E. Ben-Naim, P. L. Krapivsky
Published 2003-07-30Version 1
The largest component (``the leader'') in evolving random structures often exhibits universal statistical properties. This phenomenon is demonstrated analytically for two ubiquitous structures: random trees and random graphs. In both cases, lead changes are rare as the average number of lead changes increases quadratically with logarithm of the system size. As a function of time, the number of lead changes is self-similar. Additionally, the probability that no lead change ever occurs decays exponentially with the average number of lead changes.
Comments: 5 pages, 3 figures
Journal: Europhys. Lett. 65, 151 (2004)
When is the average number of saddle points typical?
Number of spanning clusters at the high-dimensional percolation thresholds
The average number of distinct sites visited by a random walker on random graphs
