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Exercise 1: Iterated Elimination of Strictly Dominated Actions Consider a strategic game with two players. Player 1’s set of actions is S1 = {A, B, C, D} and player 2’s set of actions is S2 = {S, T, U, V}. The players’ payoffs are displayed in the payoff matrix below. Payoffs u1, u2 A B C D Player 2 S 4,4 2,10 3,7 5,4 T 10,9 4,10 5,9 9,5 U 4,6 7,6 10,6 5,8 V 8,7 12,2 4,5 4,4 Use the procedure of iterated elimination of strictly dominated actions to identify the set of all action profiles that survive iterated elimination of strictly dominated actions. • In each stage t = 1, . . . , T, clearly list the action sets for all players, Xit (i in {1, 2}), and explain how you determined Xt based on Xt−1. Provide the (reduced) payoff matrix for each stage. • Reminder (Definition 45.1): In a strategic game with ordinal preferences, player i’s action a′′ strictly dominates her action a′ if u(a′′, a) > u(a′, a). We say that the action a′i is strictly dominated. 

          Exercise 1: Iterated Elimination of Strictly Dominated Actions
Consider a strategic game with two players. Player 1’s set of actions is S1 = {A, B, C, D} and player 2’s set of actions is S2 = {S, T, U, V}. The players’ payoffs are displayed in the payoff matrix below.
Payoffs u1, u2
A B C D
Player 2
S 4,4 2,10 3,7 5,4
T 10,9 4,10 5,9 9,5
U 4,6 7,6 10,6 5,8
V 8,7 12,2 4,5 4,4

Use the procedure of iterated elimination of strictly dominated actions to identify the set of all action profiles that survive iterated elimination of strictly dominated actions.
• In each stage t = 1, . . . , T, clearly list the action sets for all players, Xit (i in {1, 2}), and explain how you determined Xt based on Xt−1. Provide the (reduced) payoff matrix for each stage.
• Reminder (Definition 45.1): In a strategic game with ordinal preferences, player i’s action a′′ strictly dominates her action a′ if u(a′′, a) > u(a′, a). We say that the action a′i is strictly dominated.
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Added by Ismael M.

Principles of Economics
Principles of Economics
Gregory Mankiw 8th Edition
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Exercise 1: Iterated Elimination of Strictly Dominated Actions Consider a strategic game with two players. Player 1’s set of actions is S1 = {A, B, C, D} and player 2’s set of actions is S2 = {S, T, U, V}. The players’ payoffs are displayed in the payoff matrix below. Payoffs u1, u2 A B C D Player 2 S 4,4 2,10 3,7 5,4 T 10,9 4,10 5,9 9,5 U 4,6 7,6 10,6 5,8 V 8,7 12,2 4,5 4,4 Use the procedure of iterated elimination of strictly dominated actions to identify the set of all action profiles that survive iterated elimination of strictly dominated actions. • In each stage t = 1, . . . , T, clearly list the action sets for all players, Xit (i in {1, 2}), and explain how you determined Xt based on Xt−1. Provide the (reduced) payoff matrix for each stage. • Reminder (Definition 45.1): In a strategic game with ordinal preferences, player i’s action a′′ strictly dominates her action a′ if u(a′′, a) > u(a′, a). We say that the action a′i is strictly dominated.
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Transcript

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00:01 Hello everyone, let us look into the question.
00:04 The question says that the fourth one is the first one, the answer for the first one is, that is we are given with the pay of matrix.
00:15 From this we can conclude that the variable, a1 is dominated by a, yes, and a2 is dominated by a1 and b1 is dominated by b2.
00:38 And b3 is dominated by b4.
00:46 Then come to the second question...
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