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Interlacements and the Wired Uniform Spanning Forest

Accepted version
Peer-reviewed

Type

Article

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Authors

Hutchcroft, Tom 

Abstract

We extend the Aldous-Broder algorithm to generate the wired uniform spanning forests (WUSFs) of infinite, transient graphs. We do this by replacing the simple random walk in the classical algorithm with Sznitman's random interlacement process. We then apply this algorithm to study the WUSF, showing that every component of the WUSF is one-ended almost surely in any graph satisfying a certain weak anchored isoperimetric condition, that the number of `excessive ends' in the WUSF is non-random in any graph, and also that every component of the WUSF is one-ended almost surely in any transient unimodular random rooted graph. The first two of these results answer positively two questions of Lyons, Morris and Schramm, while the third extends a recent result of the author.

Finally, we construct a counterexample showing that almost sure one-endedness of WUSF components is not preserved by rough isometries of the underlying graph, answering negatively a further question of Lyons, Morris and Schramm.

Description

Keywords

Spanning forests, random interlacements, unimodular random graphs, coarse geometry

Journal Title

Annals of Probability

Conference Name

Journal ISSN

0091-1798

Volume Title

Publisher

Institute of Mathematical Statistics