Standard

On the problem of the stability of solutions in extensive games. / Kuzyutin, D. V.

In: Vestnik Sankt-Peterburgskogo Universiteta. Ser 1. Matematika Mekhanika Astronomiya, No. 4, 01.10.1995, p. 18-23.

Research output: Contribution to journalArticlepeer-review

Harvard

Kuzyutin, DV 1995, 'On the problem of the stability of solutions in extensive games', Vestnik Sankt-Peterburgskogo Universiteta. Ser 1. Matematika Mekhanika Astronomiya, no. 4, pp. 18-23.

APA

Kuzyutin, D. V. (1995). On the problem of the stability of solutions in extensive games. Vestnik Sankt-Peterburgskogo Universiteta. Ser 1. Matematika Mekhanika Astronomiya, (4), 18-23.

Vancouver

Kuzyutin DV. On the problem of the stability of solutions in extensive games. Vestnik Sankt-Peterburgskogo Universiteta. Ser 1. Matematika Mekhanika Astronomiya. 1995 Oct 1;(4):18-23.

Author

Kuzyutin, D. V. / On the problem of the stability of solutions in extensive games. In: Vestnik Sankt-Peterburgskogo Universiteta. Ser 1. Matematika Mekhanika Astronomiya. 1995 ; No. 4. pp. 18-23.

BibTeX

@article{88b583e4ecd44423839b15bc3a941b49,
title = "On the problem of the stability of solutions in extensive games",
abstract = "The dynamic stability and the strongly dynamic stability of the situation set of Berge equilibrium in mixed strategies has been investigated. The proof of the dynamic stability of solutions on Berge equilibrium has been carried out for n players of finite extensive games with incomplete information. The concept of i-stability of the optimum principle has been proposed as the basis for sampling by players of their strategies. As an example the extensive game with three players has been considered.",
author = "Kuzyutin, {D. V.}",
year = "1995",
month = oct,
day = "1",
language = "русский",
pages = "18--23",
journal = "ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. МАТЕМАТИКА. МЕХАНИКА. АСТРОНОМИЯ",
issn = "1025-3106",
publisher = "Издательство Санкт-Петербургского университета",
number = "4",

}

RIS

TY - JOUR

T1 - On the problem of the stability of solutions in extensive games

AU - Kuzyutin, D. V.

PY - 1995/10/1

Y1 - 1995/10/1

N2 - The dynamic stability and the strongly dynamic stability of the situation set of Berge equilibrium in mixed strategies has been investigated. The proof of the dynamic stability of solutions on Berge equilibrium has been carried out for n players of finite extensive games with incomplete information. The concept of i-stability of the optimum principle has been proposed as the basis for sampling by players of their strategies. As an example the extensive game with three players has been considered.

AB - The dynamic stability and the strongly dynamic stability of the situation set of Berge equilibrium in mixed strategies has been investigated. The proof of the dynamic stability of solutions on Berge equilibrium has been carried out for n players of finite extensive games with incomplete information. The concept of i-stability of the optimum principle has been proposed as the basis for sampling by players of their strategies. As an example the extensive game with three players has been considered.

UR - http://www.scopus.com/inward/record.url?scp=0029380727&partnerID=8YFLogxK

M3 - статья

AN - SCOPUS:0029380727

SP - 18

EP - 23

JO - ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. МАТЕМАТИКА. МЕХАНИКА. АСТРОНОМИЯ

JF - ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. МАТЕМАТИКА. МЕХАНИКА. АСТРОНОМИЯ

SN - 1025-3106

IS - 4

ER -

ID: 41102024