On the x--coordinates of Pell equations which are products of two: Lucas numbers, Pell numbers

Abstract

Let \Ln\n 0 be the sequence of Lucas numbers given by L0=2, ~ L1=1 and Ln+2=Ln+1+Ln for all n 0 . In the first paper, for an integer d≥ 2 which is square-free, we show that there is at most one value of the positive integer x participating in the Pell equation x2-dy2= 1 which is a product of two Lucas numbers, with a few exceptions that we completely characterize. Let \Pm\m 0 be the sequence of Pell numbers given by P0=0, ~ P1=1 and Pm+2=2Pm+1+Pm for all m 0 . In the second paper, for an integer d≥ 2 which is square free, we show that there is at most one value of the positive integer x participating in the Pell equation x2-dy2 = 1 which is a product of two Pell numbers.