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Original scientific paper

https://doi.org/10.3336/gm.45.1.02

The number of Diophantine quintuples

Yasutsugu Fujita ; Department of Mathematics, College of Industrial Technology, Nihon University, 2-11-1 Shin-ei, Narashino, Chiba, Japan


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Abstract

A set {a1, ... ,am} of m distinct positive integers is called a Diophantine m-tuple if aiaj+1 is a perfect square for all i, j with 1 ≤ i < j ≤ m. It is known that there does not exist a Diophantine sextuple and that there exist only finitely many Diophantine quintuples. In this paper, we first show that for a fixed Diophantine triple {a,b,c} with a < b < c, the number of Diophantine quintuples {a,b,c,d,e} with c < d < e is at most four. Using this result, we further show that the number of Diophantine quintuples is less than 10276, which improves the bound 101930 due to Dujella.

Keywords

Simultaneous Diophantine equations; Diophantine tuples

Hrčak ID:

52364

URI

https://hrcak.srce.hr/52364

Publication date:

17.5.2010.

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