Consider the following market game: An incumbent firm, called firm 3, is already in an industry. Two potential entrants, called firms 1 and 2, can each enter the industry by paying the entry cost of 10. First, firm 1 decides whether to enter or not. Then, after observing firm 1's choice, firm 2 decides whether to enter or not. Then, after observing firm 1's choice, firm 2 decides whether to enter or not. Every firm, including firm 3, observes the choices of firms 1 and 2. After this, all of the firms in the industry (including firm 3) compete in a Cournot oligopoly, where they simultaneously and independently select quantities. The price is determined by the inverse demand curve p = 12 − Q, where Q is the total quantity produced in the industry. Assume that the firms produce at no cost in this Cournot game. Thus, if firm i is in the industry and produces qi, then it earns a gross profit of (12 − Q)qi in the Cournot phase. (Remember that firms 1 and 2 have to pay the fixed cost of 10 to enter).

(a) Compute the subgame perfect equilibrium of this market game. Do so by first finding the equilibrium quantities and profit in the Cournot subgames. Show your answer by designating optimal action on the tree and writing the complete subgame perfect equilibrium strategy profile. [Hint: In an n-firm Cournot oligopoly with demand p = 12 − Q and 0 costs, the Nash equilibrium entails each firm producing the quantity q = 12/(n + 1).]

(b) In the subgame perfect equilibrium, which firms (if any) enter the industry?

Three firms produce the same product with different cost functions. Firm 1's marginal cost is 10, firm 2's marginal cost is 8, and firm 2's marginal cost is 4.

First consider a Stackelberg game with these 3 firms. Firm 1 chooses the quantity of its production first, then firms 2 and 3 chooses their quantities simultaneously after observing firm 1's quantities. Let S denote firm 1's profit in the subgame perfect equilibrium of this Stackelberg game.

Also consider a Cournot game in which the same three firms choose their quantities simultaneously. Let C denote firm 1's profit in the Nash equilibrium of the Cournot game.

Select the correct statement from the following:

Consider the following game. Firm 1, the leader, selects an output q1, after which firm 2, the follower, observes the choice of q1 and then selects its own output q2. The resulting price is one satisfying the industry demand curve P = 200 - q1 - q2. Both firms have zero fixed costs and a constant marginal cost of 10.

A. Derive the equation for the follower firm's best response function. Draw this equation on a graph with q2 on the vertical axis and q1 on the horizontal axis. Indicate the vertical intercept, horizontal intercept, and slope of the best response function.

B. Determine the equilibrium output of each firm in the leader-follower game. What are each firm's profits in the equilibrium?

C. Now let the two firms choose their outputs simultaneously. Compute the Cournot equilibrium outputs and industry price. Who loses and who gains when the firms play a Cournot game instead of the Stackelberg one?

2. Consider a monopolist facing the demand curve p = 10 - Q. The monopolist can choose either of the following cost functions: c₁(q) = 3q or c₂(q) = 10 + q.

a) Which cost function does the monopolist choose?

b) Now suppose that there is a second firm with cost function c1(q) above. Whichever cost function firm 1 chooses, the second firm will observe this choice and then have the option of entering the market or not. If he does not enter, firm 1 remains a monopolist with the chosen cost function. If firm 2 does enter, he pays an entry cost of $4 and the two firms compete as Cournot duopolists. More precisely, whichever cost function firm 1 chose, we have a pure strategy Nash equilibrium in quantity choices. Which cost function does firm 1 choose now? Put differently, what is the subgame perfect equilibrium of this game?