The mixing time of the giant component of a random graph

The mixing time of the giant component of a random graph

We show that the total variation mixing time of the simple random walk on the giant component of supercritical G(n,p) and G(n,m) is Θ(log2n). This statement was proved, independently, by Fountoulakis and Reed. Our proof follows from a structure result for these graphs which is interesting in its own...

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Veröffentlicht in:Random structures & algorithms 2014-10, Vol.45 (3), p.383-407
Hauptverfasser: Benjamini, Itai, Kozma, Gady, Wormald, Nicholas
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Constants
Decoration
expander
Expanders
giant component
Graphs
mixing time
Proving
random graph
Random walk
Random walk theory
Reeds
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Zusammenfassung:We show that the total variation mixing time of the simple random walk on the giant component of supercritical G(n,p) and G(n,m) is Θ(log2n). This statement was proved, independently, by Fountoulakis and Reed. Our proof follows from a structure result for these graphs which is interesting in its own right. We show that these graphs are “decorated expanders” — an expander glued to graphs whose size has constant expectation and exponential tail, and such that each vertex in the expander is glued to no more than a constant number of decorations. © 2014 Wiley Periodicals, Inc. Random Struct. Alg., 45, 383–407, 2014
ISSN:1042-9832
1098-2418
DOI:10.1002/rsa.20539