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Tree, web and average web values for cycle-free directed graph games. / Khmelnitskaya, Anna; Talman, Dolf.

In: European Journal of Operational Research, Vol. 235, No. 1, 16.05.2014, p. 233-246.

Research output: Contribution to journalArticlepeer-review

Harvard

Khmelnitskaya, A & Talman, D 2014, 'Tree, web and average web values for cycle-free directed graph games', European Journal of Operational Research, vol. 235, no. 1, pp. 233-246. https://doi.org/10.1016/j.ejor.2013.10.014, https://doi.org/10.1016/j.ejor.2013.10.014

APA

Khmelnitskaya, A., & Talman, D. (2014). Tree, web and average web values for cycle-free directed graph games. European Journal of Operational Research, 235(1), 233-246. https://doi.org/10.1016/j.ejor.2013.10.014, https://doi.org/10.1016/j.ejor.2013.10.014

Vancouver

Khmelnitskaya A, Talman D. Tree, web and average web values for cycle-free directed graph games. European Journal of Operational Research. 2014 May 16;235(1):233-246. https://doi.org/10.1016/j.ejor.2013.10.014, https://doi.org/10.1016/j.ejor.2013.10.014

Author

Khmelnitskaya, Anna ; Talman, Dolf. / Tree, web and average web values for cycle-free directed graph games. In: European Journal of Operational Research. 2014 ; Vol. 235, No. 1. pp. 233-246.

BibTeX

@article{622bec17584b459fa362a513e535909d,
title = "Tree, web and average web values for cycle-free directed graph games",
abstract = "On the class of cycle-free directed graph games with transferable utility solution concepts, called web values, are introduced axiomatically, each one with respect to a chosen coalition of players that is assumed to be an anti-chain in the directed graph and is considered as a management team. We provide their explicit formula representation and simple recursive algorithms to calculate them. Additionally the efficiency and stability of web values are studied. Web values may be considered as natural extensions of the tree and sink values as has been defined correspondingly for rooted and sink forest graph games. In case the management team consists of all sources (sinks) in the graph a kind of tree (sink) value is obtained. In general, at a web value each player receives the worth of this player together with his subordinates minus the total worths of these subordinates. It implies that every coalition of players consisting of a player with all his subordinates receives precisely its worth. We also define the average web value as the average of web values over all management teams in the graph. As application the water distribution problem of a river with multiple sources, a delta and possibly islands is considered.",
author = "Anna Khmelnitskaya and Dolf Talman",
year = "2014",
month = may,
day = "16",
doi = "10.1016/j.ejor.2013.10.014",
language = "English",
volume = "235",
pages = "233--246",
journal = "European Journal of Operational Research",
issn = "0377-2217",
publisher = "Elsevier",
number = "1",

}

RIS

TY - JOUR

T1 - Tree, web and average web values for cycle-free directed graph games

AU - Khmelnitskaya, Anna

AU - Talman, Dolf

PY - 2014/5/16

Y1 - 2014/5/16

N2 - On the class of cycle-free directed graph games with transferable utility solution concepts, called web values, are introduced axiomatically, each one with respect to a chosen coalition of players that is assumed to be an anti-chain in the directed graph and is considered as a management team. We provide their explicit formula representation and simple recursive algorithms to calculate them. Additionally the efficiency and stability of web values are studied. Web values may be considered as natural extensions of the tree and sink values as has been defined correspondingly for rooted and sink forest graph games. In case the management team consists of all sources (sinks) in the graph a kind of tree (sink) value is obtained. In general, at a web value each player receives the worth of this player together with his subordinates minus the total worths of these subordinates. It implies that every coalition of players consisting of a player with all his subordinates receives precisely its worth. We also define the average web value as the average of web values over all management teams in the graph. As application the water distribution problem of a river with multiple sources, a delta and possibly islands is considered.

AB - On the class of cycle-free directed graph games with transferable utility solution concepts, called web values, are introduced axiomatically, each one with respect to a chosen coalition of players that is assumed to be an anti-chain in the directed graph and is considered as a management team. We provide their explicit formula representation and simple recursive algorithms to calculate them. Additionally the efficiency and stability of web values are studied. Web values may be considered as natural extensions of the tree and sink values as has been defined correspondingly for rooted and sink forest graph games. In case the management team consists of all sources (sinks) in the graph a kind of tree (sink) value is obtained. In general, at a web value each player receives the worth of this player together with his subordinates minus the total worths of these subordinates. It implies that every coalition of players consisting of a player with all his subordinates receives precisely its worth. We also define the average web value as the average of web values over all management teams in the graph. As application the water distribution problem of a river with multiple sources, a delta and possibly islands is considered.

U2 - 10.1016/j.ejor.2013.10.014

DO - 10.1016/j.ejor.2013.10.014

M3 - Article

VL - 235

SP - 233

EP - 246

JO - European Journal of Operational Research

JF - European Journal of Operational Research

SN - 0377-2217

IS - 1

ER -

ID: 7002290