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Lecture 5 SPATIAL ECONOMY: THE DIXIT-STIGLITZ MODEL By Carlos Llano, References for the s: Fujita, Krugman and Venables: Econom a Espacial. Ariel Econom a, 2000. – PowerPoint PPT presentation

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Title: SPATIAL ECONOMY:


1
Lecture 5
  • SPATIAL ECONOMY
  • THE DIXIT-STIGLITZ MODEL
  • By Carlos Llano,
  • References for the slides
  • Fujita, Krugman and Venables Economía Espacial.
    Ariel Economía, 2000.

2
Outline
  1. Introduction
  2. The Dixit-Stiglitz model of monopolistic
    competition spatial implications.
  3. Applications.
  4. Conclusion

3
Figure 1.1 Cartogram of GNPAreas are NOT
proportional to population
1. Introduction
3
4
Figure 1.2 GDP per capitaHighland variable among
countries
1. Introduction
4
5
1. Introduction
  1. The external and internal economies of scale can
    act as an engine for international trade in
    addition to the existence of CA or differences in
    factor endowments.
  2. The internal ES require to develop an imperfect
    competition model. The perfect competition model
    is the most used since the 70s. (Dixit-Stiglitz,
    1977).
  3. With the ES the distinction between
    inter-industrial and intra-industrial trade
    arises.
  4. The advantages of the external economies are less
    clear, and give rise to several arguments that
    are commonland for protectionism in international
    trade.

5
6
1. Introduction
AC average cost in the firm n CF/ S c
AC p
E
p2 CM2
PP price in the industry price c 1
/ nb
n
N2 n companies in equilibrium (with Profit0)
  • Number of companies in equilibrium
  • PP Curve the more firms in the industry
    competition and - price.
  • CC Curve the more firms in the industry
    average cost in each firm.
  • E long run equilibrium in the industry(n2 firms
    producing with CM2)

7
1. Introduction
CLOSED COUNTRY C (S1) n CF / S1 c
P c
LARGER MARKET BECAUSE OF TRADE C (S2) n CF / S2
c
1
p1
2
p2
P c 1 / bn
N countries / variety
n1
n2
8
2. The Dixit-Stiglitz Model
  • The Dixit-Stiglitz model is the starting point
    for the of the monopolistic competition models
    (Dixit-Stiglitz, 1977).
  • Since the 70s, its use in the field of
    international trade has been fundamental. It is
    the starting point for the New Economic Geography
    (NEG) agglomeration, economies of scale,
    transportation cost.
  • Fujita, Krugman and Venables (1999) present a
    spatial version of the DSM
  • 2 regions 1 mobile production factor (L labor).
  • 2 products
  • Agriculture residual sector, perfect
    competitive, constant returns to scale no
    transportation costs.
  • Manufacturing differentiated goods (n
    varieties) scale economies monopolistic
    competition transportation costs.

8
9
2. The Dixit-Stiglitz Model
  • Structure of the Dixit-Stiglitz spatial model
  • Solution to the consumers problem
  • Multiple Locations and Transportation Costs
  • Producer Behavior
  • The Price Index Effect and the Home Market Effect
  • Equilibrium

9
10
2. The Dixit-Stiglitz Model
  • Consumer Behavior Utility function
  • Every consumer shares the same Cobb-Douglas
    tastes for the two type of goods (M, A).
  • M composite index of the manufactured goods.
  • A consumption of the agricultural good.
  • Mu (µ) constant expenditure share in
    manufactured goods.
  • M is a sub-utility function defined over a
    continuum of varieties of manufactured goods
  • m(i) consumption of each available variety (i),
  • n range of varieties.
  • M is defined by a constant-elasticity-of-substitu
    tion (CES)
  • Rho (?) intensity of the preference for variety
    (love for variety)
  • If ?1, differentiated goods are nearly perfect
    substitutes (low love for variety)
  • If ?0, the desire to consume a greater variety
    of manufactured goods increases.

