficients such that the associated p-adic representation f,p lifts . In this manuscript we prove a refined version of this theorem, namely, that one may control the valuation of the p-th Fourier coefficient of f. The main result is of interest from the perspective of the p-adic Langlands program.