Invariance of the parity conjecture for p-Selmer groups of elliptic curves in a D2pn-extension

Abstract

In section 2, we show a p-parity result in a D2pn-extension of number fields L/K (p≥ 5) for the twist 1 η τ : W(E/K,1 η τ)=(-1)< 1η τ, Xp(E/L)>, where E is an elliptic curve over K, η and τ are respectively the quadratic character and an irreductible representation of degree 2 of Gal(L/K)=D2pn, and Xp(E/L) is the p-Selmer group. The main novelty is that we use a congruence result between % ε0-factors (due to Deligne) for the determination of local root numbers in bad cases (places of additive reduction above 2 and 3). We also give applications to the p-parity conjecture (using the machinery of the Dokchitser brothers).