A Brownian weak limit for the least common multiple of a random m-tuple of integers

Abstract

Let Bn(m) be a set picked uniformly at random among all m-elements subsets of \1,2,…,n\. We provide a pathwise construction of the collection (Bn(m))1≤ m≤ n and prove that the logarithm of the least common multiple of the integers in (Bn( mt))t≥ 0, properly centered and normalized, converges to a Brownian motion when both m,n tend to infinity. Our approach consists of two steps. First, we show that the aforementioned result is a consequence of a multidimensional central limit theorem for the logarithm of the least common multiple of m independent random variables having uniform distribution on \1,2,…,n\. Second, we offer a novel approximation of the least common multiple of a random sample by the product of the elements of the sample with neglected multiplicities in their prime decompositions.