10
11
2. The Dixit-Stiglitz Model
  1. Consumers Behavior

We define sigma (s) as
s elasticity of substitution between any 2
varieties
  • The consumers problem maximize utility defined
    by the function U subject to the budget
    constraint.
  • We solve it in 2 steps
  • First, the consumption of varieties will be
    optimized
  • The ideal consumption of each variety will be
    given by the combination that ensures utility
    with the minimum cost (given the relative prices
    of each variety).
  • Once the consumption of varieties in generic
    terms has been optimized (for every M), the
    desired quantity of A and M will be chosen
    according to the relative prices of both goods.

11
12
2. The Dixit-Stiglitz Model
  1. The Consumers Behavior the budget constraint
  • PA Price of the agricultural goods.
  • A consumption of the agricultural good.
  • p(i) price of each variety (i) of manufacturing
    product.
  • m(i) quantity of each variety (i).
  • To maximize the utility U subject to the budget
    constraint Y, there are 2 steps
  • Whatever the value of the manufacturing composite
    (M), each m(i) needs to be chosen so as to
    minimize the cost of attaining de M (Phase I).
  • Afterwards, the step is to distribute the total
    income (Y) between agriculture (A) and
    manufactures (M) in aggregate (Phase II).

12
13
2. The Dixit-Stiglitz Model
1. Consumer Behavior Phase I
1. Minimize expenditure for any given M
  • PA Price of the agricultural goods.
  • A consumption of the agricultural good.
  • p(i) price of each variety (i) of manufacturing
    product.
  • m(i) quantity of each variety (i).
  • To minimize
  • The first-order condition establishes the
    equality of marginal rates of substitution MRS to
    price ratios

13
14
2. The Dixit-Stiglitz Model
1. Consumer behavior Phase I
  • m(j) this is the compensated demand function
    (Hicks demand compensation for the price
    variation constant utility in all the curve)
    for the jth variety of manufactures

14
15
2. The Dixit-Stiglitz Model
1. Consumer behavior Phase I
  • We can also derive an expression for the minimum
    cost of attaining M
  • Since the expenditure on the jth variety is
    p(j)m(j), if we use the previous equation and
    integrating over all j we get
  • Now we want to express this term as the
    manufactures price index (G)
  • So GMtotal expenditure in manufactures

15
16
2. The Dixit-Stiglitz Model
1. Consumer behavior Phase I
  • The price index G measures the minimum cost of
    purchasing a unit of the composite index M of
    manufacturing goods,
  • If M is thought as a utility function, G would be
    the expenditure function.

4.7
  • Now we can write the demand for m(i) more
    compactly
  • We substitute G 4.7 in equation 4.5

16
17
2. The Dixit-Stiglitz Model
1. Consumer behavior Phase II
  • Now we have to divide the total income (Y)
    between the two goods, M and A. We will do it by
    maximizing U constrained to the optimal
    expenditure derived from minimizing M.
  • PA Price of the agricultural goods.
  • G Manufactures Price Index
  • A consumption of the agricultural good.
  • p(i) price of each variety (i) of manufacturing
    product.
  • m(i) quantity of each variety (i).
  • This maximization gives (MRSprice ratio)

17
18
2. The Dixit-Stiglitz Model
1. Consumer behavior Phase I Phase II
  • Pulling the stages together, we obtain the
    following uncompensated consumer demand functions
  • For agriculture
  • For manufactured products

For
  • If Gconstant, the price elasticity of demand for
    every available variety is constant and equal to
    (s).

18
19
2. The Dixit-Stiglitz Model
1. Consumer behavior Phase I Phase II
  • We can now express maximize utility as a function
    of income, the price of agricultural output, and
    the manufactures price index, giving the
    indirect utility function

Cost-of-living index in the economy
19
20
2. The Dixit-Stiglitz Model
1. Consumer behavior Phase I Phase II
  • Now FKV introduce a variation of the DS Model
  • They make that the range of manufactures on offer
    becomes an endogenous variable.
  • Therefore it is important to understand the
    effects on the consumer of changes in n the
    number of varieties.
  • If ?n ? ?G (manufactures price index), because
    consumers value variety.
  • Therefore ? Cost of attaining a given level of
    utility.
  • To prove it, we assume that all manufactures are
    available at the same price, pM . Then, the price
    index G becomes
  • The relationship between G and n depends on the
    elasticity of substitution between varieties s

