Quadratic twists of pairs of elliptic curves

Abstract

Given two elliptic curves defined over a number field K, not both with j-invariant zero, we show that there are infinitely many D∈ K× with pairwise distinct image in K×/K×2 , such that the quadratic twist of both curves by D have positive Mordell-Weil rank. The proof depends on relating the values of pairs of cubic polynomials to rational points on another elliptic curve, and on a fiber product construction.

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