On the least common multiple of binary linear recurrence sequences

Abstract

In this paper, we present a method for estimating the least common multiple of a large class of binary linear recurrence sequences. Let P,Q,R0, and R1 be fixed integers and let R=(Rn)n be the recurrence sequence defined by Rn+2=PRn+1-QRn (∀ n≥ 0). Under some conditions on the parameters, we determine a rational nontrivial divisor for Lk,n:=lcm(Rk,Rk+1,…,Rn), for all positive integers n and k, such that n≥ k. As consequences, we derive nontrivial effective lower bounds for Lk,n and we establish an asymptotic formula for (Ln,n+m), where m is a fixed positive integer. Denoting by (Fn)n the usual Fibonacci sequence, we prove for example that for any m≥ 1, we have \[ lcm(Fn,Fn+1,…,Fn+m) n(m+1)~~~~as~n→ +∞,\] where denotes the golden ratio. We conclude the paper by some interesting identities and properties regarding the least common multiple of Lucas sequences.