Elliptic curves related to cyclic cubic extensions

Abstract

The aim of this paper is to study certain family of elliptic curves \XH\H defined over a number field F arising from hyperplane sections of some cubic surface X/F associated to a cyclic cubic extension K/F. We show that each XH admits a 3-isogeny φ over F and the dual Selmer group S(φ)(XH/F) is bounded by a kind of unit/class groups attached to K/F. This is proven via certain rational function on the elliptic curve XH with nice property. We also prove that the Shafarevich-Tate group X (XH/)[φ] coincides with a class group of K as a special case.