Families of twists of tuples of hyperelliptic curves

Abstract

Let f ∈ Q[x] be a square-free polynomial of degree at least 3, mi, i=1,2,3, odd positive integers, and ai, i=1,2,3, non-zero rational numbers. We show the existence of a rational function D∈Q(v1,v2,v3,v4) such that the Jacobian of the quadratic twist of y2=f(x) and the Jacobian of the mi-twist, respectively 2mi-twist, of y2=xmi+ai2, i=1,2,3, by D are all of positive Mordell-Weil ranks. As an application, we present families of hyperelliptic curves with large Mordell-Weil rank.

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