Rank stability of elliptic curves in certain non-abelian extensions

Abstract

Let E/Q be an elliptic curve with rank E(Q)=0. Fix an odd prime p, a positive integer n and a finite abelian extension K/Q with rank E(K) = 0. In this paper, we show that there exist infinitely many extensions L/K such that L/Q is Galois with Gal(L/Q) Gal(K/Q) Z/pnZ, and rank E(L)=0. This is an extension of earlier results on rank stability of elliptic curves in cyclic extensions of prime power order to a non-abelian setting. We also obtain an asymptotic lower bound for the number of such extensions, ordered by their absolute discriminant.