Rational points on certain elliptic surfaces

TL;DR

This paper investigates rational points on specific elliptic surfaces defined by cubic equations with polynomial coefficients, establishing conditions for the existence of non-torsion sections and infinite rational points through rational base changes.

Contribution

It proves the existence of non-torsion sections on elliptic surfaces after rational base change for polynomials of degree up to 4, and analyzes rational points on related surfaces with degree six polynomials.

Findings

Existence of non-torsion sections after rational base change for degree ≤ 4.

Infinite rational points on certain elliptic curves when polynomial is not even.

Results on diophantine equations involving cubic and polynomial terms.

Abstract

Let $\mathcal{E}_{f}:y^2=x^3+f(t)x$, where $f\in\Q[t]\setminus\Q$, and let us assume that $\op{deg}f\leq 4$. In this paper we prove that if $\op{deg}f\leq 3$, then there exists a rational base change $t\mapsto\phi(t)$ such that on the surface $\cal{E}_{f\circ\phi}$ there is a non-torsion section. A similar theorem is valid in case when $\op{deg}f=4$ and there exists $t_{0}\in\Q$ such that infinitely many rational points lie on the curve $E_{t_{0}}:y^2=x^3+f(t_{0})x$. In particular, we prove that if $\op{deg}f=4$ and $f$ is not an even polynomial, then there is a rational point on $\cal{E}_{f}$. Next, we consider a surface $\cal{E}^{g}:y^2=x^3+g(t)$, where $g\in\Q[t]$ is a monic polynomial of degree six. We prove that if the polynomial $g$ is not even, there is a rational base change $t\mapsto\psi(t)$ such that on the surface $\cal{E}^{g\circ\psi}$ there is a non-torsion section. Furthermore, if there exists $t_{0}\in\Q$ such that on the curve $E^{t_{0}}:y^2=x^3+g(t_{0})$ there are infinitely many rational points, then the set of these $t_{0}$ is infinite. We also present some results concerning diophantine equation of the form $x^2-y^3-g(z)=t$, where $t$ is a variable.