Counting rational points on elliptic curves with a rational 2-torsion point

Abstract

Let E/Q be an elliptic curve over the rational numbers. It is known, by the work of Bombieri and Zannier, that if E has full rational 2-torsion, the number NE(B) of rational points with Weil height bounded by B is (O( B B)). In this paper we exploit the method of descent via 2-isogeny to extend this result to elliptic curves with just one nontrivial rational 2-torsion point. Moreover, we make use of a result of Petsche to derive the stronger upper bound NE(B) = (O( B B)) for these curves and to remove a deep transcendence theory ingredient from the proof.