20
21
2. The Dixit-Stiglitz Mode
1. Consumer behavior Phase I Phase II
  • The relationship between G and n depends on the
    elasticity of substitution between varieties s
  • The lower is s (the more differentiated are
    varieties) ? the greater is the reduction in G
    caused by an increase in the number of varieties.
  • Changing the range of products available also
    shifts demand curves for existing varieties.
  • To prove it, we look at the demand curve for a
    single variety
  • When ?n ? ?G , the demand m(j) shifts downward,
  • Important it allows us to know the equilibrium
    n
  • If ?n ? ? competition ? shifts downward the
    existing products m(j) and reduce the sales of
    those varieties (evolution to more firms with
    profit0)

21
22
2. The Dixit-Stiglitz Model
22
23
2. The Dixit-Stiglitz Model
2. Multiple locations and transportation cost
CIF prices
  • If pmr is the FOB price of the manufacturing
    product in location r, and there are iceberg
    transport costs, the CIF price when delivered to
    location s is given by
  • Then, the manufacturing price index (Gs) may take
    a different value in each location according to
    the location s where it is consumed

Price index in s of manufactures produced in r
Consumption demand in location s for a product
produced in r
  • Ys income for location s this gives the
    consumption of the variety in s.

23
24
2. The Dixit-Stiglitz Model
2. Multiple locations and transportation cost
CIF prices
  • As a consequence, summing across locations in
    which the product is sold, the total sales of a
    single location r variety is

I have to produce Tmrs in r, knowing that a
portion 1/ Tmrs is lost during the trip
(transportation cost)
  • Important consequences
  • Sales depend on income and the price index in
    each location, on the transportation costs and
    the mill price.
  • Because the delivered prices of the same variety
    at all consumption locations change
    proportionally to the mill price, and because
    each consumers demand for a variety has a
    constant price elasticity sigma (s), the
    elasticity of the aggregate demand for each
    variety with respect to its mill price is also
    sigma (s), regardless of the spatial distribution
    of consumers.

24
25
2. The Dixit-Stiglitz Model
3. Producer Behavior
  • The agricultural goods is produced with constant
    returns
  • Manufacturing involves economies of scale at the
    level of the variety (internal).
  • Technology is the same for all varieties and in
    all locations
  • The only input is labor L, the production of a
    quantity qM of any variety at any given location
    requires labor input lM , given by
  • With increasing returns to scale, consumers
    preference for variety, and the unlimited number
    of potential varieties of manufactured goods, no
    firm will choose to produce the same variety
    supplied by another firm,
  • Each variety is produced in only one location by
    a single specialized firm,
  • The number of manufacturing firms is the same as
    the number of available varieties.

25
26
2. The Dixit-Stiglitz Model
3. Producer Behavior Profit maximization
  • Firms maximize profits with a given income
    (sales) and with given costs (according to the
    wages)

Costs FV (given the wages wr)
Revenues (sales)
  • Each firm accept the price index G as given.
    Thus, the perceived elasticity of demand is
    therefore s, and the profit maximization (Img
    CMg) implies that

26
27
2. The Dixit-Stiglitz Model
3. Producer Behavior Profit maximization
  • If there is entry and exit in the industry, the
    profits of a firm at location r are
  • Therefore, the zero-profit condition, implies
    that the equilibrium output is
  • Both q and l are constants common to every
    active firm in the economy.
  • Thus, if LrM is the number of manufacturing
    workers at location r, and nr is the number of
    manufacturing firms (number of varieties) at r,
    then

27
28
2. The Dixit-Stiglitz Model
  • 3. Producer Behavior Profit maximization
  • Conclusions
  • Odd results the size of the market affects
    neither the markup of price over marginal costs
    nor the scale at which individual goods are
    produced. All scale effects work through changes
    in the variety of goods available.
  • Caveat this is a strange result, since normally
    the larger the markets, competition (- mark
    up), and larger production in scale.
  • The Dixit-Stiglitz model says that all
    market-size effects work through changes in
    variety.

