On members of Lucas sequences which are products of Catalan numbers

Abstract

We show that if \Un\n≥ 0 is a Lucas sequence, then the largest n such that |Un|=Cm1Cm2·s Cmk with 1≤ m1≤ m2≤ ·s≤ mk, where Cm is the mth Catalan number satisfies n<6500. In case the roots of the Lucas sequence are real, we have n∈ \1,2, 3, 4, 6, 8, 12\. As a consequence, we show that if \Xn\n≥ 1 is the sequence of the X coordinates of a Pell equation X2-dY2= 1 with a nonsquare integer d>1, then Xn=Cm implies n=1.