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Consider a simplified baseball game played between a pitcher and a batter. The pitcher chooses between throwing a fastball or a curve, while the batter
Consider a simplified baseball game played between a pitcher and a batter. The pitcher chooses between throwing a fastball or a curve, while the batter chooses which pitch to anticipate. The batter has an advantage if he correctly anticipates the type of pitch. In this constant-sum game, the batter's payoff is the probability that the batter will get a base hit. The pitcher's payoff is the probability that the batter fails to get a base hit, which is simply one minus the payoff of the batter. There are four potential outcomes: (i) If a pitcher throws a fastball, and the batter guesses fastball, the probability of a hit is 0.300. (ii) If the pitcher throws a fastball, and the batter guesses curve, the probability of a hit is 0.200. (iii) If the pitcher throws a curve, and the batter guesses curve, the probability of a hit is 0.350. (iv) If the pitcher throws a curve, and the batter guesses fastball, the probability of a hit is 0.150. Suppose that the pitcher is "tipping" his pitches. This means that the pitcher is holding the ball, positioning his body, or doing something else in a way that reveals to the batter which pitch he is going to throw. For our purposes, this means that the pitcher-batter game is a sequential game in which the pitcher announces his pitch choice before the batter has to choose his strategy. (a) Draw this situation, using a game tree. (b) Suppose that the pitcher knows he is tipping his pitches but can't stop himself from doing so. Thus, the pitcher and batter are playing the game you just drew. Find the rollback equilibrium of this game. (c) Now change the timing of the game, so that the batter has to reveal his action (perhaps by altering his batting stance) before the pitcher chooses which pitch to throw. Draw the game tree for this situation, and find the rollback equilibrium. Now assume that the tips of each player occur so quickly that neither opponent can react to them, so that the game is in fact simultaneous. (d) Draw a game tree to represent this simultaneous game, indicating information sets where appropriate. (e) Draw the game table for the simultaneous game. Is there a Nash equilibrium in pure strategy? If so, what is it
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