Nontrivial lower bounds for the least common multiple of some finite sequences of integers

Abstract

We present here a method which allows to derive a nontrivial lower bounds for the least common multiple of some finite sequences of integers. We obtain efficient lower bounds (which in a way are optimal) for the arithmetic progressions and lower bounds less efficient (but nontrivial) for quadratic sequences whose general term has the form un = a n (n + t) + b with (a, t, b) ∈ Z3, a ≥ 5, t ≥ 0, gcd(a, b) = 1. From this, we deduce for instance the lower bound: lcm\12 + 1, 22 + 1, ..., n2 + 1\ ≥ 0,32 (1,442)n (for all n ≥ 1). In the last part of this article, we study the integer lcm(n, n + 1, ..., n + k) (k ∈ N, n ∈ N*). We show that it has a divisor dn, k simple in its dependence on n and k, and a multiple mn, k also simple in its dependence on n. In addition, we prove that both equalities: lcm(n, n + 1, ..., n + k) = dn, k and lcm(n, n + 1, ..., n + k) = mn, k hold for an infinitely many pairs (n, k).