Simultaneous torsion in the Legendre family

Abstract

We improve a result due to Masser and Zannier, who showed that the set \λ ∈ C \0,1\ : (2,2(2-λ)), (3,6(3-λ)) ∈ (Eλ)tors\ is finite, where Eλ y2 = x(x-1)(x-λ) is the Legendre family of elliptic curves. More generally, denote by T(α, β), for α, β ∈ C \0,1\, α ≠ β, the set of λ ∈ C \0,1\ such that all points with x-coordinate α or β are torsion on Eλ. By further results of Masser and Zannier, all these sets are finite. We present a fairly elementary argument showing that the set T(2,3) in question is actually empty. More generally, we obtain an explicit description of the set of parameters λ such that the points with x-coordinate α and β are simultaneously torsion, in the case that α and β are algebraic numbers that not 2-adically close. We also improve another result due to Masser and Zannier dealing with the case that Q(α, β) has transcendence degree 1. In this case we show that \#T(α, β) 1 and that we can decide whether the set is empty or not, if we know the irreducible polynomial relating α and β. This leads to a more precise description of T(α, β) also in the case when both α and β are algebraic. We performed extensive computations that support several conjectures, for example that there should be only finitely many pairs (α, β) such that \#T(α, β) 3.