Nash Equilibria with Continuous Strategies
Nash Equilibria with Continuous Strategies
A Nash equilibrium of a game is a strategy combination such that no party can improve its situation by changing its strategy, assuming the complementary strategies of the other players stay the same. The strategies are said to be "mutual best responses." This Demonstration lets you examine 10 continuous strategy games and see the payoff surfaces of each of the players as well as the sum of the payoffs. These surfaces can be visualized in three dimensions or in two dimensions. The Demonstration also calculates "best response" curves for each of the players, shown in orange and blue, respectively, and projects the Nash equilibrium point onto each best response curve. The total payoff surface is colored green for those strategy combinations that would improve total wealth relative to that achieved at the Nash equilibrium. The "green zone" thus represents the strategy combinations that, if wealth were transferrable between the players through enforceable contracts, would be Pareto superior to the Nash equilibrium.