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dc.contributor.advisorNancy Lynch
dc.contributor.authorRadeva, Tsvetomiraen_US
dc.contributor.authorLynch, Nancyen_US
dc.contributor.otherTheory of Computationen
dc.date.accessioned2011-04-21T18:15:25Z
dc.date.available2011-04-21T18:15:25Z
dc.date.issued2011-04-14
dc.identifier.urihttp://hdl.handle.net/1721.1/62295
dc.description.abstractPartial Reversal (PR) is a link reversal algorithm which ensures that the underlying graph structure is destination-oriented and acyclic. These properties of PR make it useful in routing protocols and algorithms for solving leader election and mutual exclusion. While proofs exist to establish the acyclicity property of PR, they rely on assigning labels to either the nodes or the edges in the graph. In this work we present simpler direct proof of the acyclicity property of partial reversal without using any external or dynamic labeling mechanism. First, we provide a simple variant of the PR algorithm, and show that it maintains acyclicity. Next, we present a binary relation which maps the original PR algorithm to the new algorithm, and finally, we conclude that the acyclicity proof applies to the original PR algorithm as well.en_US
dc.format.extent20 p.en_US
dc.relation.ispartofseriesMIT-CSAIL-TR-2011-022
dc.subjectPartial Reversalen_US
dc.subjectLink Reversalen_US
dc.subjectGraph Algorithmsen_US
dc.titlePartial Reversal Acyclicityen_US


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