Behaviors of the Tate--Shafarevich group of elliptic curves under quadratic field extensions

Abstract

Let E/Q be an elliptic curve. We study the behavior of the Tate--Shafarevich group of E under quadratic extensions Q(D)/Q. By analyzing the cokernel of the restriction map, without assuming the finiteness of the Tate--Shafarevich group, we prove that the ratio \#(E/Q(D))[4]\#(ED/Q)[2] and \#(ED/Q)[2] can, under some conditions on E/Q, grow arbitrarily large simultaneously, where ED denotes the quadratic twist of E by D. For elliptic curves of the form E : y2 = x3 + px with p 1 4 being an odd prime, assuming the finiteness of the relevant Tate--Shafarevich groups, we prove that \#(E/Q(D))[2] ≤ 4 and (ED/Q)[2] = 0 for infinitely many square-free integers D with -D being a prime number. Additionally, (E/Q(-D))[2]≠ 0 for all D when p=257.

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