DocumentCode
1175356
Title
Optimal domination in graphs
Author
Cockayne, E.J. ; Hedetniemi, Stephen T.
Volume
22
Issue
11
fYear
1975
fDate
11/1/1975 12:00:00 AM
Firstpage
855
Lastpage
857
Abstract
Graph theoretic techniques provide a convenient tool for the investigation of communication networks. Here a communication network is represented by a nonoriented linear graph, in which the edges represent communication links and the vertices represent cities. A transmitting group is a set of cities which, acting as transmitting stations, can transmit messages to every city in the network. Stated graph theoretically, a transmitting group is a dominating set, i.e., a set of vertices
having the property that any vertex not in
is adjacent to at least one vertex in
. The problem of finding disjoint dominating sets in a graph is studied, in particular, the domatic number
of a graph
is defined as the maximum order of a partition of the vertices of
into dominating sets.
having the property that any vertex not in
is adjacent to at least one vertex in
. The problem of finding disjoint dominating sets in a graph is studied, in particular, the domatic number
of a graph
is defined as the maximum order of a partition of the vertices of
into dominating sets.Keywords
Communication networks; Graph theory; Graph theory and combinatorics; Circuits and systems; Cities and towns; Communication networks; Costs; Councils; Mathematics; Rail to rail outputs;
fLanguage
English
Journal_Title
Circuits and Systems, IEEE Transactions on
Publisher
ieee
ISSN
0098-4094
Type
jour
DOI
10.1109/TCS.1975.1083994
Filename
1083994
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