Generators and splitting fields of certain elliptic K3 surfaces

Abstract

Let k ⊂ C be a number field and E be an elliptic curve defined over k(t), the rational function field of the projective line P1k, is isomorphic to the generic fiber of an elliptic surface π:= → P1k. For any subfield K⊂eq C of k, the set E( K(t)) of K(t)-rational points of E is known to be a finitely generated abelian group. The splitting field of E defined over k(t) is the smallest finite extension K ⊂ C of k such that E ( C (t)) E ( K(t)). In this paper, we consider the elliptic K3 surfaces defined over k= Q with the generic fiber given by the Weierstrass equation En: y2=x3 + tn + 1/tn, 1≤ n≤ 6, and determine the splitting field Kn, and find an explicit set of independent generators for En ( Kn(t)) for 1≤ n ≤ 6.