A new family of elliptic curves with unbounded rank
Abstract
Let Fq be a finite field of odd characteristic and K= Fq(t). For any integer d≥ 2 coprime to q, consider the elliptic curve Ed over K defined by y2=x(x2+t2d x-4t2d). We show that the rank of the Mordell--Weil group Ed(K) is unbounded as d varies. The curve Ed satisfies the BSD conjecture, so that its rank equals the order of vanishing of its L-function at the central point. We provide an explicit expression for the L-function of Ed, and use it to study this order of vanishing in terms of d.
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