Maximal Steiner Trees in the Stochastic Mean-Field Model of Distance

Abstract

Consider the complete graph on n vertices, with edge weights drawn independently from the exponential distribution with unit mean. Janson showed that the typical distance between two vertices scales as n/n, whereas the diameter (maximum distance between any two vertices) scales as 3n/n. Bollob\'as et al. showed that, for any fixed k, the weight of the Steiner tree connecting k typical vertices scales as (k-1)n/n, which recovers Janson's result for k=2. We extend this result to show that the worst case k-Steiner tree, over all choices of k vertices, has weight scaling as (2k-1)n/n and finally, we generalise this result to Steiner trees with a mixture of typical and worst case vertices.