Integral points on cubic twists of Mordell curves
Abstract
Fix a non-square integer k≠ 0. We show that the number of curves EB:y2=x3+kB2 containing an integral point, where B ranges over positive integers less than N, is bounded by Ok(N( N)-12+ε). In particular, this implies that the number of positive integers B≤ N such that -3kB2 is the discriminant of an elliptic curve over Q is o(N). The proof involves a discriminant-lowering procedure on integral binary cubic forms.
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