Answer is .8
player 2 will never want to defect from <A,C>, bcoz player 2 gets highest payoff of 2 only in this cell of game matrix
So only player 1 will have tendency to defect
QUESTION 6 Player II A 3,2 0,1 В 7,0 2,1 Player I Consider the stage game...
QUESTION 7 Player II A 3,40,7 В 5,0 1,2 Player I Consider the stage game above and suppose it is repeated infinitely many times. For (A,C) to be playe every period as a SPNE using trigger strategies for Player 1 not to deviate, and more than or equal to the discount factor needs to be more than or equal to for Player 2 not to deviate. Therefore, the discount rate must be larger than or equal to fractional form; ie.,...
Game theory question (undergraduate economics) Consider the infinitely repeated game with the following stage game matrix: C D C 3,2 0,1 D 7,0 2,1 Under what conditions is there a subgame perfect equilibrium in which the players alternate between (C,C) and (C,D), starting with (C,C) in the first period? Under what conditions is there a subgame perfect equilibrium in which the players alternate between (C,C) and (D,D), starting with (C,C) in the first period? (Use modified trigger strategies)
Consider the stage game below, and suppose it is repeated infinitely many times Player 2 D EF A 1,1 1,1 1,1 Player I B 1,8 7,5 1,1 C 5,7 8,3 1,1 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 C. 1/3 d. (CE) cannot be part of a SPNE.
QUESTION 10 Consider the stage game below, and suppose it is repeated infinitely many times. Player 2 D E F A 1,1 1,1 1,1 Player I B 1,8 7,5 1.1 C 5,7 8,3 1,1 To sustain a SPNE in which players play (B.D in every period by means of a trigger strategy, the discount rate must be larger than or equal to o a. O b. 1/3 (B.E) cannot be part of a SPNE o d.23 Ce.3/7.
Consider the stage game below, and suppose it is repeated infinitely many times. Player 2 DEF A 1, 1,1 1,1 Player I B 1,8 7,5 1,1 C 5,7 8,3 1,1 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 O a. 1/3 O b. 2/3 O d. (C,E)cannot be part of a SPNE
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
Please help me Game theory !!! 10minutes left. 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. Player 2 D EF A 11,11,1 Player I B 1,8 7,51,1 C5,78,31,1
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.
QUESTION 5 Player III PlayerII Player lI Player i A 11,1 444 A 3,3,0 3,1,7 B 118 31A Player I B 7,5,7 -1,6,3 Consider the stage game above and suppose it is repeated twice without discounting. Consider all possible SPNE in pure strategies for the twice repeated game. The highest payoff Player 1 can get in a SPNE is The highest payoff Player 2 can get in a SPNE is . Finally, the highest payoff Player 3 can get in...
10 p QUESTION 2 Player l A 6,6 -2,7 -2,-2 Player I B 742,2 1,- C 2,-2 1,1 1,1 game in which the stage game above is repeated twice and there is no discounting. The maximum payoff a player can achieve in a SPNE of the repeated game is (Please, enter a numerical value like:-1,0, 0.5, 3.5, 4, etc)