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COMBINATORICS
2000

When Structures Are Almost Surely Connected

13 years 10 months ago
When Structures Are Almost Surely Connected
Let An denote the number of objects of some type of "size" n, and let Cn denote the number of these objects which are connected. It is often the case that there is a relation between a generating function of the Cn's and a generating function of the An's. Wright showed that if limn Cn/An = 1, then the radius of convergence of these generating functions must be zero. In this paper we prove that if the radius of convergence of the generating functions is zero, then lim supn Cn/An = 1, proving a conjecture of Compton; moreover, we show
Jason P. Bell
Added 17 Dec 2010
Updated 17 Dec 2010
Type Journal
Year 2000
Where COMBINATORICS
Authors Jason P. Bell
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