Cournot Model

In this article, we are going to look at cournot models, where firms compete in an oligopoly.

Modeling the situaiton

Imagine that we have two firms producing homogeneous products.
Each firm can choose it's quantity, $q_i \in [0, \infty), i = 1, 2$
Each unit of production, the firm has to pay c, the production cost. Assume the production cost remains constant.
The price is determined by the market, by the formula below $p(Q) = a - Q$
Note that the price decreases as quantity increases. Q indicates the total amout of quantity.
Each firm wants to maximize it's own profit.

for those who do not know normal form, it's just the matematical descripion of player's options and utility function (the payoff).
$n=2$
$S_i = [0, \infty), i = 1, 2$
$u_i(q_i, q_j) = q_i (a - q_i-q_j) - cq_i$

Let us be in the side of firm 1. We want to maximize our profit, by altering our production.
Note that our utility function, $u_1(q_1, q_2) = q_1(a - q_1 - q_2) - cq_1$
is a parabola upside down, in respect to $q_1$
Thus, we take the derivative of our utility function in respect to our quantity. $\frac{\partial u_1}{\partial q_1} = a - c - q_2 - 2q_1 = 0$
Thus, our best response is, $q^*_1 = \frac{a - c- q_2}{2}$
Note that the situation is symmetric, we also have our best response function for firm 2, $q^*_2 = \frac{a - c- q_1}{2}$

Recall that in nash equilibrium, both firms would have to have no incentive to unilaterally devicate from current strategy profile.
That means, both firms are best responding to each other.
Thus, both equations must hold. $q^*_1 = \frac{a - c- q^*_2}{2}$ $q^*_2 = \frac{a - c- q^*_2}{2}$
Solving this equation, we obtain the nash equilibrium, which is, $q^*_1 = q^*_2 = \frac{a - c}{3}$