Decision and approximation complexity for identifying codes and locating-dominating sets in restricted graph classes

Foucaud, Florent

doi:10.1016/j.jda.2014.08.004

Cited by 23 publications

(32 citation statements)

References 48 publications

(80 reference statements)

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“…Locating-Dominating Set was rst proved to be NP-complete in [7], a result extended to bipartite graphs in [5]. This was improved to pla-nar bipartite unit disk graphs [29] and to planar bipartite subcubic graphs [14].…”

Section: Metric Dimensionmentioning

confidence: 99%

“…On the positive side, Locating-Dominating Set is constant-factor approximable for bounded degree graphs [20], line graphs [14,15], interval graphs [4] and is linear-time solvable for graphs of bounded clique-width (using Courcelle's theorem [8]). Furthermore, an explicit linear-time algorithm solving LocatingDominating Set on trees is known [33].…”

Section: Metric Dimensionmentioning

confidence: 99%

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Algorithms and Complexity for Metric Dimension and Location-domination on Interval and Permutation Graphs

Foucaud

Mertzios

Naserasr

et al. 2016

Graph-Theoretic Concepts in Computer Science

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Abstract. We study the problems Locating-Dominating Set and Metric Dimension, which consist of determining a minimum-size set of vertices that distinguishes the vertices of a graph using either neighbourhoods or distances. We consider these problems when restricted to interval graphs and permutation graphs. We prove that both decision problems are NP-complete, even for graphs that are at the same time interval graphs and permutation graphs and have diameter 2. While Locating-Dominating Set parameterized by solution size is trivially xed-parameter-tractable, it is known that Metric Dimension is W [2]-hard. We show that for interval graphs, this parameterization of Metric Dimension is xed-parameter-tractable.

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Section: Metric Dimensionmentioning

confidence: 99%

Section: Metric Dimensionmentioning

confidence: 99%

Algorithms and Complexity for Metric Dimension and Location-domination on Interval and Permutation Graphs

Foucaud

Mertzios

Naserasr

et al. 2016

Graph-Theoretic Concepts in Computer Science

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“…The positive approximation bound follows, as Minimum Locating‐Dominating Set is well known to be

O (\ln n)

‐approximable, see for example Gravier et al . Moreover, it follows from a reduction for Minimum Identifying Code in the first author's thesis [5, section 6.4] and a lemma from Gravier et al (see also Foucaud ) that Minimum Locating‐Dominating Set is NP‐hard to approximate within a factor of

o (\ln n)

for graphs having a vertex adjacent to all other vertices. This proves the nonapproximability bound.…”

Section: Complexity Resultsmentioning

confidence: 99%

Centroidal bases in graphs

2014

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We introduce the notion of a centroidal locating set of a graph G, that is, a set L of vertices such that all vertices in G are uniquely determined by their relative distances to the vertices of L. A centroidal locating set of G of minimum size is called a centroidal basis, and its size is the centroidal dimension CD(G). This notion, which is related to previous concepts, gives a new way of identifying the vertices of a graph. The centroidal dimension of a graph G is lowerand upper-bounded by the metric dimension and twice the location-domination number of G, respectively. The latter two parameters are standard and well-studied notions in the field of graph identification.We show that for any graph G with n vertices and maximum degree at least 2, (1 + o(1)) ln n ln ln n ≤ CD(G) ≤ n − 1. We discuss the tightness of these bounds and in particular, we characterize the set of graphs reaching the upper bound. We then show that for graphs in which every pair of vertices is connected via a bounded number of paths, CD(G) = Ω |E(G)| , the bound being tight for paths and cycles. We finally investigate the computational complexity of determining CD(G) for an input graph G, showing that the problem is hard and cannot even be approximated efficiently up to a factor of o(log n). We also give an O √ n ln napproximation algorithm.

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“…We now study the four dual parameterizations for Partial VC Dimension, that is, parameters |E|−k, |X|−k, |E|−ℓ and |X|−ℓ. Note that Distinguishing Transversal is NP-hard for neighborhood hypergraphs of graphs (see for example [35]). This corresponds to Partial VC Dimension with |X| = |E| = ℓ and hence Partial VC Dimension is not in XP for parameters |E| − ℓ and |X| − ℓ.…”

Section: Dual Parameterizationsmentioning

confidence: 99%

Parameterized and approximation complexity of Partial VC Dimension

Bazgan

Foucaud

Sikora

2019

Theoretical Computer Science

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We introduce the problem Partial VC Dimension that asks, given a hypergraph H = (X, E) and integers k and ℓ, whether one can select a set C ⊆ X of k vertices of H such that the set {e ∩ C, e ∈ E} of distinct hyperedge-intersections with C has size at least ℓ. The sets e ∩ C define equivalence classes over E. Partial VC Dimension is a generalization of VC Dimension, which corresponds to the case ℓ = 2 k , and of Distinguishing Transversal, which corresponds to the case ℓ = |E| (the latter is also known as Test Cover in the dual hypergraph). We also introduce the associated fixed-cardinality maximization problem Max Partial VC Dimension that aims at maximizing the number of equivalence classes induced by a solution set of k vertices. We study the algorithmic complexity of Partial VC Dimension and Max Partial VC Dimension both on general hypergraphs and on more restricted instances, in particular, neighborhood hypergraphs of graphs.⋆ A preliminary version of this work containing the approximation complexity results appeared in [8].

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Decision and approximation complexity for identifying codes and locating-dominating sets in restricted graph classes

Cited by 23 publications

References 48 publications

Algorithms and Complexity for Metric Dimension and Location-domination on Interval and Permutation Graphs

Algorithms and Complexity for Metric Dimension and Location-domination on Interval and Permutation Graphs

Centroidal bases in graphs

Parameterized and approximation complexity of Partial VC Dimension

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