Infinitely many hyperelliptic curves with exactly two rational points: Part II

Abstract

In the previous paper, Hirakawa and the author determined the set of rational points of a certain infinite family of hyperelliptic curves C(p;i,j) parametrized by a prime number p and integers i, j. In the proof, we used the standard 2-descent argument and a Lutz-Nagell theorem that was proven by Grant. In this paper, we extend the above work. By using the descent theorem, the proof for j=2 is reduced to elliptic curves of rank 0 that are independent of p. On the other hand, for odd j, we consider another hyperelliptic curve C'(p;i,j) whose Jacobian variety is isogenous to that of C(p;i,j), and prove that the Mordell-Weil rank of the Jacobian variety of C'(p;i,j) is 0 by 2-descent. Then, we determine the set of rational points of C(p;i,j) by using the Lutz-Nagell type theorem.