The Number of 2-dominating Sets, and 2-domination Polynomial of a Graph

The Number of 2-dominating Sets, and 2-domination Polynomial of a Graph

Let be a simple graph. A set is a -dominating set of , if every vertex of has at least two neighbors in . The -domination number of a graph , is denoted by and is the minimum size of the -dominating sets of . In this paper, we count the number of -dominating sets of . To do this, we consider a polyn...

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Veröffentlicht in:Lobachevskii journal of mathematics 2021-04, Vol.42 (4), p.751-759
Hauptverfasser: Movahedi, F., Akhbari, M. H., Alikhani, S.
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
Analysis
Geometry
Mathematical Logic and Foundations
Mathematics
Mathematics and Statistics
Polynomials
Probability Theory and Stochastic Processes
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Zusammenfassung:Let be a simple graph. A set is a -dominating set of , if every vertex of has at least two neighbors in . The -domination number of a graph , is denoted by and is the minimum size of the -dominating sets of . In this paper, we count the number of -dominating sets of . To do this, we consider a polynomial which is the generating function for the number of -dominating sets of and call it -domination polynomial. We study some properties of this polynomial. Furthermore, we compute the -domination polynomial for some of the graph families.
ISSN:1995-0802
1818-9962
DOI:10.1134/S1995080221040156