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Advanced Macroeconomics

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Title: Advanced Macroeconomics


1
Advanced Macroeconomics
  • University Lille 1
  • M2 EITEI
  • Thomas Weitzenblum

2
Organization of the course
  • My name Thomas Weitzenblum
  • To join me thomas.weitzenblum_at_univ-lille2.fr
  • To get the PPT presentations
  • http//weitzenblum.free.fr

3
What will the course look like?
  • If we can stick to the original plan, each 2
    hours course will be devoted to a theory/economic
    question,
  • I will take care of the introduction,
  • The rest of the course will consist in studying a
    document that you will have previously read

4
Advanced Macro II whats in it??
  • Prof. Ragot has focused on the economic analysis
    of the long run dynamics,
  • Therefore, we will analyse the short-medium run
    implications of macroeconomic dynamics, for the
    Advanced Macro course to be a complete survey of
    modern macro.

5
(expected) plan of the course
  1. An introduction to Real Business Cycle Theory
  2. A 2-country RBC
  3. Endogenous cycles,
  4. Keynesian views of macroeconomic fluctuations
    fixed or staggered prices
  5. The labor market job creation and job
    destruction
  6. Monetary policy in a multi-country model

6
  • Remarks
  • Only 2 hours for each subject is a binding
    constraint
  • Especially with the first topic, which is not a
    particular application, but a whole field in
    macro, with numerous applications
  • So, more likely than not, one of the previous 6
    subject might be sacrificed on the altar of the
    total inelasticity of time supply

7
Subject 1 RBC theory the modern view of
competitive equilibria in a fluctuating world
8
I. Introduction
  • Attention to economic cycles has arisen quite
    early Clément Juglar, as early as 1860,
  • The beginning of the analysis of cycles (as
    opposed to the simple enumeration of crises)
  • Descriptive different types of cycles Juglar,
    Kitchin and Kondratieff,
  • First attempts to understand the propagation of
    shocks over time and sectors Mitchell (1927),
  • First attempts to tackle the statistical issue
    how to be sure that what we see as a cycle is
    really one?

9
  • Cycles or not cycles??
  • In 1927, Slutzky shows that what may appear,
    visually, and statistically, as cycles to be
    defined- may be the result of pure randomness,
    deprived of any mean-reverting mechanism
  • A simple mobile average of a period-by-period
    white noise does the job

10
A simulated example
11
Frischs rocking horse
  • Ragnar Frisch (1933) proposes a new distinction
    regarding the analysis of economic fluctuations
  • Fluctuations are due to shocks affecting the
    economy,
  • Consequently, an obvious distinction must be made
    between the impulse of the shock (its origin, its
    magnitude, its own temporal and statistical
    characteristics) and its propagation onto the
    economy,
  • Very much like we distinguish between the stick
    that hits a rocking horse (its intensity, etc)
    and the subsequent movement of the horse.

12
  • Frisch claims that this distinction originally
    belongs to Wicksell.
  • What is the meaning/ the extent of this view?
  • stochastic shocks are regarded as an essential
    source of fluctuations,
  • but, while shocks are exogenous, the response of
    the economy, over time, over sectors, over types
    of agents, will be endogenous the structure of
    the economy determines the nature of the
    propagation

13
  • This suggests a clear departure from the point
    of view that cycles may be fully endogenous (they
    solely depend on the structure of the economy)
  • But it also clearly departs from the other
    extreme view that shocks are fully exogenous, so
    that the whole macrodynamics is itself exogenous
  • Simply because here, part of the story is
    exogenous, and part is endogenous.

14
  • A simulated example
  • Assume a type of Samuelsons oscillator
    (Investment depends on expected demand, and the
    production function is linear in K)
  • Also assume that current consumption depends on
    past income (1-period lag)

15
  • This implies that the GDP dynamics is
    characterized by the following second-order
    difference equation
  • With a plausible parameterization, this gives
    rise to damped fluctuations

16
  • If additional stochastic shocks were to affect,
    say, investment
  • with ?t being a white noise, that is a random
    variable such that
  • its mean (rather, its expected value) is equal
    to zero,
  • its current realization ?t is independent from
    any past one ?t-i,
  • its has a Gaussian distribution, that is, its
    variance is constant throughout the time

17
  • The response of the economy to this repeated
    shocks might well look like the time series of
    GDP in France, or the US.

