Repeat times and a two-weight UST model
Abstract
We study a model of random weighted uniform spanning trees on the complete graph with n vertices, where each edge is assigned a weight of n1+γ with probability 1/n and 1 otherwise. Whenever γ is large enough, we prove that the diameter of the resulting tree is typically of order n1/3 n, up to a n correction. Our approach uses estimates on repeat times for selecting components in a critical Erdos-R\'enyi graph, as well as concentration bounds on the sums of diameters of these components.
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