Crystalline lifts of two-dimensional mod $p$ automorphic Galois representations

Abstract: We show that a sufficient condition for an irreducible automorphic Galois representation $\rho: G_F\to\mathrm{GL}2({\overline{{\bf F}}_p})$ of a totally real field $F$ to have an automorphic crystalline lift is that for each place $v$ of $F$ above $p$ the restriction $\mathrm{det}\rho|{I_v}$ is a fixed power of the mod $p$ cyclotomic character. Moreover, we show that the only obstruction to controlling the level and character of such automorphic lifts arises for badly dihedral representations.