Monitoring edge-geodetic sets : Hardness and graph products

Haslegrave, John (2023) Monitoring edge-geodetic sets : Hardness and graph products. Discrete Applied Mathematics, 340. pp. 79-84. ISSN 0166-218X

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Abstract

Foucaud, Krishna and Ramasubramony Sulochana recently introduced the concept of monitoring edge-geodetic sets in graphs, and a related graph invariant. These are sets of vertices such that the removal of any edge changes the distance between some pair of vertices in the set. They studied the minimum possible size of such a set in a given graph, which we call the monitoring edge-geodetic number. We show that the decision problem for the monitoring edge-geodetic number is NP-complete. We also give best-possible upper and lower bounds for the Cartesian and strong products of two graphs. These bounds establish the exact value in many cases, including many new examples of graphs whose only monitoring edge-geodetic set is the whole vertex set.

Item Type:
Journal Article
Journal or Publication Title:
Discrete Applied Mathematics
Uncontrolled Keywords:
Research Output Funding/yes_externally_funded
Subjects:
?? edge monitoringgeodetic problemshortest pathcartesian productstrong productcomputational complexityyes - externally fundeddiscrete mathematics and combinatoricsapplied mathematics ??
ID Code:
211938
Deposited By:
Deposited On:
21 Dec 2023 14:15
Refereed?:
Yes
Published?:
Published
Last Modified:
16 Jul 2024 00:41