1. Economic Growth: The Solow Model

2. Chapter 6 Topics Economic growth facts Solow growth model Convergence
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3. SOME EMPIRICAL FACTS
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4. U.S. Per Capita Income Growth
In the United States, growth in per capita income has not strayed far from 2% per year (excepting the Great Depression and World War II) since
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5. Figure 1 Natural Log of Real Per-Capita Income in the United States, 1869–2005
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6. Real Per Capita Income and the Investment Rate
Across countries, real per capita income and the investment rate are positively correlated.
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7. Figure 2 Real Income Per Capita vs. Investment Rate
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8. Real per capita income and the rate of population growth
Across countries, real per capita income and the population growth rate are negatively correlated.
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9. Figure 3 Real Income Per Capita vs. the Population Growth Rate
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10. Real per capita income and per capita income growth
There is no tendency for rich countries to grow faster than poor countries, and vice-versa.
Rich countries are more alike in terms of rates of growth than are poor countries.
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11. Figure 4 Growth Rate in Per Capita Income vs
Figure 4 Growth Rate in Per Capita Income vs. Real Income Per Capita for the Countries of the World
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12. All Key Facts Together US real p.c. income grew steady at 2% per year
Across countries, real per capita income is:
positively correlated with investment rate
negatively correlated with population growth rate
Rich countries don’t grow faster than poor, and vice-versa
Rich countries are more alike w.r.t. growth rates than poor ones
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13. SOLOW GROWTH MODEL
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14. Solow Growth Model
Want a model to capture and explain these facts  Solow model
This is a key model which is the basis for the modern theory of economic growth.
A key prediction is that technological progress is necessary for sustained increases in standards of living.
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15. Population growth
Variables with ′ sign denote the value in the next period (N′ is population next year)
In the Solow growth model, population is assumed to grow at a constant rate n.
where n > −1
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16. Consumption-Savings Behavior
Consumers are assumed to save a constant fraction s of their income, consuming the rest:
If we allow for endogenous savings, model gets much harder, but the predictions do not change a lot
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17. Representative Firm’s Production Function (P.F.)
Firms have a standard production function:
Assume it has constant returns to scale
Divide both sides by N to get:
Will work with a per-capita P.F.:
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18. Example: Cobb-Douglas P.F.
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19. Evolution of the Capital Stock
Future capital equals the capital remaining after depreciation, plus current investment.
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20. Figure 5 The Per-Worker Production Function
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21. Solving the Solow Model, 1
Consumption market must clear:
In equilibrium, future capital equals total savings S (= I ) plus what remains of current K.
since S = sY (rest gets consumed)
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22. Solving the Solow Model, 2
Substitute for output from the P.F.:
Rewrite in per-worker form:
where:
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23. Solving the Solow Model, 3
Re-arrange to get the main equation:
Determines the evolution of per-capita (or per worker) capital in the model
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24. Example: Cobb-Douglas P.F.
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25. Finding the Steady State
Steady state – situation when per worker capital stock does not grow, i.e. k′ = k
Think about steady state as the long-run equilibrium level
Will discuss several ways of finding it
2 graphical ways
and analytic way
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26. Discuss adjustment dynamics to the steady state
Figure 6 Determination of the Steady State Quantity of Capital per Worker
Discuss adjustment dynamics to the steady state
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27. Finding Steady State Level of Capital
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28. Figure 7 Determination of the Steady State Quantity of Capital per Worker
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29. Analyzing the Steady State
Now, we found k*, what’s its growth rate?
Zero, by definition of steady state
Hence y* = z f(k*) doesn’t grow either!
So do we have a growth model that predicts growth will stop eventually?
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30. Growth in the Steady State
Of course not! Recall that k = K/N and
Even though steady-state capital per worker k* doesn’t grow, total capital stock K= k N does!
In fact, K and Y (and hence all other aggregate variables) grow at rate n in the steady state!
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31. RUNNING EXPERIMENTS Solow Model: 6-31
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32. Increase in the Savings Rate, s
Having the steady state, can do experiments
Suppose savings rate s goes up. Effects?
In the steady state, this increases capital per worker and real output per capita
In the steady state, there is no effect on the growth rates of aggregate variables
some intertemporal dynamics
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33. Figure 8 Effect of an Increase in the Savings Rate on the Steady State Quantity of Capital per Worker
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34. Figure 9 Effect of an Increase in the Savings Rate at Time T
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35. Summary of Effects from Increase in s
On per-capita variables (k, y)
New steady state level (higher)
No change in steady state growth rate (zero)
On aggregate variables (K, Y)
No change in steady state growth rate (n)
What about consumption? That’s what consumers usually care about!
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36. Figure 10 Steady State Consumption per Worker
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37. Golden Rule Level of Savings
GR level of s is the one that maximizes consumption per worker in the steady state c*
and hence aggregate consumption C *
To find it, write down the expression for c* :
c* = (1­s) z f(k*)
And maximize it
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38. Finding the sGR, 1
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39. Finding the sGR, 2
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40. Increase in the Population Growth Rate, n
Another experiment – increase the population growth rate n
Results:
Capital per worker and output per worker decrease
Growth rates of aggregate variables go up (since they are equal to n)
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41. Figure 11 Steady State Effects of an Increase in the Labor Force Growth Rate
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42. Limits to Growth So per capita income y will increase if:
savings rate s goes up
or if population growth rate n goes down (showed if n goes up, y goes down)
But there are limits to impact of these factors!
How can we have sustained increases in per- capita income?
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43. Increases in Total Factor Productivity, z
Sustained increases in z cause sustained increases in per capita income.
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44. Figure 12 Increases in Total Factor Productivity in the Solow Growth Model
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45. CONVERGENCE THEORY Solow Model: 6-45
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46. Convergence in the Solow Growth Model
Is there a tendency for poor countries to catch up with the rich ones?
The Solow growth model says “yes”!
As always, need some assumptions:
Two identical countries (same z, n, s)
The “rich” country initially has a higher level of capital per worker k. (Consequently, it also has a higher output per worker y)
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47. Predictions of the Solow Model
If two countries are initially rich and poor, but identical in all other respects, they will converge in the long run to the same level and rate of growth of per-capita income.
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48. Figure 13 Rich and Poor Countries and the Steady State
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49. Figure 14 Convergence in Income per Worker Across Countries in the Solow Growth Model
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50. Figure 15 Convergence in Aggregate Output Across Countries in the Solow Growth Model
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51. Convergence in the Data
Unfortunately, we don’t see evidence supporting the convergence theory in cross-country data:
while there seems to be some convergence among the rich countries
there is nothing like this for the poor ones
Here are the diagrams:
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52. Figure 16 Hardly Any Convergence Across Countries
Want negative correlation, not sure it’s here
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53. Figure 17 Some Convergence Across Rich Countries
Looks like negative correlation here
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54. Figure 18 No Convergence Across Poor Countries
Almost zero correlation here
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55. Why No Convergence?
If model predictions are wrong, usually this means some assumptions aren’t correct
Here, assumed same z for all countries
What if countries have access to different technologies?
say, due to some government policies that forbid imports of technologies
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56. Figure 19 Differences in Total Factor Productivity Can Explain Disparity in Income per Worker Across Countries
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57. What Should Poor Countries Do?
Some things could be done, it depends on the government to get things right
Promote greater competition among firms: Absence of monopolies creates the incentive to innovate
Promote free trade
This kind of policy seemed to have worked for Japan after WWII
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