Win–win game
Game theory scenario
In game theory, a win–win game or win–win scenario is a situation that produces a mutually beneficial outcome for two or more parties.[1] It is also called a positive-sum game as it is the opposite of a zero-sum game. If a win–win scenario is not achieved, the scenario becomes a lose–lose situation by default, since it had caused failure for at least one of the parties. While she did not coin the term, Mary Parker Follett's process of integration described in her book Creative Experience (Longmans, Green & Co., 1924) forms the basis of what we now refer to as the idea of "win-win" conflict resolution.[2]
See also
Look up win-win in Wiktionary, the free dictionary.
- Abundance mentality
- Game
- Cooperative game
- Group-dynamic game
- Zero-sum game
- No-win situation
References
- ^ "win-win situation definition". United Nations Economic and Social Commission for Western Asia. 17 January 2016. Retrieved June 17, 2021.
- ^ Tonn, Joan C. (2003). Mary P. Follett: Creating Democracy, Transforming Management. Yale University Press. p. 360. doi:10.12987/yale/9780300096217.001.0001. ISBN 0-300-09621-6. Retrieved 4 August 2022.
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Topics of game theory
- Congestion game
- Cooperative game
- Determinacy
- Escalation of commitment
- Extensive-form game
- First-player and second-player win
- Game complexity
- Graphical game
- Hierarchy of beliefs
- Information set
- Normal-form game
- Preference
- Sequential game
- Simultaneous game
- Simultaneous action selection
- Solved game
- Succinct game
- Mechanism design
concepts
- Bayes correlated equilibrium
- Bayesian Nash equilibrium
- Berge equilibrium
- Core
- Correlated equilibrium
- Coalition-proof Nash equilibrium
- Epsilon-equilibrium
- Evolutionarily stable strategy
- Gibbs equilibrium
- Mertens-stable equilibrium
- Markov perfect equilibrium
- Nash equilibrium
- Pareto efficiency
- Perfect Bayesian equilibrium
- Proper equilibrium
- Quantal response equilibrium
- Quasi-perfect equilibrium
- Risk dominance
- Satisfaction equilibrium
- Self-confirming equilibrium
- Sequential equilibrium
- Shapley value
- Strong Nash equilibrium
- Subgame perfection
- Trembling hand equilibrium
of games
- Go
- Chess
- Infinite chess
- Checkers
- All-pay auction
- Prisoner's dilemma
- Gift-exchange game
- Optional prisoner's dilemma
- Traveler's dilemma
- Coordination game
- Chicken
- Centipede game
- Lewis signaling game
- Volunteer's dilemma
- Dollar auction
- Battle of the sexes
- Stag hunt
- Matching pennies
- Ultimatum game
- Electronic mail game
- Rock paper scissors
- Pirate game
- Dictator game
- Public goods game
- Blotto game
- War of attrition
- El Farol Bar problem
- Fair division
- Fair cake-cutting
- Bertrand competition
- Cournot competition
- Stackelberg competition
- Deadlock
- Diner's dilemma
- Guess 2/3 of the average
- Kuhn poker
- Nash bargaining game
- Induction puzzles
- Trust game
- Princess and monster game
- Rendezvous problem
- Aumann's agreement theorem
- Folk theorem
- Minimax theorem
- Nash's theorem
- Negamax theorem
- Purification theorem
- Revelation principle
- Sprague–Grundy theorem
- Zermelo's theorem
figures
- Albert W. Tucker
- Amos Tversky
- Antoine Augustin Cournot
- Ariel Rubinstein
- Claude Shannon
- Daniel Kahneman
- David K. Levine
- David M. Kreps
- Donald B. Gillies
- Drew Fudenberg
- Eric Maskin
- Harold W. Kuhn
- Herbert Simon
- Hervé Moulin
- John Conway
- Jean Tirole
- Jean-François Mertens
- Jennifer Tour Chayes
- John Harsanyi
- John Maynard Smith
- John Nash
- John von Neumann
- Kenneth Arrow
- Kenneth Binmore
- Leonid Hurwicz
- Lloyd Shapley
- Melvin Dresher
- Merrill M. Flood
- Olga Bondareva
- Oskar Morgenstern
- Paul Milgrom
- Peyton Young
- Reinhard Selten
- Robert Axelrod
- Robert Aumann
- Robert B. Wilson
- Roger Myerson
- Samuel Bowles
- Suzanne Scotchmer
- Thomas Schelling
- William Vickrey
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