Add to ORKGWe show that the fractional parts of the ratios n/ω(n), n/aω(n), n/τ(n) and n/aτ(n), where a ≥ 2 is a fixed integer and, as usual, ω(n) and τ(n) denote the number of prime divisors and the total number of divisors of n > 1, respectively, are uniformly distributed in the unit interval [0, 1]. This complements results of several authors about the scarcity of integral values taken by the above fractions.12 page(s
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We estimate the density of integers which have more than one divisor in an interval (y, z] with z ≈ ...
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We study the distribution of the positive integers n which are composite and whose average prime di...
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