Rational D(q)-quintuples
Abstract
For a nonzero rational number q, a rational D(q)-n-tuple is a set of n distinct nonzero rationals \a1, a2, …, an\ such that aiaj+q is a square for all 1 ≤slant i < j ≤slant n. We investigate for which q there exist infinitely many rational D(q)-quintuples. We show that assuming the Parity Conjecture for the twists of several explicitly given elliptic curves, the density of such q is at least 295026/296010≈ 99.5\%.
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