18
  • What we have seen so far
  • The impulse-propagation view tends to be prefered
    to the endogenous cycle one,
  • It suggests to describe with as much precision as
    one can the propagation mechanisms,
  • But it of course requires too, and even
    beforehand, to correctly model the exogenous
    shock as a random variable, it may be
    characterized by persistence (or not), multi-lags
    (or not), etc

19
  • The RBC framework is very much the heir of
    Frischs rocking horse,
  • However, a word needs be said about the real
    aspect of business cycles, which, of course,
    opposes to nominal aspects of the business cycle.

20
  • Real vs. Nominal cycles??
  • If RBC are named this way, it owes a lot to their
    initial developments, and to Long and Plossers
    (1983) initiative
  • However, the impulse propagation mechanisms can
    be relevant with monetary disturbances as well as
    real ones.
  • Historically, the first  fluctuations at the
    equilibrium  models were rooted in monetary
    policy, and
  • Modern RBC models do take money and financial
    considerations into account.
  • So that these models are not all focused on real
    sources of fluctuations.

21
  • II. Facts on macroeconomic fluctuations
  • The various dimensions along which temporal
    fluctuations do matter
  • The standard deviation of the variable, of course
    in percentage points, dives an insight on how
    volatile the variable is,
  • Its auto-correlation, with respect to various
    lags and leads, gives valuable information on the
    degree of persistence of the variable,
  • Its correlation with any other variable may be of
    interest. Of course, its correlation with GDP
    comes first it makes the variable either
    procyclical, or countercyclical

22
  • But, even before all these considerations, how
    can we obtain time series in such a format that
    they are suited for revealing business cycle
    properties?
  • The answer is detrending time series first, and,
    once detrended, fluctuations around the trend may
    be analyzed.

23
Trend and fluctuations around the trend in the US
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25
U.S. business cycle characteristics
26
  • III. RBC a basic framework
  • Uncertainty and intertemporel choices
  • We assume the absence of government, and a closed
    economy.
  • Same assumptions as the Ramsey model.
  • In particular, no market imperfection (no
    externality, or imperfect information).

27
  • This implies that the equilibrium is
    Pareto-efficient in a Ramsey model. The exogenous
    shifts in the productivity parameter will not
    change anything in terms of efficiency
  • The dynamic equilibrium of the economy, subject
    to aggregate shocks, is optimal.
  • This does not mean that agents like fluctuations,
    but that, given that there are fluctuations, the
    decentralized equilibrium cannot be outperformed.

28
  • This has another essential implication
  • The resolution of the central planners program,
    or that of the decentralized equilibrium, will
    lead to the same results
  • We can choose whether we explicitly describe the
    behavior of individuals, facing prices, or the
    optimal allocation of the planner.
  • Caution
  • this is not true for all RBCs, since many, of
    course, are going further and do introduce
    government spendings, distorsive taxation,
    externalities, etc

29
  • The setting
  • A 2-period economy.
  • The uncertainty takes the form of 2 possible
    states of nature for date 2.
  • Agents can by claim to 1 unit of date
    2-consumption depending on the state of nature
    (high h or low l). To each state is associated a
    probability ?l and ?h 1- ?l
  • Markets are said to be complete.

30
  • Agents are all alike, and there is a continuum,
    of measure 1, of such agents.
  • Each is endowed with an endowment w1 at date 1,
    and produces according to the function
  • Where ei is the productivity shock (el lt eh) and
    k is the individual date 1 investment.
  • The aggregate endowment is identical to the
    individual one (agents measure equals 1).

31
  • Agents preferences (no leisure)
  • Agents live for 2 periods, and the utility is
    separable with respect to time
  • Agents program

32
  • The intertemporal budget constraint writes
  • Standard program (with 3 goods)
  • Optimality condition
  • agents equate the marginal rate of substitution
    with the relative price

33
  • Agents can individually perfectly insure
    themselves against the uncertain future

34
  • However, if all agents are alike, they will all
    try to perfectly insure, raising the relative
    value of the good they want to buy (low) and
    lowering that of the other (high).
  • In the end, we know that perfect insure is
    impossible, because the global endowment at date
    2 depends on the state of nature.
  • Agents will all behave similarly, and similarly
    to a representative agent whose consumption is
    the average of the agents.

