We introduce a concept of a strongly stable (Nash) equilibrium point of an n-person noncooperative game in normal form. Roughly speaking, an equilibrium ...
Roughly speaking, an equilibrium point is strongly stable if it changes continuously and uniquely against any small perturbation to payoffs of players.
We introduce a concept of a strongly stable (Nash) equilibrium point of an n-person noncooperative game in normal form. Roughly speaking, an equilibrium point ...
People also ask
What is the Nash equilibrium of a non-cooperative game?
What is a stable equilibrium in game theory?
What is the equilibrium point in game theory?
What is the equilibrium point in?
Strongly Stable Equilibrium Points of n-Person Noncooperative Games. M. Kojima, A. Okada & S. Shindoh · Mathematics of Operations Research 10:650-663 (1985) ...
A necessary and sufficient condition is found for a given completely mixed strategyN-tuple to be the unique equilibrium point of some finiteN-person non- ...
In the immediately following sections we shall define equilibrium points and prove that a finite non-cooperative game always has at least one equilibrium point.
Informally, we say that a Nash equilibrium x* of a noncooperative game y* is essential if every game y close to y* admits a Nash equilibrium x close to x*.
Missing: Strongly | Show results with:Strongly
This study has established a new perturbed game of the n-person noncooperative game. A new definition of stable set of Nash equilibria is introduced in this way ...
Apr 14, 2023 · In this paper, we mainly study the equivalence and computing between Nash equilibria and the solutions to the system of equations.
In this paper we discuss stability and sensitivity analysis of Nash equilibria which are fundamental solutions in noncooperative games.