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2. Nash equilibrium - Wikipedia

   en.wikipedia.org/wiki/Nash_equilibrium

   In game theory, the Nash equilibrium is the most commonly used solution concept for non-cooperative games.A Nash equilibrium is a situation where no player could gain by changing their own strategy (holding all other players' strategies fixed). [1]

3. Solution concept - Wikipedia

   en.wikipedia.org/wiki/Solution_concept

   A Nash equilibrium is a strategy profile (a strategy profile specifies a strategy for every player, e.g. in the above prisoners' dilemma game (cooperate, defect) specifies that prisoner 1 plays cooperate and prisoner 2 plays defect) in which every strategy played by every agent (agent i) is a best response to every other strategy played by all the other opponents (agents j for every j≠i) .

4. Cooperative bargaining - Wikipedia

   en.wikipedia.org/wiki/Cooperative_bargaining

   The Nash equilibrium was the most common agreement (mode), but the average (mean) agreement was closer to a point based on expected utility. [11] In real-world negotiations, participants often first search for a general bargaining formula, and then only work out the details of such an arrangement, thus precluding the disagreement point and ...

5. Battle of the sexes (game theory) - Wikipedia

   en.wikipedia.org/wiki/Battle_of_the_sexes_(game...

   The mixed strategy Nash equilibrium is inefficient: the players will miscoordinate with probability 13/25, leaving each player with an expected return of 6/5 (less than the payoff of 2 from each's less favored pure strategy equilibrium). It remains unclear how expectations would form that would result in a particular equilibrium being played out.

6. Non-cooperative game theory - Wikipedia

   en.wikipedia.org/wiki/Non-cooperative_game_theory

   The solutions are normally based on the concept of Nash equilibrium, and these solutions are reached by using methods listed in Solution concept. Most solutions used in non-cooperative game are refinements developed from Nash equilibrium, including the minimax mixed-strategy proved by John von Neumann. [8] [13] [20]

7. Guess 2/3 of the average - Wikipedia

   en.wikipedia.org/wiki/Guess_2/3_of_the_average

   It would take approximately 21 k-levels to reach 0, the Nash equilibrium of the game. The guessing game depends on three elements: (1) the subject's perceptions of the level 0 would play; (2) the subject's expectations about the cognitive level of other players; and (3) the number of in-game reasoning steps that the subject is capable of ...

8. Prisoner's dilemma - Wikipedia

   en.wikipedia.org/wiki/Prisoner's_dilemma

   If the iterated prisoner's dilemma is played a finite number of times and both players know this, then the dominant strategy and Nash equilibrium is to defect in all rounds. The proof is inductive: one might as well defect on the last turn, since the opponent will not have a chance to later retaliate. Therefore, both will defect on the last turn.

9. Subgame perfect equilibrium - Wikipedia

   en.wikipedia.org/wiki/Subgame_perfect_equilibrium

   In game theory, a subgame perfect equilibrium (SPE), or subgame perfect Nash equilibrium (SPNE), is a refinement of the Nash equilibrium concept, specifically designed for dynamic games where players make sequential decisions. A strategy profile is an SPE if it represents a Nash equilibrium in every possible subgame of the original game ...