Limit theorems for the least common multiple of a random set of integers
Abstract
Let Ln be the least common multiple of a random set of integers obtained from \1,…,n\ by retaining each element with probability θ∈ (0,1) independently of the others. We prove that the process ( L nt)t∈ [0,1], after centering and normalization, converges weakly to a certain Gaussian process that is not Brownian motion. Further results include a strong law of large numbers for Ln as well as Poisson limit theorems in regimes when θ depends on n in an appropriate way.
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