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  • Author or Editor: Bing-Ling Wu x
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Abstract

Let Hn be the n-th harmonic number and let vn be its denominator. It is known that vn is even for every integer n>=2. In this paper, we study the properties of Hn and prove that for any integer n, vn = en(1+o(1)). In addition, we obtain some results of the logarithmic density of harmonic numbers.

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