On the D(4)-pairs \a, ka\ with k∈ \2,3,6\

Abstract

Let a and b=ka be positive integers with k∈ \2, 3, 6\, such that ab+4 is a perfect square. In this paper, we study the extensibility of the D(4)-pairs \a, ka\. More precisely, we prove that by considering three families of positive integers c depending on a, if \a, b, c, d\ is the set of positive integers which has the property that the product of any two of its elements increased by 4 is a perfect square, then d in given by d=a+b+c+12(abc (ab+4)(ac+4)(bc+4)). As a corollary, we prove that any D(4)-quadruple which contains the pair \a, ka\ is regular.