Arithmetic Statistics and noncommutative Iwasawa Theory
Abstract
Let p be an odd prime. Associated to a pair (E, F∞) consisting of a rational elliptic curve E and a p-adic Lie extension F∞ of Q, is the p-primary Selmer group Selp∞(E/F∞) of E over F∞. In this paper, we study the arithmetic statistics for the algebraic structure of this Selmer group. The results provide insights into the asymptotics for the growth of Mordell--Weil ranks of elliptic curves in noncommutative towers.
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