Game theory question (undergraduate economics)
Game theory question (undergraduate economics) Consider the infinitely repeated game with the following stage game matrix:...
QUESTION 6 Player II A 3,2 0,1 В 7,0 2,1 Player I Consider the stage game above and suppose it is repeated infinitely many times. For (A,C) to be played every period as a SPNE using trigger strategies the discount factor needs to be more than or equal to (Please, enter a numerical value not in fractional form; i.e., instead of 1/2 enter 0.5)
3. (Level A) Suppose the following Prisoner's Dilemma is repeated infinitely: 112 C D C 2, 2 0, 3 D 3,0 1, 1 Let uj be the payoff to player i in period t. Player i (i-1,2) maximizes her average discounted sum of payoffs, given by ( where o is the common discount factor of both players Suppose the players try to sustain (C, C) in each period by the Grim Trigger strategy. That is, each player plays the following...
3. (Level A) Suppose the following Prisoner's Dilemma is repeated infinitely: C 2, 2 0, 3 D 3,0 1, Let uj be the payoff to player i in period t. Player i (i 1,2) maximizes her average discounted sum of payoffs, given by ( o0 (1-6 X6u where o is the common discount factor of both players Suppose the players try to sustain (C, C) in each period by the Grim Trigger strategy. That is, each player plays the following...
3. (Level A) Suppose the following Prisoner's Dilemma is repeated infinitely 112 C D C 2, 2 0, 3 D 3, 0|1, 1 Let uļ be the payoff to player i in period t. Player i (i = 1, 2) maximizes her. average discounted sum of payoffs, given by ( where δ is the common discount factor of both players Suppose the players try to sustain (C, C) in each period by the Grim Trigger strategy. That is, each player...
1. Consider a repeated game in which the stage game in the following figure is played in each of two periods and there is no discounting. 1 LMR u 8,8 0,9 0.0 C 9,0 0,0 3,1 0 0.0 | 13 | 3.3 Fully describe a subgame perfect equilibrium in which the players select (U, L) in the first period.
Consider the following normal form game: U D LR 7,7 4,8 8,4 5,5 a. Are there dominant actions for any of the players? b. Find all Nash equilibria of this game. c. Suppose we repeat this game 10 times, specify a subgame perfect equi- librium of this finitely repeated game. d. Suppose this game is repeated infinitely: Identify a subgame perfect equilibrium of this game which gives an average (normalized) dis- counted payoff of 7 to both players. Clearly identify...
Consider the stage game below, and suppose it is repeated infinitely many times. To sustain a SPNE in which players play (C,E) in every period by means of a trigger strategy, the discount rate must be larger than or equal to a. 2/3. b. (C,E) cannot be part of a SPNE. c. 1/7. d. 1/3. e. 3/7.
Consider the infinitely repeated version of the symmetric two-player stage game in figure PR 13.2. The first number in a cell is player 1's single-period payoff. Assume that past actions are common knowledge. Each player's payoff is the present value of the stream of single-period payoffs where the discount factor is d. (a) Derive the conditions whereby the following strategy profile is a subgame perfect Nash Equilibrium: 2 Consider the infinitely repeated version of the symmetric two-player stage game in...
Game Theory Economics If its stage game has exactly one Nash equilibrium, how many subgame perfect equilibria does a two-period, repeated game have? Explain. Would this answer change if there were T periods, where T is any finite integer?
Consider the stage game below, and suppose it is repeated infinitely many times Player 2 D EF A 1,1 1,11,1 PlayerI B 1,8 7,51,1 c | 5,7 | 8,3 | 1,1 To sustain a SPNE in which players play (B,E) in every period by means of a trigger strategy, the discount rate must be larger than or equal to Ob. 1/3 ос. 37