28
29
2. The Dixit-Stiglitz Model
  • 3. Producer Behavior wages
  • Nominal wages in the industry
  • The production q is the demand
  • We can turn this equation around and say that
    active firms break even if and only if the price
    they charge satisfies
  • Using the price rule () we get

()
Put in PCMg/? and clear s
  • This is the wage equation it gives the
    manufacturing wage at which firms in each
    location break even, given the income levels and
    price indices in all locations and the costs of
    shipping into these locations
  • The wage increases with the income (Ys) at
    location s, the access to location s from
    location (Tmrs), and the less competition the
    firm faces in location s (G decreases with n)

29
30
2. The Dixit-Stiglitz Model
  • 3. Producer Behavior wages
  • Real wages real income at each location is
    proportional to nominal income deflated by the
    cost-of-living index,
  • This means that the real wage of manufacturing
    workers in location r, denoted by ?rM is

31
2. The Dixit-Stiglitz Model
  • 3. Producer Behavior normalizations

For selecting the units we have to notice the
requirement so that the marginal labor satisfies
the next equation
  • Now, the price index and the wage equation
    becomes

IMP with these normalizations we have shifted
attention from the number of manufacturing firms
and product prices (n/G) to the number of
manufacturing workers and their wages rates.
(L/W).
32
2.The Dixit-Stiglitz Model
  • 5. The price index effect and the Home Market
    Effect
  • We consider an economy with 2 regions, that
    produce 2 manufacturing varieties
  • These pairs of equations are symmetric, and so
    its solutions.
  • So, if L1L2 Y1Y2, then there is a solution
    with G1G2 and with w1w2.
  • We can explore the relationships contained in the
    price indices and wage equations by linearizing
    them around the symmetric equilibrium
  • An increase in a variable in R1 is associated
    with a decrease in R2 but of equal absolute
    magnitude.
  • So letting dGdG1-dG2, and so on, we derive, by
    differentiating the price indices and wage
    equations respectively, and we get

33
2. The Dixit-Stiglitz Model
  • 5. The price index effect and the Home Market
    Effect
  • Eq 1 Price Index Effect We suppose that the
    supply of labor is perfectly elastic, so that
    dw0. Bearing in mind that 1-s lt0 and that Tgt1,
    the equation implies that a change dL/L in
    manufacturing employment has a negative effect on
    the price index, dG/G.
  • Conclusion the location with a larger
    manufacturing sector also has a lower price index
    for manufactured goods, simply because a smaller
    proportion of this regions manufacturing
    consumption bears transport costs.

34
2. The Dixit-Stiglitz Model
5. The price index effect and the Home Market
Effect
  • Now , let us consider how relative demand affects
    the location of manufacturing. It is convenient
    to define a new variable, Z,
  • Z is sort of an index of trade cost, with value
    between 0-1
  • Z0, if trade is costless
  • Z1, if trade is impossible.
  • Using the definition of Z and eliminating dG/G,
    we have
  • If dw0, supply of labor is perf. elastic Home
    market effect A 1 change in demand for
    manufactures (dY/Y) causes a 1/Z (gt1) change in
    the employment, and the production (dL/L).
  • The location with the larger home market has a
    more than proportionately larger manufacturing
    sector (industrial agglomeration) and therefore
    also tends to export manufactured goods.
  • If dwgt0, positive supply of labor part of the
    home market advantages is higher wages instead of
    exports
  • Locations with a larger home market (demand)
    tends to offer a higher nominal wage (qualified
    labor agglomeration).

34
35
2. The Dixit-Stiglitz Model
6. The No-Black-Hole Condition
  • We in general are not interested in economies in
    which increasing returns are that strong, if only
    because, in such economies the forces working
    toward agglomeration always prevail, and the
    economy tends to collapse into a point. (Everyone
    to NY).
  • To avoid this black-hole location theory, we
    usually impose what we call the assumption of no
    black holes

36
3. Applications
37
3. Applications
n industries
g goods
c countries
ROW rest of the world
Xngc output of product g in industry n in
country c.
ROW rest of the world
  •  
  •  

38
3. Applications
Xngc output of product g in industry n in
country c.
  •  
  •  

O technology matrix
V factor endowments of country c
39
3. Applications
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