Lucas sequences whose 12th or 9th term is a square

Abstract

Let P and Q be non-zero relatively prime integers. The Lucas sequence Un(P,Q) is defined by U0=0, U1=1, Un = P Un-1-Q Un-2 for n>1. The sequence Un(1,-1) is the familiar Fibonacci sequence, and it was proved by Cohn that the only perfect square greater than 1 in this sequence is U12=144. The question arises, for which parameters P, Q, can Un(P,Q) be a perfect square? In this paper, we complete recent results of Ribenboim and MacDaniel. Under the only restriction GCD(P,Q)=1 we determine all Lucas sequences Un(P,Q) with U12= square. It turns out that the Fibonacci sequence provides the only example. Moreover, we also determine all Lucas sequences Un(P,Q) with U9= square.

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