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RSA
2010

Weight of a link in a shortest path tree and the Dedekind Eta function

13 years 10 months ago
Weight of a link in a shortest path tree and the Dedekind Eta function
The weight of a randomly chosen link in the shortest path tree on the complete graph with exponential i.i.d. link weights is studied. The corresponding exact probability generating function and the asymptotic law are derived. As a remarkable coincidence, this asymptotic law is precisely the same as the distribution of the cost of one “job” in the random assignment problem. We also show that the asymptotic (scaled) maximum interattachment time to that shortest path tree, which is a uniform recursive tree, equals the square of the Dedekind Eta function, a central function in modular forms, elliptic functions and the theory of partitions.
Piet Van Mieghem
Added 30 Jan 2011
Updated 30 Jan 2011
Type Journal
Year 2010
Where RSA
Authors Piet Van Mieghem
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