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Consider the electoral competition game presented in Lecture 6. In this game there are two candidates who simultaneously choose policies from the real line. There is a distribution of voters with median m and the candidate whose policy is closest to the median wins the election and the winning candidate's policy is implemented. If the two candidates are an equal distance from the median, then the average of the two policies is implemented. For this problem we suppose that both candidates care about both the implemented policy and winning the election. That is, the payo to each candidate has two parts. The first part is the utility from the implemented policy a*. That is, each candidate has utility u(a* ; xi), where xi is the ideal policy of candidate i and utility decreases to the left and right of xi. We suppose that xi < m < xj . The second part is the value of winning office, which we denote wi > 0 for candidate i. Putting these two parts together, we de ne the payoff to candidate i by
Find all Nash equilibria to this game.
Consider the electoral competition game presented in Lecture 6. In this game there are two candidates who simultaneously choose policies from the real line. There is a distribution
A set of colluding bidders. Ring participants agree to rig bids by agreeing not to bid against each other, either by avoiding the auction or by placing phony (phantom) bids.
In many cases we are interested in only one (or a few) of the equations of the model and attempts to measure its parameters statistically without a complete knowledge of the entire
A class of games of imperfect data during which one player (the principal) tries to supply incentives to the opposite (the agent) to encourage the agent to act within the principal
a) This you just have to list all the attributes for the program. i.e. unique id's for puzzle pieces, attributes for the puzzle like a data field for the number of edges, methods t
A non-credible threat may be a threat created by a player in a very Sequential Game which might not be within the best interest for the player to hold out. The hope is that the thr
Two individuals (i ∈ {1, 2}) work independently on a joint project. They each independently decide how much e ort ei they put. E ort choice has to be any real number between 0 and
In a positive add game, the combined payoffs of all players aren't identical in each outcome of the sport. This differs from constant add (or zero add) games during which all outco
Consider two identical firms, for each firm, the total cost of producing q units of output is C(q)=0.5q^2. The price is determined as P(q1,q2)- a-q1-q2. Estimate Cournots outcome;
This is Case of Competitive Games. Player 2 L R Player 1 L (60,40) (70,30) R (65,35) (60,40) Are either have dominant st
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