Parthasarathy's theorem

Parthasarathy's theorem

In mathematics and in particular the study of games on the unit square, Parthasarathy's theorem is a generalization of Von Neumann's minimax theorem. It states that a particular class of games has a mixed value, provided that at least one of the players has a strategy that is restricted to absolutely continuous distributions with respect to the Lebesgue measure (in other words, one of the players is forbidden to use a pure strategy).

The theorem is attributed to the Indian mathematician Thiruvenkatachari Parthasarathy.

terminology: X and Y stand for the unit interval [0,1] ; mathcal M_X is the set of probability distributions on X (mathcal M_Y defined similarly); A_X is the set of class of absolutely continuous distributions on X (A_Y defined similarly).

Theorem

Suppose that k(x,y) is bounded on the unit square 0leq x,yleq 1; further suppose that k(x,y) is continuous except possibly on a finite number of curves of the form y=phi_k(x) (with k=1,2,ldots,n) where the phi_k(x) are continuous functions.

Further suppose

:k(mu,lambda)=int_{y=0}^1int_{x=0}^1 k(x,y),dmu(x),dlambda(y)=int_{x=0}^1int_{y=0}^1 k(x,y),dlambda(y),dmu(x).

Then

:max_{muin{mathcal M}_X},inf_{lambdain A_Y}k(mu,lambda)=inf_{lambdain A_Y},max_{muin{mathcal M}_X} k(mu,lambda)

This is equivalent to the statement that the game induced by k(cdot,cdot) has a value. Note that one player (WLOG X) is forbidden from using a pure strategy.

Parthasarathy goes on to exhibit a game in which

:max_{muin{mathcal M}_X},inf_{lambdain{mathcal M}_Y}k(mu,lambda) eqinf_{lambdain{mathcal M}_Y},max_{muin{mathcal M}_X} k(mu,lambda)

which thus has no value. There is no contradiction because in this case neither player is restricted to absolutely continuous distributions (and the demonstration that the game has no value requires both players to use pure strategies).

Reference

T. Parthasarathy 1970. "On Games over the unit square", SIAM, volume 19, number 2.


Wikimedia Foundation. 2010.

Игры ⚽ Поможем написать реферат

Look at other dictionaries:

  • Sion's minimax theorem — In mathematics, and in particular game theory, Sion s minimax theorem is a generalization of John Von Neumann s minimax theorem.It states:Let X be a compact convex subset of a linear topological space and Y a convex subset of a linear topological …   Wikipedia

  • Minimax — This article is about the decision theory concept. For other uses, see Minimax (disambiguation). Minimax (sometimes minmax) is a decision rule used in decision theory, game theory, statistics and philosophy for minimizing the possible loss for a… …   Wikipedia

  • Discrete series representation — In mathematics, a discrete series representation is an irreducible unitary representation of a locally compact topological group G that is a subrepresentation of the left regular representation of G on L²(G). In the Plancherel measure, such… …   Wikipedia

  • Czesław Olech — Born May 22, 1931 (1931 05 22) (age 80) Pińczów, Poland Nationality Polish …   Wikipedia

  • Calyampudi Radhakrishna Rao — Infobox Scientist name = C. R. Rao |300px caption = Calyampudi Radhakrishna Rao FRS birth date = Birth date and age|1920|9|10|mf=y birth place = Hadagali, State of Mysore, India residence = India nationality = death date = death place = field =… …   Wikipedia

  • Lloyd Shapley — Infobox Scientist name = Lloyd S. Shapley |300px image width = caption = Lloyd S. Shapley in 2002, Los Angeles birth date = Birth date and age|1923|6|2|mf=y birth place = Cambridge, Massachusetts death date = death place = residence = nationality …   Wikipedia

  • Regular measure — In mathematics, a regular measure on a topological space is a measure for which every measurable set is approximately open and approximately closed .DefinitionLet ( X , T ) be a topological space and let Σ be a sigma; algebra on X that contains… …   Wikipedia

  • Quantum Fourier transform — The quantum Fourier transform is the discrete Fourier transform with a particular decomposition into a product of simpler unitary matrices. Using this decomposition, the discrete Fourier transform can be implemented as a quantum circuit… …   Wikipedia

  • Support (measure theory) — In mathematics, the support (sometimes topological support or spectrum) of a measure μ on a measurable topological space ( X , Borel( X )) is a precise notion of where in the space X the measure lives . It is defined to be the largest (closed)… …   Wikipedia

  • Idempotent measure — In mathematics, an idempotent measure on a metric group is a probability measure that equals its convolution with itself; in other words, an idempotent measure is an idempotent element in the topological semigroup of probability measures on the… …   Wikipedia

Share the article and excerpts

Direct link
Do a right-click on the link above
and select “Copy Link”