Partitioning a graph into monopoly sets
Citation
Naji, A. M. & Nandappa D., S. (2017). Partitioning a graph into monopoly sets. TWMS Journal Of Applied And Engineering Mathematics, 7(1), 154-164.Abstract
In a graph G = (V, E), a set M ? V (G) is said to be a monopoly set of G if every vertex v ? V ? M has, at least, d(v)/2 neighbors in M. The monopoly size of G, denoted by mo(G), is the minimum cardinality of a monopoly set. In this paper, we study the problem of partitioning V (G) into monopoly sets. An M-partition of a graph G is the partition of V (G) into k disjoint monopoly sets. The monatic number of G, denoted by µ(G), is the maximum number of sets in M-partition of G. It is shown that 2 ? µ(G) ? 3 for every graph G without isolated vertices. The properties of each monopoly partite set of G are presented. Moreover, the properties of all graphs G having µ(G) = 3, are presented. It is shown that every graph G having µ(G) = 3 is Eulerian and have ?(G) ? 3. Finally, it is shown that for every integer k /? {1, 2, 4}, there exists a graph G of order n = k having µ(G) = 3.
Volume
7Issue
1URI
http://belgelik.isikun.edu.tr/xmlui/handle/iubelgelik/2619http://jaem.isikun.edu.tr/web/index.php/archive/93-vol7no1/287
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