Perfect information explained

In economics, perfect information (sometimes referred to as "no hidden information") is a feature of perfect competition. With perfect information in a market, all consumers and producers have complete and instantaneous knowledge of all market prices, their own utility, and own cost functions.

In game theory, a sequential game has perfect information if each player, when making any decision, is perfectly informed of all the events that have previously occurred, including the "initialization event" of the game (e.g. the starting hands of each player in a card game).[1] [2] [3] [4]

Perfect information is importantly different from complete information, which implies common knowledge of each player's utility functions, payoffs, strategies and "types". A game with perfect information may or may not have complete information.

Games where some aspect of play is hidden from opponents – such as the cards in poker and bridge – are examples of games with imperfect information.[5] [6]

Examples

Chess is an example of a game with perfect information, as each player can see all the pieces on the board at all times.[2] Other games with perfect information include tic-tac-toe, Reversi, checkers, and Go.[3]

Academic literature has not produced consensus on a standard definition of perfect information which defines whether games with chance, but no secret information, and games with simultaneous moves are games of perfect information.[7] [8] [9] [10]

Games which are sequential (players alternate in moving) and which have chance events (with known probabilities to all players) but no secret information, are sometimes considered games of perfect information. This includes games such as backgammon and Monopoly. But there are some academic papers which do not regard such games as games of perfect information because the results of chance themselves are unknown prior to them occurring.[7] [8] [9] [10]

Games with simultaneous moves are generally not considered games of perfect information. This is because each player holds information which is secret, and must play a move without knowing the opponent's secret information. Nevertheless, some such games are symmetrical, and fair. An example of a game in this category includes rock paper scissors.[7] [8] [9] [10]

See also

Further reading

Notes and References

  1. Book: A Course in Game Theory. Rubinstein. A.. The MIT Press. 1994. 0-262-65040-1. Cambridge, Massachusetts. Chapter 6: Extensive Games with Perfect Information. Osborne. M. J..
  2. Web site: Infinite Games (section 1.1) . Yurii . Khomskii . 2010 .
  3. Archived at Ghostarchive and the Wayback Machine: Web site: Infinite Chess . PBS Infinite Series . March 2, 2017 . Perfect information defined at 0:25, with academic sources and .
  4. Book: Mycielski, Jan . Handbook of Game Theory with Economic Applications . 1992 . 978-0-444-88098-7 . 1 . 41–70 . Games with Perfect Information . 10.1016/S1574-0005(05)80006-2 . Jan Mycielski.
  5. Book: Thomas , L. C. . Games, Theory and Applications . limited . Dover Publications . 2003 . Mineola New York . 19 . 0-486-43237-8.
  6. Book: Osborne . M. J. . Rubinstein . A. . A Course in Game Theory . Chapter 11: Extensive Games with Imperfect Information . The MIT Press . 1994 . Cambridge Massachusetts . 0-262-65040-1.
  7. Web site: Game Theory: Rock, Paper, Scissors . Janet Chen . Su-I Lu . Dan Vekhter.
  8. Web site: Game Theory . Thomas S. . Ferguson. Thomas S. Ferguson . 56–57 . UCLA Department of Mathematics .
  9. Web site: Solving Imperfect Information Games Using Decomposition . Burch . Johanson . Bowling . Proceedings of the Twenty-Eighth AAAI Conference on Artificial Intelligence .
  10. Web site: Complete vs Perfect Information in Combinatorial Game Theory . June 24, 2014 . .