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.
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