35
  • This representative agent behaves like Robinson
    Crusoe on his island he is alone, so cannot
    exchange with anyone.
  • He simply consumes, at each date, his endowment
    (he would probably invests, if he was allowed
    to).
  • The Euler Equation of the agent writes

36
  • This is the Euler equation (or the Keynes-Ramsey
    condition) for the discrete-time uncertainty
    augmented Ramsey model.
  • The new term is the covariance when the
    productivity shock is high, so is the interest
    rate, consumption is high too, but then its
    marginal utility is low
  • The covariance is negative.

37
  • What can be understood from these calculations?
  • In an uncertain world, expected value do matter,
    but they are not the whole story the covariance
    must not be forgotten.
  • The Euler equation has a similar form here, to
    that in deterministic models.
  • And, very important, we know that we can resort
    to the representative agent (rigorously, the
    marginal rate of substitution needs be
    homogeneous of degree 0 with respect to
    consumption at different dates).

38
  • The next step adding leisure.
  • Absolutely necessary otherwise, the fluctuations
    of output would be only caused by
  • The productivity shock, which is exogenous,
  • The investment behavior of the agents, who take
    advantage of a positive productivity shock,
    whenever it occurs.
  • However, we may notice that this simple model
    already contains, qualitatively, if not
    quantitatively, the mechanisms pertaining to the
    rocking horse

39
  • The productivity shock may hit the economy only
    once, but
  • agents reaction will be to save/invest more at
    the time productivity is high.
  • Otherwise, if they did not save more, they would
    simply increase their current consumption.
  • This would break the smoothness of the
    consumption path.
  • Agents decide to save part of the increase in
    productivity, to take advantage of a higher
    consumption during several time periods.

40
  • Since investing increases the capital stock, this
    means that future capital levels will be higher
    than their long-run target
  • Future GDP will also be higher, even if the
    productivity shock is gone
  • This model, however simple, manages, at least
    qualitatively, to create some form of persistence
    in the dynamics of output and capital.
  • This is precisely what is intended data show a
    considerable amount of persistence, so the model
    has to contain the mechanisms creating it,
    otherwise the persistence would be solely due to
    the exogenous shock.

41
  • As was already noted, the next step consists in
    adding leisure (cf. Romer, chapter 4)
  • A 2-period model, without uncertainty (to start
    with).
  • The intertemporal utility function is

42
  • The productive sector a large number of
    identical firms, with a Cobb-Douglas production
    function
  • A constant rate of capital depreciation ?.
  • Factors earn their marginal productivity.

43
  • And the intertemporal budget constraint
  • The optimality condition writes
  • Another optimality condition

44
  • In the presence of uncertainty, one obtains the
    same equation as one put forward previously
  • In the case of total capital depreciation between
    2 consecutive periods, the saving rate can be
    proved to be constant, as well as the labor
    supply.

45
  • Advantage of the simplifying assumptions
  • Enabling for a closed-form solution.
  • Great inconvenient labor supply does not depend
    on the current wage no intertemporal
    substitution of labor.
  • This model will not generate enough volatility,
    and not enough persistence.

46
  • It is now your turn to work a bit
  • Here are the following questions, that await
    answers from you all
  • What is the general principles for solving
    numerically more complex RBC models?
  • How are the coefficient of the log-linearized
    version of the model found?
  • What is an impulse response function?
  • What is the impact of a 1 productivity shock on
    the dynamics of the various variables of interest?

47
  • 5) What were the possible reasons of the success
    of RBC models among economists (compare with
    potential explanations from another paradigm)?
  • 6) What does it mean, to consider that per capita
    output has a random walk component? What does an
    RBC model endowed with such a property tell us,
    in terms of short-run dynamics?
  • 7) With a standard RBC model, what variables have
    their dynamics correctly mimicked by the model?
    Which ones do not? Explain.

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