Marshall Hall's Conjecture and Gaps Between Integer Points on Mordell Elliptic Curves

Abstract

For a non-square positive integer x, let kx denote the distance between x3 and the perfect square closest to x3. A conjecture of Marshall Hall states that the ratios rx = (x(1/2))/kx, are bounded above. (Elkies has shown that any such bound must exceed 46.6.) Let x(n) be the sequence of "Hall numbers": positive non-square integers for which rx(n) exceeds 1. Extensive computer searches have identified approximately 50 Hall numbers. (It can be proved that infinitely many exist.) In this paper we study the minimum gap between consecutive Hall numbers. We prove that for all n, x(n + 1) - x(n) > (1/5)x(n)(1/6), with stronger gaps applying when x(n) is close to perfect even or odd squares (approximately x(n)(1/3) or x(n)(1/4), respectively). This result has obvious implications for the minimum "horizontal gap" (and hence straight line and arc distance) between integer points (whose x-coordinates exceed k2) on the Mordell elliptic curves x3 - y2 = k, a question that does not appear to have been addressed.