Discriminating codes in bipartite graphs: Bounds, extremal cardinalities, complexity

Emmanuel Charbit; Irène Charon; Gérard Cohen; Olivier Hudry; Antoine Lobstein

doi:10.3934/amc.2008.2.403

Discriminating codes in bipartite graphs: Bounds, extremal cardinalities, complexity

Emmanuel Charbit
, Irène Charon
, Gérard Cohen
, Olivier Hudry
, Antoine Lobstein

Telecom Paris
Centre national de la recherche scientifique

Research output: Contribution to journal › Article › peer-review

Abstract

Consider an undirected bipartite graph G = (V = I ∪ A, E), with no edge inside I nor A. For any vertex v ∈ V, let N(v) be the set of neighbours of v. A code C ⊆ A is said to be discriminating if all the sets N(i) ∩ C, i ∈ I, are nonempty and distinct. We study some properties of discriminating codes. In particular, we give bounds on the minimum size of these codes, investigate graphs where minimal discriminating codes have size close to the upper bound, or give the exact minimum size in particular graphs; we also give an NP-completeness result.

Original language	English
Pages (from-to)	403-420
Number of pages	18
Journal	Advances in Mathematics of Communications
Volume	2
Issue number	4
DOIs	https://doi.org/10.3934/amc.2008.2.403
Publication status	Published - 1 Nov 2008

Keywords

Bipartite graphs
Complexity
Discriminating codes
Graph theory
Identifying codes
Locating-dominating codes
Separating codes

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10.3934/amc.2008.2.403

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title = "Discriminating codes in bipartite graphs: Bounds, extremal cardinalities, complexity",

abstract = "Consider an undirected bipartite graph G = (V = I ∪ A, E), with no edge inside I nor A. For any vertex v ∈ V, let N(v) be the set of neighbours of v. A code C ⊆ A is said to be discriminating if all the sets N(i) ∩ C, i ∈ I, are nonempty and distinct. We study some properties of discriminating codes. In particular, we give bounds on the minimum size of these codes, investigate graphs where minimal discriminating codes have size close to the upper bound, or give the exact minimum size in particular graphs; we also give an NP-completeness result.",

keywords = "Bipartite graphs, Complexity, Discriminating codes, Graph theory, Identifying codes, Locating-dominating codes, Separating codes",

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T2 - Bounds, extremal cardinalities, complexity

AU - Charbit, Emmanuel

AU - Charon, Irène

AU - Cohen, Gérard

AU - Hudry, Olivier

AU - Lobstein, Antoine

PY - 2008/11/1

Y1 - 2008/11/1

N2 - Consider an undirected bipartite graph G = (V = I ∪ A, E), with no edge inside I nor A. For any vertex v ∈ V, let N(v) be the set of neighbours of v. A code C ⊆ A is said to be discriminating if all the sets N(i) ∩ C, i ∈ I, are nonempty and distinct. We study some properties of discriminating codes. In particular, we give bounds on the minimum size of these codes, investigate graphs where minimal discriminating codes have size close to the upper bound, or give the exact minimum size in particular graphs; we also give an NP-completeness result.

AB - Consider an undirected bipartite graph G = (V = I ∪ A, E), with no edge inside I nor A. For any vertex v ∈ V, let N(v) be the set of neighbours of v. A code C ⊆ A is said to be discriminating if all the sets N(i) ∩ C, i ∈ I, are nonempty and distinct. We study some properties of discriminating codes. In particular, we give bounds on the minimum size of these codes, investigate graphs where minimal discriminating codes have size close to the upper bound, or give the exact minimum size in particular graphs; we also give an NP-completeness result.

KW - Bipartite graphs

KW - Complexity

KW - Discriminating codes

KW - Graph theory

KW - Identifying codes

KW - Locating-dominating codes

KW - Separating codes

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DO - 10.3934/amc.2008.2.403

M3 - Article

AN - SCOPUS:70349331569

SN - 1930-5346

VL - 2

SP - 403

EP - 420

JO - Advances in Mathematics of Communications

JF - Advances in Mathematics of Communications

IS - 4

ER -

Discriminating codes in bipartite graphs: Bounds, extremal cardinalities, complexity

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Keywords

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