Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференций › статья в сборнике материалов конференции › научная › Рецензирование
Envy Stable Solutions for Allocation Problems with Public Resourses. / Naumova, Natalia I.
CONTRIBUTIONS TO GAME THEORY AND MANAGEMENT, VOL XII. ред. / LA Petrosyan; NA Zenkevich. Издательство Санкт-Петербургского университета, 2019. стр. 261-272 (Contributions to Game Theory and Management; Том 12).Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференций › статья в сборнике материалов конференции › научная › Рецензирование
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TY - GEN
T1 - Envy Stable Solutions for Allocation Problems with Public Resourses
AU - Naumova, Natalia I.
PY - 2019
Y1 - 2019
N2 - We consider problems of "fair" distribution of several different public resourses. If tau is a partition of a finite set N, each resourse c(j) is distributed between points of B-j is an element of tau. We suppose that either all resourses are goods or all resourses are bads. There are finite projects, each project use points from its subset of N (its coalition). A is the set of such coalitions. The gain/loss function of a project at an allocation depends only on the restriction of the allocation on the coalition of the project. The following 4 solutions are considered: the lexicographically maxmin solution, the lexicographically minmax solution, a generalization of Wardrop solution. For fixed collection of gain/loss functions, we define envy stable allocations with respect to Gamma, where the projects compare their gains/losses at fixed allocation if their coalitions are adjacent in Gamma. We describe conditions on A, tau, and Gamma that ensure the existence of envy stable solutions, and conditions that ensure the enclusion of the first three solutions in envy stable solution.
AB - We consider problems of "fair" distribution of several different public resourses. If tau is a partition of a finite set N, each resourse c(j) is distributed between points of B-j is an element of tau. We suppose that either all resourses are goods or all resourses are bads. There are finite projects, each project use points from its subset of N (its coalition). A is the set of such coalitions. The gain/loss function of a project at an allocation depends only on the restriction of the allocation on the coalition of the project. The following 4 solutions are considered: the lexicographically maxmin solution, the lexicographically minmax solution, a generalization of Wardrop solution. For fixed collection of gain/loss functions, we define envy stable allocations with respect to Gamma, where the projects compare their gains/losses at fixed allocation if their coalitions are adjacent in Gamma. We describe conditions on A, tau, and Gamma that ensure the existence of envy stable solutions, and conditions that ensure the enclusion of the first three solutions in envy stable solution.
KW - lexicographically maxmin solution
KW - Wardrop equilibrium
KW - envy stable solution
KW - equal sacrifice solution
M3 - статья в сборнике материалов конференции
SN - *****************
T3 - Contributions to Game Theory and Management
SP - 261
EP - 272
BT - CONTRIBUTIONS TO GAME THEORY AND MANAGEMENT, VOL XII
A2 - Petrosyan, LA
A2 - Zenkevich, NA
PB - Издательство Санкт-Петербургского университета
Y2 - 27 June 2018 through 29 June 2018
ER -
ID: 51621884