Master's Dissertation
DOI
https://doi.org/10.11606/D.45.2010.tde-20230727-113715
Document
Author
Full name
Wanderley Guimarães da Silva
E-mail
Institute/School/College
Knowledge Area
Date of Defense
Published
São Paulo, 2010
Supervisor
Title in Portuguese
Conjuntos dominantes em grafos
Keywords in Portuguese
Algoritmos
Teoria Dos Grafos
Teoria Dos Grafos
Abstract in Portuguese
Num grafo G, dizemos que um conjunto de vértices S é dominante se todo vértice em V ( G) S é adjacente a um vértice de S. Denotamos por y( G) a cardinalidade mínima de um conjunto dominante de G. Nesta dissertação, apresentamos uma resenha que abrange os aspectos estruturais e algorítmicos de problemas relacionados a este tópico. Descrevemos vários resultados e demonstramos alguns sobre limites superiores para y( G), que levam em conta o grau mínimo de G. Caracterizamos também algumas subclasses de grafos G para os quais y( G) atinge precisamente o limite superior provado para a classe dessses grafos. Mostramos que o problema de encontrar um conjunto dominante mínimo é NP-difícil, e apresentamos algoritmos lineares que resolvem esse problema quando o grafo é um disco triangulado ou uma árvore. A maior parte dos resultados apresentados aqui apareceram na literatura. Para alguns resultados, apresentamos provas ou algoritmos diferentes, e alguns corolários novos. Para árvores, projetamos um algoritmo simples que é baseado na enumeração em pós-ordem de seus vértices.
Title in English
not available
Abstract in English
ln a graph G, a subset S of vertices is called a dominating set if each vertex in V ( G) S is adjacent to vertex in S . Toe domination number of a graph G, denoted by 1 ( G), is the minimum size of a dominating set of G. ln this dissertation, we presenta survey on the structural and algorithmic aspects of problems on the domination number. We prove some upper bounds for 1 ( G) that are based on the mininum degree of G. We also caracterize some subclasses of graphs G for which ,( G) attains precisely the upper bound proved for these classes of graphs. We show that the problem of finding a dominating set of minimum size is NP-hard, and present linear-time algorithms to solve this problem on triangulated disks and trees. Most of the results presented here have appeared in the literature. For some re- sults, we present different proofs or algorithms, and some corollaries which were not mentioned in the literahtre. For trees, we designed a simple algorithm based on the post-order enumeration of its vertices.
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Publishing Date
2023-07-27
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