Dominating vertex covers:  the vertex-edge domination  problem

Klostermeyer, William F.; Messinger, Margaret-Ellen; Yeo, Anders

doi:10.7151/dmgt.2175

Cited by 3 publications

(2 citation statements)

References 7 publications

(11 reference statements)

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“…The set covering problem has an exponential complexity and is one of the NP-hard problems [60]. Hence, it is almost impossible to find an optimal solution in polynomial time [61].…”

Section: Literaturementioning

confidence: 99%

A New Direct Coefficient-Based Heuristic Algorithm for Set Covering Problems

Hashemi¹,

Gholami²,

Venkatadri³

et al. 2021

Int. J. Fuzzy Syst.

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The set covering problem is a fundamental model which comprises a wide range of important applications such as crew scheduling problems that need to cover a set of trips. It is one of the most common issues in the facility location problem, which requires further investigations, particularly in emergency and service facilities. As such, the objective of this study is to propose a new coefficient-based heuristic algorithm for the set covering problems. This paper has accordingly presented the algorithm that evaluates the qualification of subsets by directly applying a fitness function. This fitness function is formulated based on sets and subsets coefficients in a way that the subsets of selected sets have the lowest probability to be selected in the next iteration. The algorithm is not only capable of constructing an answer within polynomial time, but can solve complex set covering problems without conventional restrictions. The performance of this algorithm is evaluated on benchmark instances including a set of reproduced and selected OR-library problems within different sizes. Computational results indicate that the proposed heuristic algorithm produces better solutions, especially in large-scale problems comparing simulated annealing in terms of quality and time.

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“…The set covering problem has an exponential complexity and is one of the NP-hard problems [60]. Hence, it is almost impossible to find an optimal solution in polynomial time [61].…”

Section: Literaturementioning

confidence: 99%

A New Direct Coefficient-Based Heuristic Algorithm for Set Covering Problems

Hashemi¹,

Gholami²,

Venkatadri³

et al. 2021

Int. J. Fuzzy Syst.

View full text Add to dashboard Cite

show abstract

“…Relating vertex covering number with other dominating parameters is studied in [1,2]. In this paper, we characterize trees with equal vertex covering number and edge-vertex domination number.…”

Section: Introductionmentioning

confidence: 99%

Vertex cover and Edge vertex domination in trees

Senthilkumar

Kumar

Venkatakrishnan

2021

Proyecciones (Antofagasta)

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Let G = (V,E) be a simple graph. An edge e ∈ E(G) edge-vertex dominates a vertex v ∈ V (G) if e is incident with v or e is incident with a vertex adjacent to v. A subset D ⊆ E(G) is an edge-vertex dominating set of a graph G if every vertex of G is edge-vertex dominated by an edge of D. A vertex cover of G is a set C ⊆ V such that for each edge uv ∈ E at least one of u and v is in C. We characterize trees with edge-vertex domination number equals vertex covering number.

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Vertex-edge domination in cubic graphs

Ziemann

Żyliński

2020

Discrete Mathematics

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Dominating vertex covers: the vertex-edge domination problem

Cited by 3 publications

References 7 publications

A New Direct Coefficient-Based Heuristic Algorithm for Set Covering Problems

A New Direct Coefficient-Based Heuristic Algorithm for Set Covering Problems

Vertex cover and Edge vertex domination in trees

Vertex-edge domination in cubic graphs

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