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Avoidance Coupling

We examine the question of whether a collection of random walks on a graph can be coupled so that they never collide. In particular, we show that on the complete graph on n vertices, with or without loops, there is a Markovian coupling keeping apart Omega(n/log n) random walks, taking turns to move in discrete time.

7 nodes6 linksoverview previewAvoidance Coupling
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Avoidance Coupling7 visible / 7 total nodes / 16 links
Co-authorshipCo-authorshipCo-authorshipCo-authorshipCo-authorshipCo-authorshipCo-authorshipCo-authorshipCo-authorshipCo-authorshipAuthorshipAuthorshipAuthorshipAuthorshipTopic signalAuthorshipWAvoidance Couplingpreprint / 2013AOmer AngelResearcherAAlexander E. HolroydResearcherAJames MartinResearcherADavid B. WilsonResearcherTmath.PR7239 worksAPeter WinklerResearcher
PaperSignal 106 links

Avoidance Coupling

preprint / 2013

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