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STOCHASTIC CAKE DIVISION PROTOCOL : International Game Theory Review. / MAZALOV, VLADIMIR V.; NOSALSKAYA, TATYANA E.; TOKAREVA, JULIA S.

In: International Game Theory Review, Vol. 16, No. 02, 2014.

Research output: Contribution to journalArticlepeer-review

Harvard

MAZALOV, VLADIMIRV, NOSALSKAYA, TATYANAE & TOKAREVA, JULIAS 2014, 'STOCHASTIC CAKE DIVISION PROTOCOL: International Game Theory Review', International Game Theory Review, vol. 16, no. 02. https://doi.org/10.1142/S021919891440009X

APA

MAZALOV, VLADIMIR. V., NOSALSKAYA, TATYANA. E., & TOKAREVA, JULIA. S. (2014). STOCHASTIC CAKE DIVISION PROTOCOL: International Game Theory Review. International Game Theory Review, 16(02). https://doi.org/10.1142/S021919891440009X

Vancouver

MAZALOV VLADIMIRV, NOSALSKAYA TATYANAE, TOKAREVA JULIAS. STOCHASTIC CAKE DIVISION PROTOCOL: International Game Theory Review. International Game Theory Review. 2014;16(02). https://doi.org/10.1142/S021919891440009X

Author

MAZALOV, VLADIMIR V. ; NOSALSKAYA, TATYANA E. ; TOKAREVA, JULIA S. / STOCHASTIC CAKE DIVISION PROTOCOL : International Game Theory Review. In: International Game Theory Review. 2014 ; Vol. 16, No. 02.

BibTeX

@article{ce40820ad8b349cf9dbacf34e7608f1e,
title = "STOCHASTIC CAKE DIVISION PROTOCOL: International Game Theory Review",
abstract = "We present a multistage stochastic procedure that produces a fair allocation of a cake among n-person. In each step players observe the collection of the random offers (x1, ?, xn), where x1 + ? + xn = 1. As the proposal emerged players have to make a decision to accept it or reject it. The final decision is defined by majority rule or by consensus. The optimal behavior of the players is derived as a class of threshold strategies.",
author = "MAZALOV, {VLADIMIR V.} and NOSALSKAYA, {TATYANA E.} and TOKAREVA, {JULIA S.}",
note = "doi: 10.1142/S021919891440009X",
year = "2014",
doi = "10.1142/S021919891440009X",
language = "русский",
volume = "16",
journal = "International Game Theory Review",
issn = "0219-1989",
publisher = "WORLD SCIENTIFIC PUBL CO PTE LTD",
number = "02",

}

RIS

TY - JOUR

T1 - STOCHASTIC CAKE DIVISION PROTOCOL

T2 - International Game Theory Review

AU - MAZALOV, VLADIMIR V.

AU - NOSALSKAYA, TATYANA E.

AU - TOKAREVA, JULIA S.

N1 - doi: 10.1142/S021919891440009X

PY - 2014

Y1 - 2014

N2 - We present a multistage stochastic procedure that produces a fair allocation of a cake among n-person. In each step players observe the collection of the random offers (x1, ?, xn), where x1 + ? + xn = 1. As the proposal emerged players have to make a decision to accept it or reject it. The final decision is defined by majority rule or by consensus. The optimal behavior of the players is derived as a class of threshold strategies.

AB - We present a multistage stochastic procedure that produces a fair allocation of a cake among n-person. In each step players observe the collection of the random offers (x1, ?, xn), where x1 + ? + xn = 1. As the proposal emerged players have to make a decision to accept it or reject it. The final decision is defined by majority rule or by consensus. The optimal behavior of the players is derived as a class of threshold strategies.

U2 - 10.1142/S021919891440009X

DO - 10.1142/S021919891440009X

M3 - статья

VL - 16

JO - International Game Theory Review

JF - International Game Theory Review

SN - 0219-1989

IS - 02

ER -

ID: 132811054