Tight bounds for distributed MST verification

Liah Kor, Amos Korman, David Peleg

Research output: Chapter in Book/Report/Conference proceedingConference contributionpeer-review

19 Scopus citations

Abstract

This paper establishes tight bounds for the Minimum-weight Spanning Tree (MST) verification problem in the distributed setting. Specifically, we provide an MST verification algorithm that achieves simultaneously Ō(|E|) messages and Ō(√n + D) time, where |E| is the number of edges in the given graph G and D is G's diameter. On the negative side, we show that any MST verification algorithm must send Ω(|E|) messages and incur Ω(√ n + D) time in worst case. Our upper bound result appears to indicate that the verification of an MST may be easier than its construction, since for MST construction, both lower bounds of Ω(|E|) messages and Ω(√ n + D) time hold, but at the moment there is no known distributed algorithm that constructs an MST and achieves simultaneously Ō(|E|) messages and Ō(√ n + D) time. Specifically, the best known time-optimal algorithm (using Ō(√n + D) time) requires O(|E| + n3/2) messages, and the best known message-optimal algorithm (using Ō(|E|) messages) requires O(n) time. On the other hand, our lower bound results indicate that the verification of an MST is not significantly easier than its construction.

Original languageEnglish
Title of host publication28th International Symposium on Theoretical Aspects of Computer Science, STACS 2011
Pages69-80
Number of pages12
DOIs
StatePublished - 2011
Externally publishedYes
Event28th International Symposium on Theoretical Aspects of Computer Science, STACS 2011 - Dortmund, Germany
Duration: 10 Mar 201112 Mar 2011

Publication series

NameLeibniz International Proceedings in Informatics, LIPIcs
Volume9
ISSN (Print)1868-8969

Conference

Conference28th International Symposium on Theoretical Aspects of Computer Science, STACS 2011
Country/TerritoryGermany
CityDortmund
Period10/03/1112/03/11

Keywords

  • Distributed algorithms
  • Distributed verification
  • Labeling schemes
  • Minimum-weight spanning tree

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