On the l.c.m. of random terms of binary recurrence sequences

Abstract

For every positive integer n and every δ ∈ [0,1], let B(n, δ) denote the probabilistic model in which a random set A ⊂eq \1, …, n\ is constructed by choosing independently every element of \1, …, n\ with probability δ. Moreover, let (uk)k ≥ 0 be an integer sequence satisfying uk = a1 uk - 1 + a2 uk - 2, for every integer k ≥ 2, where u0 = 0, u1 ≠ 0, and a1, a2 are fixed nonzero integers; and let α and β, with |α| ≥ |β|, be the two roots of the polynomial X2 - a1 X - a2. Also, assume that α / β is not a root of unity. We prove that, as δ n / n +∞, for every A in B(n, δ) we have lcm (ua : a ∈ A) δLi2(1 - δ)1 - δ · 3\!|α / \!(a12, a2)|π2 · n2 with probability 1 - o(1), where lcm denotes the lowest common multiple, Li2 is the dilogarithm, and the factor involving δ is meant to be equal to 1 when δ = 1. This extends previous results of Akiyama, Tropak, Matiyasevich, Guy, Kiss and M\'aty\'as, who studied the deterministic case δ = 1, and is motivated by an asymptotic formula for lcm(A) due to Cilleruelo, Ru\'e, Sarka, and Zumalac\'arregui.