Discussiones Mathematicae
Graph Theory 18(1) (1998) 127-142
DOI: https://doi.org/10.7151/dmgt.1069
AN INEQUALITY CHAIN OF DOMINATION PARAMETERS FOR TREES
E.J. Cockayne Department of Mathematics, University of Victoria |
O. Favaron and J. Puech LRI, Bât. 490, Université de Paris-Sud |
C.M. Mynhardt Department of Mathematics, University of South Africa |
Abstract
We prove that the smallest cardinality of a maximal packing in any tree is at most the cardinality of an R-annihilated set. As a corollary to this result we point out that a set of parameters of trees involving packing, perfect neighbourhood, R-annihilated, irredundant and dominating sets is totally ordered. The class of trees for which all these parameters are equal is described and we give an example of a tree in which most of them are distinct.
Keywords: domination, irredundance, packing, perfect neighbourhoods, annihilation.
1991 Mathematics Subject Classification: 05C70, 05C05.
References
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Received 30 October 1997
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