Minimizing the size of an identifying or locating-dominating code in a graph is NP-hard

Irène Charon; Olivier Hudry; Antoine Lobstein

doi:10.1016/S0304-3975(02)00536-4

Minimizing the size of an identifying or locating-dominating code in a graph is NP-hard

Irène Charon
, Olivier Hudry
, Antoine Lobstein

CNRS

Résultats de recherche: Contribution à un journal › Article › Revue par des pairs

Résumé

Let G=(V,E) be an undirected graph and C a subset of vertices. If the sets B_r(v)∩C, v∈V (respectively, v∈V⧹C), are all nonempty and different, where B_r(v) denotes the set of all points within distance r from v, we call C an r-identifying code (respectively, an r-locating-dominating code). We prove that, given a graph G and an integer k, the decision problem of the existence of an r-identifying code, or of an r-locating-dominating code, of size at most k in G, is NP-complete for any r.

langue originale	Anglais
Pages (de - à)	2109-2120
Nombre de pages	12
journal	Theoretical Computer Science
Volume	290
Numéro de publication	3
Les DOIs	https://doi.org/10.1016/S0304-3975(02)00536-4
état	Publié - 3 janv. 2003

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abstract = "Let G=(V,E) be an undirected graph and C a subset of vertices. If the sets Br(v)∩C, v∈V (respectively, v∈V⧹C), are all nonempty and different, where Br(v) denotes the set of all points within distance r from v, we call C an r-identifying code (respectively, an r-locating-dominating code). We prove that, given a graph G and an integer k, the decision problem of the existence of an r-identifying code, or of an r-locating-dominating code, of size at most k in G, is NP-complete for any r.",

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AU - Charon, Irène

AU - Hudry, Olivier

AU - Lobstein, Antoine

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N2 - Let G=(V,E) be an undirected graph and C a subset of vertices. If the sets Br(v)∩C, v∈V (respectively, v∈V⧹C), are all nonempty and different, where Br(v) denotes the set of all points within distance r from v, we call C an r-identifying code (respectively, an r-locating-dominating code). We prove that, given a graph G and an integer k, the decision problem of the existence of an r-identifying code, or of an r-locating-dominating code, of size at most k in G, is NP-complete for any r.

AB - Let G=(V,E) be an undirected graph and C a subset of vertices. If the sets Br(v)∩C, v∈V (respectively, v∈V⧹C), are all nonempty and different, where Br(v) denotes the set of all points within distance r from v, we call C an r-identifying code (respectively, an r-locating-dominating code). We prove that, given a graph G and an integer k, the decision problem of the existence of an r-identifying code, or of an r-locating-dominating code, of size at most k in G, is NP-complete for any r.

KW - Coding theory

KW - Complexity

KW - Graph

KW - Identifying code

KW - Locating-dominating code

KW - NP-completeness

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Minimizing the size of an identifying or locating-dominating code in a graph is NP-hard

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