The multiple domination and limited packing problems in graphs

The multiple domination and limited packing problems in graphs

In this work we confront—from a computational viewpoint—the Multiple Domination problem, introduced by Harary and Haynes in 2000 among other variations of domination, with the Limited Packing problem, introduced in 2009. In particular, we prove that the Limited Packing problem is NP-complete for spl...

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Bibliographic Details
Published in:Information processing letters Vol. 111; no. 23; pp. 1108 - 1113
Main Authors: Dobson, M.P., Leoni, V., Nasini, G.
Format: Journal Article
Language:English
Published: Amsterdam Elsevier B.V 15-12-2011
Elsevier
Elsevier Sequoia S.A
Subjects:
Algorithmics. Computability. Computer arithmetics
Applied sciences
Combinatorial analysis
Combinatorics
Combinatorics. Ordered structures
Computation
Computational complexity
Computer science; control theory; systems
Designs and configurations
Exact sciences and technology
Graph algorithms
Graph theory
Graphs
Information retrieval. Graph
Mathematical problems
Mathematics
Miscellaneous
Packing problem
Polynomials
Sciences and techniques of general use
Studies
Theoretical computing
Unions
Computational complexity
Graph algorithms
Packing
Computer theory
Information processing
NP complete problem
Bipartite graph
Algorithm analysis
Graph algorithm
Polynomial time
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Summary:In this work we confront—from a computational viewpoint—the Multiple Domination problem, introduced by Harary and Haynes in 2000 among other variations of domination, with the Limited Packing problem, introduced in 2009. In particular, we prove that the Limited Packing problem is NP-complete for split graphs and for bipartite graphs, two graph classes for which the Multiple Domination problem is also NP-complete (Liao and Chang, 2003). For a fixed capacity, we prove that these two problems are polynomial time solvable in quasi-spiders. Furthermore, by analyzing the combinatorial numbers that are involved in their definitions applied to the join and the union of graphs, we show that both problems can be solved in polynomial time for P 4 -tidy graphs. From this result, we derive that they are polynomial time solvable in P 4 -lite graphs, giving in this way an answer to a question stated by Liao and Chang on the domination side.
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ISSN:0020-0190
1872-6119
DOI:10.1016/j.ipl.2011.09.002