Algorithmic aspects of semitotal domination in graphs

Henning, Michael A.; Pandey, Arti

doi:10.1016/j.tcs.2018.09.019

Cited by 31 publications

(32 citation statements)

References 15 publications

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“…Note that the same inapproximability result holds for DOMINATING SET, TOTAL DOMINATING SET and CONNECTED DOMINATING SET [14]. On the other hand, using the natural greedy algorithm for SET COVER, Henning and Pandey [31] showed that SEMITOTAL DOMINATING SET is in APX for graphs with bounded degree: it admits a 2 + 3 ln(∆ + 1) approximation algorithm for graphs with maximum degree ∆. Moreover, they showed that it is APX-complete for bipartite graphs with maximum degree 4 and asked whether the same holds for subcubic graphs.…”

Section: Approximation Hardnessmentioning

confidence: 73%

“…Henning and Pandey [31] showed that SEMITOTAL DOMINATING SET has the same approximation hardness as the well-known SET COVER: SEMITOTAL DOMINATING SET is not approximable within (1 − ε) ln n, for any ε > 0, unless NP ⊆ DTIME(n O(log log n) ). Note that the same inapproximability result holds for DOMINATING SET, TOTAL DOMINATING SET and CONNECTED DOMINATING SET [14].…”

Section: Approximation Hardnessmentioning

confidence: 99%

“…Finally, suppose H is the disjoint union of paths. If H contains at least two paths on at least 2 vertices, then H contains 2K 2 and the problem is NP-complete since it is NP-complete when restricted to split graphs [31] (see also Theorem 14). The same conclusion holds if H contains a path on at least 5 vertices.…”

Section: Complexity Dichotomies In Monogenic Classesmentioning

confidence: 99%

“…Graph class DOMINATING SET SEMITOTAL DOMINATING SET TOTAL DOMINATING SET bipartite NP-c [7] NP-c [31] NP-c [49] line graph of bipartite NP-c [37] NP-c Since γ(G) ≤ γ t2 (G) ≤ γ t (G), for any graph G with no isolated vertex, it is natural to ask for which graphs equalities hold. In Section 8, we show that the graphs attaining either of the two equalities are unlikely to have a polynomial characterisation.…”

Section: Introductionmentioning

confidence: 99%

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Semitotal Domination: New hardness results and a polynomial-time algorithm for graphs of bounded mim-width

Galby

Munaro

Ries

2020

Theoretical Computer Science

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A semitotal dominating set of a graph G with no isolated vertex is a dominating set D of G such that every vertex in D is within distance two of another vertex in D. The minimum size γ t2 (G) of a semitotal dominating set of G is squeezed between the domination number γ(G) and the total domination number γ t (G).SEMITOTAL DOMINATING SET is the problem of finding, given a graph G, a semitotal dominating set of G of size γ t2 (G). In this paper, we continue the systematic study on the computational complexity of this problem when restricted to special graph classes. In particular, we show that it is solvable in polynomial time for the class of graphs with bounded mim-width by a reduction to TOTAL DOMINATING SET and we provide several approximation lower bounds for subclasses of subcubic graphs. Moreover, we obtain complexity dichotomies in monogenic classes for the decision versions of SEMITOTAL DOMINATING SET and TOTAL DOMINATING SET.Finally, we show that it is NP-complete to recognise the graphs such that γ t2 (G) = γ t (G) and those such that γ(G) = γ t2 (G), even if restricted to be planar and with maximum degree at most 4, and we provide forbidden induced subgraph characterisations for the graphs heriditarily satisfying either of these two equalities.

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Section: Approximation Hardnessmentioning

confidence: 73%

Section: Approximation Hardnessmentioning

confidence: 99%

Section: Complexity Dichotomies In Monogenic Classesmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Semitotal Domination: New hardness results and a polynomial-time algorithm for graphs of bounded mim-width

Galby

Munaro

Ries

2020

Theoretical Computer Science

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“…We show that the decision version of the MINIMUM PAIRED DOMINATION problem is NP-complete for GP4 graphs, but the MINIMUM SEMIPAIRED DOMINATION problem is easily solvable for GP4 graphs. The class of GP4 graphs was introduced by Henning and Pandey in [15]. Below we recall the definition of GP4 graphs.…”

Section: Complexity Difference Between Paired Domination and Semipairmentioning

confidence: 99%

Complexity and Algorithms for Semipaired Domination in Graphs

Henning

Pandey

Tripathi

2019

Lecture Notes in Computer Science

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For a graph G = (V, E) with no isolated vertices, a set D ⊆ V is called a semipaired dominating set of G if (i) D is a dominating set of G, and (ii) D can be partitioned into two element subsets such that the vertices in each two element set are at distance at most two. The minimum cardinality of a semipaired dominating set of G is called the semipaired domination number of G, and is denoted by γ pr2 (G). The MINIMUM SEMIPAIRED DOMINATION problem is to find a semipaired dominating set of G of cardinality γ pr2 (G). In this paper, we initiate the algorithmic study of the MINIMUM SEMIPAIRED DOMINATION problem. We show that the decision version of the MINIMUM SEMI-PAIRED DOMINATION problem is NP-complete for bipartite graphs and split graphs. On the positive side, we present a linear-time algorithm to compute a minimum cardinality semipaired dominating set of interval graphs and trees. We also propose a 1 + ln(2∆ + 2)-approximation algorithm for the MINIMUM SEMIPAIRED DOMINATION problem, where ∆ denote the maximum degree of the graph and show that the MINIMUM SEMIPAIRED DOMINATION problem cannot be approximated within (1 − ) ln |V | for any > 0 unless NP ⊆ DTIME(|V | O(log log |V |) ).

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Semitotal domination number of some graph operations

Yıldız

Aytaç

2021

Numerical Methods Partial

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A semitotal dominating set S (abbreviated semi-TD-set) of graph G = (V, E) is a subset such that S is a dominating set and each vertex in the S is within 2 distance from the another vertex of S. The semitotal domination number, denoted by γ t2 (G), is the minimum cardinality taken over all semitotal dominating sets of G. In this paper, we examine the semitotal domination number of graphs obtained by some graph operations such as corona, join, modular product, and lexicographic product.

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Algorithmic aspects of semitotal domination in graphs

Cited by 31 publications

References 15 publications

Semitotal Domination: New hardness results and a polynomial-time algorithm for graphs of bounded mim-width

Semitotal Domination: New hardness results and a polynomial-time algorithm for graphs of bounded mim-width

Complexity and Algorithms for Semipaired Domination in Graphs

Semitotal domination number of some graph operations

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