Algebraicity of L-values for elliptic curves in a false Tate curve tower

Abstract

Let E be an elliptic curve over Q, and τ an Artin representation over Q that factors through the non-abelian extension Q([pn]m,μpn)/Q, where p is an odd prime and n,m are positive integers. We show that L(E,τ,1), the special value at s=1 of the L-function of the twist of E by τ, divided by the classical transcendental period +d+|-d-|ε(τ) is algebraic and Galois-equivariant, as predicted by Deligne's conjecture.

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