Teoriâ veroâtnostej i ee primeneniâ, Tome 13 (1968) no. 3, pp. 555-560
Citer cet article
È. I. Vilkas. The axiomatic definition of equilibrium points and the value of a non-coalitional $n$-person game. Teoriâ veroâtnostej i ee primeneniâ, Tome 13 (1968) no. 3, pp. 555-560. http://geodesic.mathdoc.fr/item/TVP_1968_13_3_a20/
@article{TVP_1968_13_3_a20,
author = {\`E. I. Vilkas},
title = {The axiomatic definition of equilibrium points and the value of a~non-coalitional $n$-person game},
journal = {Teori\^a vero\^atnostej i ee primeneni\^a},
pages = {555--560},
year = {1968},
volume = {13},
number = {3},
language = {ru},
url = {http://geodesic.mathdoc.fr/item/TVP_1968_13_3_a20/}
}
TY - JOUR
AU - È. I. Vilkas
TI - The axiomatic definition of equilibrium points and the value of a non-coalitional $n$-person game
JO - Teoriâ veroâtnostej i ee primeneniâ
PY - 1968
SP - 555
EP - 560
VL - 13
IS - 3
UR - http://geodesic.mathdoc.fr/item/TVP_1968_13_3_a20/
LA - ru
ID - TVP_1968_13_3_a20
ER -
%0 Journal Article
%A È. I. Vilkas
%T The axiomatic definition of equilibrium points and the value of a non-coalitional $n$-person game
%J Teoriâ veroâtnostej i ee primeneniâ
%D 1968
%P 555-560
%V 13
%N 3
%U http://geodesic.mathdoc.fr/item/TVP_1968_13_3_a20/
%G ru
%F TVP_1968_13_3_a20
There are given two systems of axioms. One system is equivalent to Nash's equilibrium points notion. By means of the other system we define the value of an $n$-person game. It is essential that one axiom of this system assumes existence of a subjective forecast of opponents' behaviour.
