Rational Points on Erdos-Selfridge Superelliptic Curves
Abstract
Given k ≥ 2, we show that there are at most finitely many rational numbers x and y ≠ 0 and integers ≥ 2 (with (k,) ≠ (2,2)) for which x (x+1) ·s (x+k-1) = y. In particular, if we assume that is prime, then all such triples (x,y,) satisfy either y=0 or < 3k.
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