Benjamin Girard
Published 2007-12-03Version 1
In this paper, building among others on earlier works by U. Krause and C. Zahlten (dealing with the case of cyclic groups), we obtain a new upper bound for the little cross number valid in the general case of arbitrary finite Abelian groups. Given a finite Abelian group, this upper bound appears to depend only on the rank and on the number of distinct prime divisors of the exponent. The main theorem of this paper allows us, among other consequences, to prove that a classical conjecture concerning the cross and little cross numbers of finite Abelian groups holds asymptotically in at least two different directions.
Comments: 21 pages, to appear in Israel Journal of Mathematics
Journal: Israel Journal of Mathematics 172 (2009) 253-278
On a problem of de Koninck
The equation $ω(n)=ω(n+1)$
A summation of the number of distinct prime divisors of the lcm
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