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Monopoly
Some introductory questions
Question 1: Why is the fast food restaurant next to Beacon Hill park so
expensive?
Question 2: Why do you often get a discount when showing your student
card?
Question 3: In the Thrifty’s on Hillside Robin Hood ‘all purpose’ flour costs
the following: 1kg = $2.39; 2.5kg =$4.59; 5kg =$7.49; and 10kg = $8.79.
How come the priceper kilogram decreases so drastically?
ch12: Monopoly 2
Organization
Setup• The sources of monopoly power
• The monopolist’s problem
• Solving the monopolist’s problem– About the optimal solution: Pricing vs. elasticity
• Welfare in monopolistic markets
• Seeking more surplus Part 1: price discrimination– First-degree price discrimination
– Second-degree price discrimination
– Third-degree price discrimination
• Seeking more surplus Part 2: bundling goods
ch12: Monopoly 3
The sources of monopoly power
Monopoly Greek: monos = single + polein = to sell
• Where do monopolists come from?
– What prevents market entry from occurring?
What prevents market entry?
• Exclusive control over crucial inputs
• Economies of scale AVC decreases natural monopolies
– Information as an important source of economies of scale
• Network economies
• Patents : temporary monopoly rights (currently 20 years)
• Licensing by governments or other institutions
– Often with: airports, gas stations at highways, etc.
– Exclusive license of UVic food service
ch12: Monopoly 4
The objective of the Monopolist
The monopolist’s problem– Objective of the monopolist (by assumption): maximize profits
– Temporary assumption: single price is charged
In general:
Profits = Revenue – Costs = R(q) – C(q)
– R(q) and C(q) are functions of quantity q
– R(q) = price x quantity = pq
– C(q) given by technology (see chapter 6)
The monopolist’s problem: such that p=P(q)
– In other words:
ch12: Monopoly 5
)(max qCpqq
)()(max qCqqPq
The objective of the Monopolist
In words: monopolist chooses output level q so as to maximize
profits. She uses her knowledge about market demand P(q)
Notes
• Two ways to write down relation between p and q:
– Demand function: q=D(p) (Chapter 4)
– p=P(q) “inverse demand function” (more useful here)
– Same relationship between p and q, but different notation
• Choosing prices vs. choosing quantities: same thing!
ch12: Monopoly 6
Solving the problem of monopolist
• General problem of profit maximizing firm:
• Necessary condition: R’(q)-C’(q)=0
• So, optimum q : marginal revenue = marginal cost
• Back to the monopolist’s problem:
• Necessary condition:
• Notice MR=MC.
ch12: Monopoly 7
)()(max qCqRq
)()(max qCqqPq
0)(')( qCqPqdq
dP
Solving the monopolist problem
Example: Linear demand, CRS technology
• P(q)=a-bq, C(q)=cq
• Necessary condition: -bq+a-bq-c=0
ch12: Monopoly 8
cqqbqaq
)(max
)(2
1
2
,2
cab
cabap
sob
caq
M
M
Monopolist problem
Lerner Index (a measure of markup): • Lerner Index =
• Derivation:– F.O.C. Monopolist :
– Rearranging yields:
– Or, put differently : Lerner index = , where– is the price - elasticity of demand
• Example: if =2 then profit max. markup should be 100% or profit max. price should be twice the marginal cost.
ch12: Monopoly 9
P
MCP
)(')( qCqPqdq
dP
)()(
)(')(
qP
q
dq
dP
qP
qCqP
/1
Monopolist problemGraphically
FIGURE 12-9
The Profit-
Maximizing Price
and Quantity for
a Monopolist
ch12: Monopoly 10
Welfare in monopolist markets
• The single monopoly price is higher than the socially optimal
price (perfectly competitive outcome). The welfare cost of the
resulting low quantity is called the deadweight loss (welfare
loss) of monopoly power.
ch12: Monopoly 11
Price discrimination12.6 How can the monopolist increase profitability?
– Can the monopolist somehow get higher profits? Is there a way to capture part of the
deadweight loss and the consumer surplus?
• Method 1 price discrimination: charge different consumers a different price for
the same good.
– Only effective if arbitrage is not possible. Arbitrage: consumers can
sell to each other
• First-degree price discrimination / Perfect price discrimination
• Second-degree price discrimination. Example: quantity discounts
• Third-degree price discrimination. Example: student discounts
• Method 2 bundling: combining and selling two or more goods
ch12: Monopoly 13
First degree price discrimination
Special Application –Two part Tariff.
• Necessary conditions:
– Individual demand curves are all known
– No arbitrage opportunity.
Method:
– Total amount (= tariff) the consumer pays for q units is
– T(q) = F + p*q
– F: fixed fee, p: per-unit charge
– Result: Charge consumer p=MC and F equal to the would-be consumer surplus when p=MC.
• Hence F is different for each consumer.
• Special case: if consumers are identical F is equal across consumers.
ch12: Monopoly 15
Second degree price discrimination
Second-degree price discrimination:• The monopolist post a schedule along which price declines with the
quantity one buys, i.e. quantity discount.
• “Price discrimination within markets”
• Examples: quantity discounts, coupons, regular price fluctuations
Two-part tariff T(q) = F + vq is again one pricing scheme that does the job
• Example: If F=3, v=2 then we have T(1)= 5, T(2)=7, T(3)=9
• Observe F>0 implies there is a quantity discount
• Examples: Buying flour at the Thrifty’s?; taxi rides; utility and phone bills; shopping at Costco; Disneyland
ch12: Monopoly 18
Method 2: Bundling
So far, we assumed the monopolist produces just 1 good– What about monopolists with multiple products?
Topic 2: Bundling products– Example: Sell Word and Excel separately or sell the bundle called
Microsoft office? Two types of consumers, A and B. A’s valuations are 120 for Word and 80 for Excel. B’s valuations are opposite: 80 for Word and 120 for Excel. MC=0.
• Microsoft can sell all programs separately for 2*80+2*80=$320
• Microsoft can also sell two times MS Office Suite for 2*200=$400
ch12: Monopoly 19