There is no Diophantine quintuple
Abstract
A set of m positive integers \a1, a2, … , am\ is called a Diophantine m-tuple if ai aj + 1 is a perfect square for all 1 i < j m. In 2004 Dujella proved that there is no Diophantine sextuple and that there are at most finitely many Diophantine quintuples. In particular, a folklore conjecture concerning Diophantine m-tuples states that no Diophantine quintuple exists at all. In this paper we prove this conjecture.
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