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引用次数: 0
摘要
摘要考虑了2 < b < c的Diophantine三元组{2,b, c}的可拓性,并证明了该集合不能被扩展到不规则的Diophantine四重组。我们成功地证明了c的一些族(取决于b)。作为推论,例如,我们证明了对于b/2−1素数,所有2 < b < c < d的Diophantine四元组{2,b, c, d}都是正则的。
The extensibility of the Diophantine triple {2, b, c}
Abstract The aim of this paper is to consider the extensibility of the Diophantine triple {2, b, c}, where 2 < b < c, and to prove that such a set cannot be extended to an irregular Diophantine quadruple. We succeed in that for some families of c’s (depending on b). As corollary, for example, we prove that for b/2 − 1 prime, all Diophantine quadruples {2, b, c, d} with 2 < b < c < d are regular.
期刊介绍:
This journal is founded by Mirela Stefanescu and Silviu Sburlan in 1993 and is devoted to pure and applied mathematics. Published by Faculty of Mathematics and Computer Science, Ovidius University, Constanta, Romania.
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