As in the lemons model, suppose that there is one seller and one buyer who may exchange a good of quality v~ U[0, 1]. The seller, who values the good at v dollars, knows the value of v. The buyer, who values the good at 3v/2 dollars, does not know the value of v (only that it is uniformly distributed on [0,1]). There is a fixed price of p = 1/2 at which trade may occur, which happens if and only if both the buyer and the seller agree to trade. Before deciding whether to trade, the buyer can pay a cost c € (0, 1) to learn the value of u. The seller's payoff is p if trade occurs and vif trade does not occur. The buyer's payoff is 3v/2-p-c if trade occurs and he first learned the value of v; 3v/2-p if trade occurs and he did not learn. the value of v; -c if trade does not occur and he first learned the value of v; and 0 if trade does not occur and he did not learn the value of v. Find the probability that trade occurs for each c € (0, 1). Solution: If the buyer chooses not to learn the value, we know from the lemons model that trade will not occur for any v> 0 (since 3/2 < 2). If the buyer pays the cost to learn the value, he is willing to buy if and only if 3v/2≥ 1/2, that is, if and only if v≥ 1/3. The seller is willing to sell if and only if n ≤ 1/2 The buyer's ernected novaff is

 

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max┬(v^'∈[0,1]) Pr⁡(b_2<b(v^' ))(v_1-1/2 (b(v^' )+E[b(v_2 )∣v_2<v^' ]))". " 

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As in the lemons model, suppose that there is one seller and one buyer who may exchange a good of quality v~ U[0, 1]. The seller, who values the good at v dollars, knows the value of v. The buyer, who values the good at 3v/2 dollars, does not know the value of v (only that it is uniformly distributed on [0,1]). There is a fixed price of p = 1/2 at which trade may occur, which happens if and only if both the buyer and the seller agree to trade. Before deciding whether to trade, the buyer can pay a cost c € (0, 1) to learn the value of u. The seller's payoff is p if trade occurs and vif trade does not occur. The buyer's payoff is 3v/2-p-c if trade occurs and he first learned the value of v; 3v/2-p if trade occurs and he did not learn the value of v; -c if trade does not occur and he first learned the value of v; and 0 if trade does not occur and he did not learn the value of u. Find the probability that trade occurs for each c € (0, 1). Solution: If the buyer chooses not to learn the value, we know from the lemons model that trade will not occur for any v> 0 (since 3/2 < 2). If the buyer pays the cost to learn the value, he is willing to buy if and only if 3v/2≥ 1/2, that is, if and only if v≥ 1/3. The seller is willing to sell if and only if v ≤ 1/2. The buyer's expected payoff is 3v 1 Pr P² ( 1 ≤ 0 ≤ 12 ) ² [2/07 - 12/1 E << SUS-C² -c= 11 68 ==C. If e≤ 1/48, the buyer will learn and trade will occur with probability 1/6. Otherwise, trade occurs with probability 0.