The Diophantine equation b (b+1) (b+2) = t a (a + 1) (a + 2) and gap principle
Abstract
In this article, we are interested in whether a product of three consecutive integers a (a+1) (a+2) divides another such product b (b+1) (b+2). If this happens, we prove that there is some gaps between them, namely b a a)1/6 a)1/3. We also consider other polynomial sequences such as a2 (a2 + l) dividing b2 (b2 + l) for some fixed integer l. Our method is based on effective Liouville-Baker-Feldman theorem.
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