The Diameter of Sum Basic Equilibria Games

Aida Abiad Monge; C. Alvarez; A. Messegue

doi:10.1016/j.tcs.2024.114807

The Diameter of Sum Basic Equilibria Games

Aida Abiad Monge, C. Alvarez, A. Messegue (Corresponding author)

Algebraic Combinatorics

Onderzoeksoutput: Bijdrage aan tijdschrift › Tijdschriftartikel › Academic › peer review

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We study the sum basic network creation game introduced in 2010 by Alon, Demaine, Hajiaghai and Leighton. In this game, an undirected and unweighted graph G is said to be a sum basic equilibrium if and only if, for every edge uv and any vertex in G, swapping edge uv with edge does not decrease the total sum of the distances from u to all the other vertices. This concept lies at the heart of the network creation games, where the central problem is to understand the structure of the resulting equilibrium graphs, and in particular, how well they globally minimize the diameter. In this sense, in 2013 Alon et al. showed an upper bound of on the diameter of sum basic equilibria, and they also proved that if a sum basic equilibrium graph is a tree, then it has diameter at most 2. In this paper, we prove that the upper bound of 2 also holds for bipartite graphs and even for some non-bipartite classes like block graphs and cactus graphs.

Originele taal-2	Engels
Artikelnummer	114807
Aantal pagina's	9
Tijdschrift	Theoretical Computer Science
Volume	1018
DOI's	https://doi.org/10.1016/j.tcs.2024.114807
Status	Gepubliceerd - 27 nov. 2024

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Aida Abiad is supported by the Dutch Research Council through the grant VI.Vidi.213.085. Carme \u00C0lvarez is partially supported by MCIN/ AEI/ 10.13039/501100011033 under Project PID2020-112581GB-C21 (MOTION), by the Spanish Agencia Estatal de Investigaci\u00F3n [PID-2020-112581GB-C21, MOTION] and the Catalan government [2021 SGR 01419 ALBCOM]. Arnau Messegu\u00E9 is supported by grant 2021SGR-00434. We thank the anonymous referees for very helpful comments that improved the exposition of this work. A preliminary version of this paper appeared in the proceedings of the 2021 European Conference on Combinatorics, Graph Theory and Applications (EuroComb 2021). Aida Abiad is supported by the Dutch Research Council through the grant VI.Vidi.213.085. Carme \u00C0lvarez is partially supported by MCIN/AEI/10.13039/501100011033 under Project PID2020-112581GB-C21 (MOTION), by the Spanish Agencia Estatal de Investigaci\u00F3n [PID-2020-112581GB-C21, MOTION] and the Catalan government [2021 SGR 01419 ALBCOM]. Arnau Messegu\u00E9 is supported by grant 2021SGR-00434. We thank the anonymous referees for very helpful comments that improved the exposition of this work.

Financiers	Financiernummer
Nederlandse Organisatie voor Wetenschappelijk Onderzoek	MCIN/AEI/10.13039/501100011033, VI.Vidi.213.085

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title = "The Diameter of Sum Basic Equilibria Games",

abstract = "We study the sum basic network creation game introduced in 2010 by Alon, Demaine, Hajiaghai and Leighton. In this game, an undirected and unweighted graph G is said to be a sum basic equilibrium if and only if, for every edge uv and any vertex in G, swapping edge uv with edge does not decrease the total sum of the distances from u to all the other vertices. This concept lies at the heart of the network creation games, where the central problem is to understand the structure of the resulting equilibrium graphs, and in particular, how well they globally minimize the diameter. In this sense, in 2013 Alon et al. showed an upper bound of on the diameter of sum basic equilibria, and they also proved that if a sum basic equilibrium graph is a tree, then it has diameter at most 2. In this paper, we prove that the upper bound of 2 also holds for bipartite graphs and even for some non-bipartite classes like block graphs and cactus graphs.",

keywords = "Bipartite graphs, Diameter, Network creation games, Sum basic equilibria",

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N2 - We study the sum basic network creation game introduced in 2010 by Alon, Demaine, Hajiaghai and Leighton. In this game, an undirected and unweighted graph G is said to be a sum basic equilibrium if and only if, for every edge uv and any vertex in G, swapping edge uv with edge does not decrease the total sum of the distances from u to all the other vertices. This concept lies at the heart of the network creation games, where the central problem is to understand the structure of the resulting equilibrium graphs, and in particular, how well they globally minimize the diameter. In this sense, in 2013 Alon et al. showed an upper bound of on the diameter of sum basic equilibria, and they also proved that if a sum basic equilibrium graph is a tree, then it has diameter at most 2. In this paper, we prove that the upper bound of 2 also holds for bipartite graphs and even for some non-bipartite classes like block graphs and cactus graphs.

AB - We study the sum basic network creation game introduced in 2010 by Alon, Demaine, Hajiaghai and Leighton. In this game, an undirected and unweighted graph G is said to be a sum basic equilibrium if and only if, for every edge uv and any vertex in G, swapping edge uv with edge does not decrease the total sum of the distances from u to all the other vertices. This concept lies at the heart of the network creation games, where the central problem is to understand the structure of the resulting equilibrium graphs, and in particular, how well they globally minimize the diameter. In this sense, in 2013 Alon et al. showed an upper bound of on the diameter of sum basic equilibria, and they also proved that if a sum basic equilibrium graph is a tree, then it has diameter at most 2. In this paper, we prove that the upper bound of 2 also holds for bipartite graphs and even for some non-bipartite classes like block graphs and cactus graphs.

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The Diameter of Sum Basic Equilibria Games

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