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Mutual-visibility problems on graphs of diameter two
ID
Cicerone, Serafino
(
Author
),
ID
Di Stefano, Gabriele
(
Author
),
ID
Klavžar, Sandi
(
Author
),
ID
Yero, Ismael G.
(
Author
)
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https://www.sciencedirect.com/science/article/pii/S0195669824000805
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Abstract
The mutual-visibility problem in a graph $G$ asks for the cardinality of a largest set of vertices $S\subseteq V(G)$ so that for any two vertices $x,y \in S$ there is a shortest $x,y$-path $P$ so that all internal vertices of $P$ are not in $S$. This is also said as $x,y$ are visible with respect to $S$, or $S$-visible for short. Variations of this problem are known, based on the extension of the visibility property of vertices that are in and/or outside $S$. Such variations are called total, outer and dual mutual-visibility problems. This work is focused on studying the corresponding four visibility parameters in graphs of diameter two, throughout showing bounds and/or closed formulae for these parameters. The mutual-visibility problem in the Cartesian product of two complete graphs is equivalent to (an instance of) the celebrated Zarankiewicz's problem. Here we study the dual and outer mutual-visibility problem for the Cartesian product of two complete graphs and all the mutual-visibility problems for the direct product of such graphs as well. We also study all the mutual-visibility problems for the line graphs of complete and complete bipartite graphs. As a consequence of this study, we present several relationships between the mentioned problems and some instances of the classical Turán problem. Moreover, we study the visibility problems for cographs and several non-trivial diameter-two graphs of minimum size.
Language:
English
Keywords:
mutual-visibility set
,
mutual-visibility number
,
diameter-two graphs
,
line graphs
,
cographs
Work type:
Article
Typology:
1.01 - Original Scientific Article
Organization:
FMF - Faculty of Mathematics and Physics
Publication status:
Published
Publication version:
Version of Record
Year:
2024
Number of pages:
16 str.
Numbering:
Vol. 120, art. 103995
PID:
20.500.12556/RUL-158163
UDC:
519.17
ISSN on article:
0195-6698
DOI:
10.1016/j.ejc.2024.103995
COBISS.SI-ID:
196753923
Publication date in RUL:
27.05.2024
Views:
384
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35
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Record is a part of a journal
Title:
European journal of combinatorics
Shortened title:
Eur. j. comb.
Publisher:
Elsevier
ISSN:
0195-6698
COBISS.SI-ID:
25427968
Licences
License:
CC BY 4.0, Creative Commons Attribution 4.0 International
Link:
http://creativecommons.org/licenses/by/4.0/
Description:
This is the standard Creative Commons license that gives others maximum freedom to do what they want with the work as long as they credit the author.
Secondary language
Language:
Slovenian
Keywords:
množica vzajemne vidnosti
,
število vzajemne vidnosti
,
grafi premera dva
,
grafi povezav
,
kografi
Projects
Funder:
EC - European Commission
Funding programme:
H2020
Project number:
691161
Name:
Geospatial based Environment for Optimisation Systems Addressing Fire Emergencies
Acronym:
GEO-SAFE
Funder:
Other - Other funder or multiple funders
Funding programme:
Italy, INdAM, National Group for Scientific Computation (GNCS)
Funder:
ARIS - Slovenian Research and Innovation Agency
Project number:
P1-0297
Name:
Teorija grafov
Funder:
ARIS - Slovenian Research and Innovation Agency
Project number:
N1-0218
Name:
Prepletanje geometrije, topologije in algebre v strukturni in topološki teoriji grafov
Funder:
ARIS - Slovenian Research and Innovation Agency
Project number:
N1-0285
Name:
Metrični problemi v grafih in hipergrafih
Funder:
Other - Other funder or multiple funders
Funding programme:
Spain, Ministry of Science and Innovation
Project number:
PID2019-105824GB-I00
Funder:
Other - Other funder or multiple funders
Funding programme:
Ayudas para la recualificación del sistema universitario español
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