Parity-induced Selmer Growth For Symplectic, Ordinary Families

Abstract

Let p be an odd prime, and let K/K0 be a quadratic extension of number fields. Denote by K the maximal Zp-power extensions of K that are Galois over K0, with K+ abelian over K0 and K- dihedral over K0. In this paper we show that for a Galois representation over K0 satisfying certain hypotheses, if it has odd Selmer rank over K then for one of K its Selmer rank over L is bounded below by [L:K] for L ranging over the finite subextensions of K in K. Our method or proof generalizes a method of Mazur--Rubin, building upon results of Nekov\'ar, and applies to abelian varieties of arbitrary dimension, (self-dual twists of) modular forms of even weight, and (twisted) Hida families.