Cones of Weights and Minimal Cones of the Goren-Oort Strata in Hilbert modular varieties

Abstract

Let p be a prime, F a totally real field in which p is unramified, and X/Fp a Shimura variety associated to ResF/Q GL2 (or a PEL Hilbert modular variety). A mod p Hilbert modular form of weight can be defined as a section of an automorphic line bundle L on X. We consider sections of L (forms) over a Goren-Oort stratum XT inside X, and define the cone of weights of XT to be the Q≥ 0-cone generated by the weights of all nonzero forms on XT. We explicitly determine the cone of weights of all strata, showing in particular that they are not in general generated by the weights of the associated Hasse invariants. Using this, we define a notion of minimal cone for each stratum, and explicitly determine the minimal cones of all strata. When X is a Shimura variety associated to ResF/Q GL2, we prove that for every nonzero eigenform f for the prime-to-p Hecke algebra on a stratum XT, there is another eigenform with the same Hecke eigenvalues which has weight in the minimal cone of XT.