Maximum GCD Among Pairs of Random Integers
Abstract
Fix α >0, and sample N integers uniformly at random from \1,2,… , eα N \. Given η >0, the probability that the maximum of the pairwise GCDs lies between N2-η and N2+η converges to 1 as N ∞ . More precise estimates are obtained. This is a Birthday Problem: two of the random integers are likely to share some prime factor of order N2/ [N]. The proof generalizes to any arithmetical semigroup where a suitable form of the Prime Number Theorem is valid.
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