Redirected from Game Theory
Game theory, a branch of mathematics, operations research and economics, analyzes interactions with formalized incentive structures ("games"). The predicted and actual behavior of individuals in these games as well as optimal strategies are studied. Seemingly different types of interactions can be characterized as having similar incentive structures, thus being examples of a particular "game."
Game theory is closely related to economics in that it seeks to find rational strategies in situations where the outcome depends not only on one's own strategy and "market conditions", but upon the strategies chosen by other players with possibly different or overlapping goals. It also finds wider application in fields such as political science and military strategy.
The results can be applied to simple games of entertainment or to more significant aspects of life and society. An example of the latter is the Prisoner's dilemma as popularized by mathematician Albert W. Tucker[?], which has many implications about the nature of human cooperation. Biologists have used game theory to understand and predict certain outcomes of evolution, such as the concept of evolutionarily stable strategy introduced by John Maynard Smith in his essay Game Theory and the Evolution of Fighting. See also Maynard Smith's book Evolution and the Theory of Games.
Other branches of mathematics, in particular probability, statistics and linear programming, are commonly used in conjuction with game theory to analyse many games.

Game theory classifies games into many categories that determine which particular methods can be applied to solving them (and indeed how one defines "solved" for a particular category). Some common categories are:
Zerosum games are those in which the total benefit to all players in the game adds to zero (or more informally put, that each player benefits only at the expense of others). Chess and Poker are zerosum games, because one wins exactly the amount one's opponents lose. Business, politics and the prisoner's dilemma, for example, are nonzerosum games because some outcomes are good for all players or bad for all players. It is easier, however, to analyze a zerosum game, and it turns out to be possible to transform any game into a zerosum game by adding an additional dummy player often called "the board," whose losses compensate the players' net winnings.
A convenient way to represent a game is given by its payoff matrix. Consider for example the twoplayer zerosum game with the following matrix:
Player 2
Action A Action B Action C
Action 1 30 10 20 Player 1 Action 2 10 20 20
This game is played as follows: the first player chooses one of the two actions 1 or 2, and the second player, unaware of the first player's choice, chooses one of the three actions A, B or C. Once these choices have been made, the payoff is allocated according to the table; for instance, if the first player chose action 2 and the second player chose action B, then the first player gains 20 points and the second player loses 20 points. Both players know the payoff matrix and attempt to maximize the number of their points. What should they do?
Player 1 could reason as follows: "with action 2, I could lose up to 20 points and can win only 20, while with action 1 I can lose only 10 but can win up to 30, so action 1 looks a lot better." With similar reasoning, player 2 would choose action C (negative numbers in the table are good for him). If both players take these actions, the first player will win 20 points. But how about if player 2 anticipates the first player's reasoning and choice of action 1, and deviously goes for action B, so as to win 10 points? Or if the first player in turn anticipates this devious trick and goes for action 2, so as to win 20 points after all?
The fundamental and surprising insight by John von Neumann was that probability provides a way out of this conundrum. Instead of deciding on a definite action to take, the two players assign probabilities to their respective actions, and then use a random device which, according to these probabilities, chooses an action for them. The probabilities are computed so as to maximize the expected point gain independent of the opponent's strategy; this leads to a linear programming problem with a unique solution for each player. This method can compute provably optimal strategies for all twoplayer zerosum games.
For the example given above, it turns out that the first player should chose action 1 with probability 57% and action 2 with 43%, while the second player should assign the probabilities 0%, 57% and 43% to the three actions A, B and C. Player one will then win 2.85 points on average per game.
Non ZeroSum game The most famous example of a nonzerosum game is the Prisoner's dilemma, as mentioned above. Any gain by one player does not necessarily correspond with a loss by another player. Most realworld situations are non zerosum games. For example, a business contract ideally is a positivesum game, where each side is better off than if they didn't have the contract. Most games that people play for recreation are zerosum.
Cooperative games are those in which the players may freely communicate among themselves before making game decisions and may make bargains to influence those decisions. Monopoly is a cooperative game, while the Prisoner's dilemma is not. However, Monopoly is a zerosum game as there can be only one winner, whereas the Prisoner's dilemma is a nonzerosum game.
Complete information games are those in which each player has the same gamerelevant information as every other player. Chess and the Prisoner's dilemma are completeinformation games, while Poker is not.
For the above example to work, the participants in the game have to be assumed to be risk neutral. This means that, for example, they would value a bet with a 50% chance of receiving 20 'points' and a 50% chance of paying nothing as being worth 10 points. However, in reality people are often risk averse and prefer a more certain outcome  they will only take a risk if they expect to make money on average. Subjective expected utility[?] theory explains how a measure of utility can be derived which will always satisfy the criterion of risk neutrality, and hence is suitable as a measure for the payoff in game theory.
One example of risk aversion can be seen on Game Shows. For example, if a person has a 1 in 3 chance of winning $50,000, or can take a sure $10,000, many people will take the sure $10,000.
John Conway developed a notation for certain games and defined several operations on those games, originally in order to study Go endgames. In a surprising connection, he found that a certain subclass of these games can be used as numbers, leading to the very general class of surreal numbers.
Though touched on by earlier mathematical results, modern game theory became a prominent branch of mathematics in the 1940s, especially after the 1944 publication of The Theory of Games and Economic Behavior by John von Neumann and Oskar Morgenstern[?]. This profound work contained the method for finding optimal solutions for twoperson zerosum games alluded to above.
Around 1950, John Nash developed a definition of an "optimum" strategy for multi player games where no such optimum was previously defined, known as Nash equilibrium. This concept was further refined by Reinhard Selten. These men were awarded The Bank of Sweden Prize in Economic Sciences in Memory of Alfred Nobel in 1994 for their work on game theory, along with John Harsanyi[?] who developed the analysis of games of incomplete information.
Conway's numbergame connection was found in the early 1970s.
See also Mathematical game; Artificial intelligence; Newcomb's paradox.
Search Encyclopedia

Featured Article
