Algebraic structure and characteristic ideals of fine Mordell--Weil groups and plus/minus Mordell--Weil groups

Abstract

Given an elliptic curve defined over a number field F, we study the algebraic structure and prove a control theorem for Wuthrich's fine Mordell--Weil groups over a Zp-extension of F, generalizing results of Lee on the usual Mordell--Weil groups. In the case where F=Q, we show that the characteristic ideal of the Pontryagin dual of the fine Mordell--Weil group over the cyclotomic Zp-extension coincides with Greenberg's prediction for the characteristic ideal of the dual fine Selmer group. If furthermore E has good supersingular reduction at p with ap(E)=0, we generalize Wuthrich's fine Mordell--Weil groups to define "plus and minus Mordell--Weil groups". We show that the greatest common divisor of the characteristic ideals of the Pontryagin duals of these groups coincides with Kurihara--Pollack's prediction for the greatest common divisor of the plus and minus p-adic L-functions.