On the density of rational points on rational elliptic surfaces

Abstract

Let E→P1Q be a non-trivial rational elliptic surface over Q with base P1Q (with a section). We conjecture that any non-trivial elliptic surface has a Zariski-dense set of Q-rational points. In this paper we work on solving the conjecture in case E is rational by means of geometric and analytic methods. First, we show that for E rational, the set E(Q) is Zariski-dense when E is isotrivial with non-zero j-invariant and when E is non-isotrivial with a fiber of type II*, III*, IV* or I*m (m≥0). We also use the parity conjecture to prove analytically the density on a certain family of isotrivial rational elliptic surfaces with j=0, and specify cases for which neither of our methods leads to the proof of our conjecture.