The denominators of harmonic numbers (Revised)
Abstract
The denominators dn of the harmonic number 1+12+13+·s+1n do not increase monotonically with~n. It is conjectured that dn=Dn= LCM(1,2,…,n) infinitely often. For an odd prime p, the set \n:pdn|Dn\ has a harmonic density. Moreover, for 2<p1<p2<·s<pk, with p1/ pi (1 i k) being linearly independent, there exists n such that p1p2·s pkdn|Dn.
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