Economics 2010a Fa|2003 Lecture 11 Edward L. Glaeser
Economics 2010a Fall 2003 Lecture 11 Edward L. Glaeser
11. Competition and monopoly, some preliminary discussions Monopoly Pricing b. Cournot and Bertrand Oligopoly C. TWo Part Pricing d. Price Discrimination e. Regulation
11. Competition and Monopoly, some preliminary discussions a. Monopoly Pricing b. Cournot and Bertrand Oligopoly c. Two Part Pricing d. Price Discrimination e. Regulation
Standard monopoly result is quite straightforward Q is set to maximize P(Q)Q-C(Q)Which yields P(Q)Q+P(Q)=C(Q)or C(Q) 1+ o aP P(O) Cournot oligopoly-n firms-fixed entry choose q to maximize P(Q+∑9)Q-C(Q) or P(∑)+P(∑9)=CQ) or C"(Q=P(Q)(1+。如)
Standard monopoly result is quite straightforward Q is set to maximize P(Q)Q-C(Q) which yields: P’(Q)QP(Q)C’(Q) or C Q PQ 1 Q P P Q 1 1 Cournot oligopoly– N firms– fixed entry– choose Q to maximize: P Qi ji Qj Qi CiQi or P j Qj Qi P j Qj Ci Qi or C Q PQ1 Qi Q Q P P Q
or P(Q)=C(Q)-5 thats the markup over marginal cost
or PQ C Q Qi Q that’s the markup over marginal cost
Claim: we know that industry profits are lower under cournot oligopoly than under monopoly(assuming identical cost curves) Is it possible that industry output will be lower under cournot oligopoly than under monopoly? Assume identical cost curves and write P(NO()O(N)+P(NO(ND)=C(O(N) Differentiation with respect ton then yields P(NOQ(N+OP (NO(O+NO(N)+ P(NO(O+NO(M)=C(Q@(M Solving this yields
Claim: we know that industry profits are lower under cournot oligopoly than under monopoly (assuming identical cost curves) Is it possible that industry output will be lower under cournot oligopoly than under monopoly? Assume identical cost curves and write: P NQNQN PNQN C QN Differentiation with respect to N then yields: P NQQ N QPNQQ NQ N P NQQ NQ N CQQ N Solving this yields:
OP(NO)+O2P"(NO) C"(0)-(N+1)P(NO)NOP (NO) If0>P(NQ+OP (NO) then the expression is negative because the numerator is negative and the denominator is positive If P(No)+OP (No>0 then the numerator is positive-lf N(P(NQ+OP(N)>C(0-P(NO) and then the denominator is negative and the whole expression is again negative Second order conditions require that C"(O(N)-2P(NO)>QP (NO) Only if 0<N(P(NQ)+QP (NO)<C(O-P(NQ is the sign reversal possible. What's going on there?
Q N QP NQQ2PNQ CQN1P NQNQPNQ If 0 P NQ QPNQ then the expression is negative because the numerator is negative and the denominator is positive. If P NQ QPNQ 0 then the numerator is positive–If NP NQ QPNQ CQ P NQ and then the denominator is negative and the whole expression is again negative. Second order conditions require that CQN 2P NQ QPNQ Only if 0 NP NQ QPNQ CQ P NQ is the sign reversal possible. What’s going on there?
To show that overall industry output increases with n, we just need that Q+O(MN>O Or 1>O(N/Q or 1 NP(NO)-NOP"(NO) C"(0)-(N+1)P(NO)-NOP (NQ) or C(O-P(NQ)>0 And thats a fact- so we don t know what happens to individual output, but we know that aggregate output has to go up with the number of firms
To show that overall industry output increases with N, we just need that Q Q NN 0 Or 1 Q NN/Q or 1 NP NQNQPNQ CQN1P NQNQPNQ or CQ P NQ 0 And that’s a fact– so we don’t know what happens to individual output, but we know that aggregate output has to go up with the number of firms
Bertrand Competition - competition along prices yields marginal cost pricing Edgeworth conjecture-quantity precommitment bertrand price competition yields cournot outcomes Proved true(essentially) by Kreps Scheinkman rand journal 1983. Proof requires game theory
Bertrand Competition– competition along prices yields marginal cost pricing. Edgeworth conjecture– quantity precommitment bertrand price competition yields cournot outcomes. Proved true (essentially) by Kreps Scheinkman, Rand Journal 1983. Proof requires game theory
Obviously, every producer would be better off if they could restrict output to monopoly levels a large literature has thought about the sustainability of these cartels. One side has thought about making cheating observable- the other has thought about the ability of a cartel to punish Assume n independent producers, and an infinite time horizon Write profits as r(0,0 as profits based on own production and production of other firms
Obviously, every producer would be better off if they could restrict output to monopoly levels. A large literature has thought about the sustainability of these cartels. One side has thought about making cheating observable– the other has thought about the ability of a cartel to punish. Assume N independent producers, and an infinite time horizon. Write profits as Q,Q as profits based on own production and production of other firms
OM is monopoly production (i.e. output that maximizes joint surplus that maximizes N(OM, OM) Oo is each firm acting independently, i. that maximizes T( 20, go just over the first argument Finally, @ c maximizes (@G, OM)just over the first argument Pofits under perfect monopoly are denoted OM, Q Repeated game literature(Abreu, Abreu Pearce and stachetti tells us that a monopoly outcome is not sustainable if
QM is monopoly production (i.e. output that maximizes joint surplus), that maximizes NQM,QM QO is each firm acting independently, i.e. that maximizes QO,QO just over the first argument. Finally, QC maximizes QC,QM just over the first argument. Pofits under perfect monopoly are denoted QM,QM Repeated game literature (Abreu, Abreu Pearce and Stachetti) tells us that a monopoly outcome is not sustainable if:
