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Exact thresholds for Ising–Gibbs samplers on general graphs

dc.contributor.authorMossel, Elchanan
dc.contributor.authorSly, Allan
dc.date.accessioned2016-03-03T05:56:59Z
dc.date.available2016-03-03T05:56:59Z
dc.date.issued2013
dc.date.updated2016-06-14T09:13:21Z
dc.description.abstractWe establish tight results for rapid mixing of Gibbs samplers for the Ferromagnetic Ising model on general graphs. We show that if (d − 1)tanhβ < 1, then there exists a constant C such that the discrete time mixing time of Gibbs samplers for the ferromagnetic Ising model on any graph of n vertices and maximal degree d, where all interactions are bounded by β, and arbitrary external fields are bounded by Cn log n. Moreover, the spectral gap is uniformly bounded away from 0 for all such graphs, as well as for infinite graphs of maximal degree d. We further show that when d tanhβ < 1, with high probability over the Erdos–Rényi random graph G(n, d/n), it holds that the mixing time of Gibbs samplers is n¹⁺ᶱ(1/log log n). Both results are tight, as it is known that the mixing time for random regular and Erdos–Rényi random graphs is, with high probability, exponential ˝ in n when (d − 1)tanhβ > 1, and d tanhβ > 1, respectively. To our knowledge our results give the first tight sufficient conditions for rapid mixing of spin systems on general graphs. Moreover, our results are the first rigorous results establishing exact thresholds for dynamics on random graphs in terms of spatial thresholds on trees.
dc.identifier.issn0091-1798en_AU
dc.identifier.urihttp://hdl.handle.net/1885/99984
dc.publisherInstitute of Mathematical Statistics
dc.rightshttp://www.sherpa.ac.uk/romeo/issn/0091-1798..."author can archive publisher's version/PDF. On author's personal website or open access repository" from SHERPA/RoMEO site (as at 3/03/16).
dc.sourceThe Annals of Probability
dc.subjectKeywords: Glauber dynamics; Ising model; Phase transition
dc.titleExact thresholds for Ising–Gibbs samplers on general graphs
dc.typeJournal article
dcterms.accessRightsOpen Accessen_AU
local.bibliographicCitation.issue1en_AU
local.bibliographicCitation.lastpage328en_AU
local.bibliographicCitation.startpage294en_AU
local.contributor.affiliationMossel, Elchanan, University of California Berkeley, United States of Americaen_AU
local.contributor.affiliationSly, Allan, College of Physical and Mathematical Sciences, CPMS Mathematical Sciences Institute, Department of Mathematics, The Australian National Universityen_AU
local.contributor.authoruidu3270903en_AU
local.description.notesImported from ARIESen_AU
local.identifier.absfor010506en_AU
local.identifier.absseo970101en_AU
local.identifier.ariespublicationu5328909xPUB24en_AU
local.identifier.citationvolume41en_AU
local.identifier.doi10.1214/11-AOP737en_AU
local.identifier.scopusID2-s2.0-84875003099
local.publisher.urlhttp://imstat.org/en/index.htmlen_AU
local.type.statusPublished Versionen_AU

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