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Specification Errors

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Title: Specification Errors


1
Specification Errors
  • Omission of relevant variables Exclusion of
    relevant variables

2
Example
  • Suppose Y is the average monthly rent of two
    bedroom apartments. X is the number of closets.
    Z is square footage of the apartment.
  • We estimate a regression model with Y as the
    dependent variable and X as the explanatory
    variable. What do you think will happen?

3
What Happens?
Y
Z
X
With Z, Pink Area Used to Estimate bx. If Z is
omitted, Green Pink Area Used to Estimate bx.
4
Omitted Variables
  • True Model is
  • Yi b0b1X1ib2X2i ei
  • We estimate
  • Yi b0b1X1i mi
  • Observe that
  • mib2X2iei

5
What Are Consequences?
  • Recall the classical assumptions. Which one is
    violated?
  • What are the consequences if this assumption is
    violated?

6
Classical Assumptions
  • The regression model is linear in the
    coefficients and the error term.
  • The error term has zero population mean
  • All explanatory variables are uncorrelated with
    the error term
  • Observations of the error term are uncorrelated
    with each other (no serial correlation)
  • The error term has constant variance (no
    heteroskedasticity)
  • No explanatory variable is a perfect linear
    function of the other explanatory variables (no
    perfect multicollinearity)
  • The error term is normally distributed.
    (optional).

7
Omitted Variable Bias
  • Consistency and unbiasedness depended on these
    two assumptions
  • If X1 and X2 are correlated, the error term will
    be correlated with X1.And, the estimated
    coefficient on X1 will be biased.
  • The expected sign of the bias will depend on the
    sign on b2 and on whether X1 and X2 are
    positively or negatively correlated.

8
Example Yi102Xi-2Ziei
9
Without Z
10
Sampling Distribution of b Estimator When
Relevant Z Omitted
11
Expected Bias
12
(No Transcript)
13
Conditions Where b1 is Unbiased
  • X2 is irrelevant. The true b20.
  • The simple correlation coefficient between X1 and
    X2 is zero.

14
What Kind of Bias?
  • In equation for the demand for peanut butter, the
    impact on the coefficient of disposable income of
    omitting the price of peanut butter
  • In earnings equation for workers, the impact of
    the coefficient of experience of omitting the
    variable for age
  • In a production function for airplanes, the
    impact on the coefficient of labor of omitting
    the capital variable
  • In an equation for daily attendance at outdoor
    concerts, the impact on the coefficient of the
    weekend dummy variable (1weekend) of omitting a
    variable that measures the probability of
    precipitation at concert time.

15
Another Example
  • Consider the following annual model of the death
    rate (per million population) due to coronary
    heart disease in the United States (Yt)
  • Yhatt14010.0Ct4.0Et-1.0Mt
  • (2.5) (1.0) (0.5)
  • N31 (1950-1980) Adj R Squared.678

16
Most Likely Cause of Unexpected Sign on M is
Omission of
  • Per capita consumption of hard liquor (gallons)
    in year t
  • The average fat content () of the meat that was
    consumed in year t
  • Percapita consumption of wine and beer (gallons)
    in year t
  • Per capita number of miles run in year t
  • Per capita open heart surgeries in year 5
  • Per capita amount of oat bran eaten in year t

17
Inclusion of Irrelevant Variable
  • True Model is
  • Yi b0b1X1i ei
  • We estimate
  • Yi b0b1X1ib2X2i mi
  • Observe that
  • mi --b2X2iei

18
No Bias
  • If X2 is irrelevant, b2 0.
  • The estimated coefficient on X1 will be
    unbiased
  • The variance of estimated coefficient will
    increase.

19
Regression Analysis In Action
  • Trandel The Bias Due to Omitting Quality When
    Estimating Automobile Demand
  • Graddy Do Fast-Food Chains Price Discriminate?
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