Nash theorem (in game theory)

A theorem on the existence of equilibrium points in a mixed extension of a finite non-cooperative game $ \Gamma \stackrel{\text{df}}{=} \langle J,(S_{i})_{i \in J},(H_{i})_{i \in J} \rangle $, where

• $ J $ is a finite set of players,
• $ (S_{i})_{i \in J} $ is their strategy profile, and
• $ H_{i}: S \stackrel{\text{df}}{=} \prod_{i \in J} S_{i} \to \mathbb{R} $ is a pay-off function for player $ i $, for each $ i \in J $ (see also Games, theory of).

It was established by J. Nash in [1]. For each $ i \in J $, let $ M_{i} $ denote the set of all probability measures on $ S_{i} $. Nash’s theorem then asserts that there exists a measure $ \mu^{*} \in M \stackrel{\text{df}}{=} \prod_{i \in J} M_{i} $ such that $$ \forall i \in J, ~ \forall \mu_{i} \in M_{i}: \qquad {H_{i}}(\mu^{*}) \geq {H_{i}}(\mu^{*} \| \mu_{i}), $$ where $ \mu^{*} \| \mu_{i} $ denotes the measure on $ M $ that results from replacing the $ i $-th component of the vector $ \mu^{*} $ by $ \mu_{i} $, and $ {H_{i}}(\mu) \stackrel{\text{df}}{=} \mathsf{E}(H_{i},\mu) $. All known proofs of Nash’s theorem rely on a fixed-point theorem, such as the Kakutani Fixed-Point Theorem or the Brouwer Fixed-Point Theorem.

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