On the geometric Serre weight conjecture for Hilbert modular forms

Abstract

Let p be a prime, F be a totally real field in which p is unramified and : Gal(F/F)→ GL2(Fp) be a totally odd, irreducible, continuous representation. The geometric Serre weight conjecture formulated by Diamond and Sasaki can be viewed as a geometric variant of the Buzzard-Diamond-Jarvis conjecture, where they have the notion of geometric modularity in the sense that arises from a mod p Hilbert modular form and algebraic modularity in the sense of Buzzard-Diamond-Jarvis. Diamond and Sasaki conjecture that if is geometrically modular of weight (k,l)∈ Z≥ 2×Z and k lies in the minimal cone, then is algebraically modular of the same weight, where is the set of embeddings from F into Q. We prove the conjecture without parity hypotheses for real quadratic fields F in which p ≥ 5 is inert, and for totally real fields F in which p ≥ \5, [F:Q]\ totally splits.