Escape of resources in a distributed clustering process

Jacob van den Berg (CWI and VU University Amsterdam)
Marcelo Richard Hilário (IMPA)
Alexander E. Holroyd (Microsoft Research and University of British Columbia)

Abstract


In a distributed clustering algorithm introduced by Coffman, Courtois, Gilbert and Piret [1], each vertex of $\mathbb{Z}^d$ receives an initial amount of a resource, and, at each iteration, transfers all of its resource to the neighboring vertex which currently holds the maximum amount of resource. In [4] it was shown that, if the distribution of the initial quantities of resource is invariant under lattice translations, then the flow of resource at each vertex eventually stops almost surely, thus solving a problem posed in [2]. In this article we prove the existence of translation-invariant initial distributions for which resources nevertheless escape to infinity, in the sense that the the final amount of resource at a given vertex is strictly smaller in expectation than the initial amount. This answers a question posed in [4].

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Pages: 442-448

Publication Date: September 30, 2010

DOI: 10.1214/ECP.v15-1567

References

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