A problem of Erdos-Graham-Granville-Selfridge on integral points on hyperelliptic curves

Abstract

Erdos, Graham, and Selfridge considered, for each positive integer n, the least value of tn so that the integers n+1, n+2, …, n+tn contain a subset the product of whose members with n is a square. An open problem posed by Granville concerns the size of tn, under the assumption of the ABC Conjecture. We establish some results on the distribution of tn, and in the process solve Granville's problem unconditionally.

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