Nash equilibrium and Best Response Functions
Best response functions and Nash Equilibrium The best response function for any player i, is a function that maps the list of actions by other players into the list of actions that are best responses to what the others did. Sometimes there is only one best response. A Nash equilibrium is a list of actions by the players such that each player’s action is a best response to the actions of the other players.
Using Best response functions to find Nash equilibria With two-person games in which there is a discrete number of strategies, there is a handy way to use the payoff tables. The method of stars.
Example: The Stag Hunt Player 2 Stag Hare Stag 2 , 2 0 , 1 1 , 0 1 , 1 2 , 2 0 , 1 1 , 0 1 , 1 Player 1 Hare B1(Stag)= {Stag} B1(Hare)={Hare} B2(Stag)={Stag} B2(Hare)={Hare}
Example: The Stag Hunt Player 2 Stag Hare Stag 2 , 2 0 , 1 1 , 0 1 , 1 2 , 2 0 , 1 1 , 0 1 , 1 Player 1 Hare B1(Stag)= {Stag} B1(Hare)={Hare} B2(Stag)={Stag} B2(Hare)={Hare}
B1(Stag)= {Stag} from making a best response to each of Player 2 Stag Hare Stag 2 *, 2 0 , 1 1 , 0 1 , 1 Player 1 Hare Put a star next to the payoff (s) to Player 1 from making a best response to each of Player 2’s actions.
B1(Hare)= {Hare} Player 2 Stag Hare Stag 2 *, 2 0 , 1 1 , 0 1* , 1 2 *, 2 0 , 1 1 , 0 1* , 1 Player 1 Hare
B2(Stag)= {Stag} from making a best response to each of Player 2 Stag Hare Stag 2 *, 2 * 0 , 1 1 , 0 1 , 1* Player 1 Hare Now put a star next to the payoff (s) to Player 2 from making a best response to each of Player ’s actions.
B2(Hare)= {Hare} Player 2 Stag Hare Stag 2 *, 2 * 0 , 1 1 , 0 1* , 1* 2 *, 2 * 0 , 1 1 , 0 1* , 1* Player 1 Hare Where are the Nash equilibria?
Nash Equilibria Found The boxes with two stars in them are Nash equilibria. The Stag Hunt has two Nash equilibria In one equilibrium, both players faithfully play their part in the stag hunt. In the other equilibrium, both players chase after hares. Note that one equilibrium is better for both than the other, but both are Nash equilibria.
Example: Battle of Bismarck Sea Imamura Sail North Sail South Fly North 2 , -2 2 , -2 1 , -1 3 , -3 Kenney Fly South BK(Sail North)= {Fly North} BK(Sail South)={Sail South} BI(Fly North)={Sail North, Sail South} BI(Sail South)={Sail North} Note that Imamura has two best responses to Fly North By Kenney. (The set of best responses has two members.)
Starring Kenney’s Best responses Imamura Sail North Sail South Fly North 2 * , -2 2 , -2 1 , -1 3* , -3 Kenney Fly South BK(Sail North)= {Fly North} BK(Sail South)={Fly South}
Starring Imamura’s Best responses Sail North Sail South Fly North 2 * , -2* 2 , -2* 1 , -1* 3* , -3 Kenney Fly South BI(Fly North)= {Sail North, Sail South } BI(Fly South)={Sail North} Where are the Nash equilibria?
Best response in continuous games Two person games where a strategy is choice of a real number. Player 1 chooses x1, player 2 chooses x2. Payoffs are given by functions F1(x1,x2) and F2(x1,x2). Best response for player 1 to action x2 is the action x1 that maximizes F1(x1,x2) . Similarly for player 2.
Example Two partners work together. Payoff to Partner 1 is F1(x1,x2)=ax1+bx1x2-(1/2)x12 Payoff to Partner 2 is F2(x1,x2)= ax2+bx1x2-(1/2)x22 Best response functions are found by setting derivatives with respect to own action equal to zero. R1(x2)=a+bx2 and R2(x1)=a+bx1
Nash equilibrium In Nash equilibrium, each is doing the best response to the other’s action. Thus to find Nash equilibrium, we solve the simultaneous equations: x1 = R1(x2)=a+bx2 and x2 =R2(x1)=a+bx1 What is the solution? How does this look in a graph? What happens if the parameters a and b differ for the two players?
Many players-two strategies Farmers and bandits Inventors and mimics Congested roads