Parallel weight 2 points on Hilbert modular eigenvarieties and the parity conjecture (1801.04719v2)

Abstract: Let F be a totally real field of degree d and let p be an odd prime which is totally split in F. We define and study one-dimensional partial eigenvarieties interpolating Hilbert modular forms over F with weight varying only at a single place v above p. For these eigenvarieties, we show that methods developed by Liu, Wan and Xiao apply and deduce that, over a boundary annulus in weight space of sufficiently small radius, the partial eigenvarieties decompose as a disjoint union of components which are finite over weight space. We apply this result to prove the parity version of the Bloch--Kato conjecture for finite slope Hilbert modular forms with trivial central character (under some assumptions), by reducing to the case of parallel weight 2. As another consequence of our results on partial eigenvarieties, we show, still under the assumption that p is totally split in F, that the full (dimension 1 + d) cuspidal Hilbert modular eigenvariety has the property that many (all, if d is even) irreducible components contain a classical point with non-critical slopes and parallel weight 2 (with some character at p whose conductor can be explicitly bounded), or any other algebraic weight.