Random minimum spanning tree and dense graph limits

Abstract

A theorem of Frieze from 1985 asserts that the total weight of the minimum spanning tree of the complete graph Kn whose edges get independent weights from the distribution UNIFORM[0,1] converges to Ap\'ery's constant in probability, as n∞. We generalize this result to sequences of graphs Gn that converge to a graphon W. Further, we allow the weights of the edges to be drawn from different distributions (subject to moderate conditions). The limiting total weight (W) of the minimum spanning tree is expressed in terms of a certain branching process defined on W, which was studied previously by Bollob\'as, Janson and Riordan in connection with the giant component in inhomogeneous random graphs.

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