2013
DOI: 10.1007/978-3-319-03536-9_10
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Tree Nash Equilibria in the Network Creation Game

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Cited by 28 publications
(50 citation statements)
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“…In this work, we show that in the max-distance network creation game, for α ≥ 23 all equilibrium graphs are trees and the price of anarchy is constant. Compared to Mamageishvili et al [13], we also improve the constant upper bound of the price of anarchy from 4 to 3 for tree equilibria. The technique of our proof is mainly based on the degree approaches, following the previous work [3,13,14].…”
Section: Related Workmentioning
confidence: 89%
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“…In this work, we show that in the max-distance network creation game, for α ≥ 23 all equilibrium graphs are trees and the price of anarchy is constant. Compared to Mamageishvili et al [13], we also improve the constant upper bound of the price of anarchy from 4 to 3 for tree equilibria. The technique of our proof is mainly based on the degree approaches, following the previous work [3,13,14].…”
Section: Related Workmentioning
confidence: 89%
“…Mihalák and Schlegel [3] used a technique based on the average degree of the biconnected component and significantly improved this range from α ≥ 12n⌈log n⌉ to α > 273n, which is asymptotically tight. Based on the same idea, Mamageishvili et al [13] improved this range to α > 65n and Alvarez and Messegué [14] further improved it to α > 17n. Recently, Bilò and Lenzner [9] improved the bound to α > 4n − 13, using a technique based on critical pairs and min cycles, which is orthogonal to the known degree approaches.…”
Section: Related Workmentioning
confidence: 99%
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“…This bound was improved in [35], where it was shown that for α ≥ 273n all pure equilibria are trees. Later on, in [32], this was further improved by showing that it even holds for α ≥ 65n. Recently, two preprints have been released that make further progress towards proving that the price of anarchy of network creation games is constant: First, in [3], Àlvarez & Messegué show that every pure Nash equilibrium is a tree already when α > 17n, and that the price of anarchy is bounded by a constant for α > 9n.…”
Section: Related Literaturementioning
confidence: 99%