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21st Cumberland Conference on Graph Theory, Combinatorics, and Computing ---In Honor of Mike Plummer's 70th Birthday
May 15-17, 2008
Vanderbilt University
Nashville, TN, USA

Organizers
Mark Ellingham and Gexin Yu

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The Domination Continuum
by
Miranda L. Roden
University of Alabama in Huntsville
Coauthors: Peter J. Slater (University of Alabama in Huntsville)

Motivated by problems involving placing detection devices in a graph G that models a facility or a computer processing network, and in which detection devices are subject to failure, we discuss the liar's domination number gLR(G). For gx(2, 3)(G) as defined next, we have gLR(G)=gx(2, 3)(G).

For each sequence c1, c2, c3, c4, ... with ci ≤ ci+1, we define a domination parameter gx(c1, c2, c3, ...)(G). The requirement is for each vertex subset of size i to be dominated at least ci times. We thus have an (uncountably) infinite lattice set of domination parameters. We focus on the 2-dimensional sublattice of parameters gx(c1, c2)(G), with particular attention paid to trees, and examine the relationships among these parameters.

Date received: April 17, 2008

Copyright © 2008 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cawn-44.