Asymptotic growth of Mordell-Weil ranks of elliptic curves in noncommutative towers

Abstract

Let E be an elliptic curve defined over a number field F with good ordinary reduction at all primes above p, and let F∞ be a finitely ramified uniform pro-p extension of F containing the cyclotomic Zp-extension Fcyc. Set F(n) be the n-th layer of the tower, and F(n)cyc the cyclotomic Zp-extension of F(n). We study the growth of the rank of E(F(n)) by analyzing the growth of the λ-invariant of the Selmer group over F(n)cyc as n→ ∞. This method has its origins in work of A.Cuoco, who studied Zp2-extensions. Refined estimates for growth are proved that are close to conjectured estimates. The results are illustrated in special cases.