Panel Data Models ECON 6002 Econometrics I Memorial University of Newfoundland Adapted from Vera...
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Transcript of Panel Data Models ECON 6002 Econometrics I Memorial University of Newfoundland Adapted from Vera...
ECON 6002Econometrics IMemorial University of Newfoundland
Adapted from Vera Tabakova’s notes
15.1 Grunfeld’s Investment Data
15.2 Sets of Regression Equations
15.3 Seemingly Unrelated Regressions
15.4 The Fixed Effects Model
15.4 The Random Effects Model
Extensions RCM, dealing with endogeneity when we have
static variables
The different types of panel data sets can be described as:
“long and narrow,” with “long” time dimension and “narrow”, few
cross sectional units;
“short and wide,” many units observed over a short period of time;
“long and wide,” indicating that both N and T are relatively large.
The data consist of T = 20 years of data (1935-1954) for N = 10 large firms.
Let yit = INVit and x2it = Vit and x3it = Kit
,it it itINV f V K
1 2 2 3 3it it it it it it ity x x e
Notice the subindices!
Value of stock, proxy for expected profitsCapital stock, proxy for desired permanentCapital stock
, 1 2 , 3 , ,
, 1 2 , 3 , ,
1, ,20
1, ,20
GE t GE t GE t GE t
WE t WE t WE t WE t
INV V K e t
INV V K e t
1 2 2 3 3 1, 2; 1, ,20it it it ity x x e i t
For simplicity we focus on only two firmskeep if (i==3 | i==8) in STATA
, 1, 2, , 3, , ,
, 1, 2, , 3, , ,
1, ,20
1, ,20
GE t GE GE GE t GE GE t GE t
WE t WE WE WE t WE WE t WE t
INV V K e t
INV V K e t
1 2 2 3 3 1, 2; 1, ,20it i i it i it ity x x e i t
Assumption (15.5) says that the errors in both investment functions (i) have zero mean, (ii) are homoskedastic with constant variance, and (iii) are not correlated over time; autocorrelation does not exist. The two equations do have different error variances
2, , , ,
2, , , ,
0 var cov , 0
0 var cov , 0
GE t GE t GE GE t GE s
WE t WE t WE WE t WE s
E e e e e
E e e e e
2 2 and .GE WE
reg inv v k if i==3scalar sse_ge = e(rss)
reg inv v k if i==8scalar sse_we = e(rss)
Let Di be a dummy variable equal to 1 for the Westinghouse
observations and 0 for the General Electric observations.
1, 1 2, 2 3, 3it GE i GE it i it GE it i it itINV D V D V K D K e
* Create dummy variablegen d = (i == 8)gen dv = d*vgen dk = d*k
* Estimate dummy variable modelreg inv d v dv k dktest d dv dk
This assumption says that the error terms in the two equations, at the same point in time, are correlated. This kind of correlation is called a contemporaneous correlation.
, , ,cov ,GE t WE t GE WEe e
Econometric software includes commands for SUR (or SURE) that
carry out the following steps:
(i) Estimate the equations separately using least squares;
(ii)Use the least squares residuals from step (i) to estimate
;
(iii)Use the estimates from step (ii) to estimate the two equations jointly
within a generalized least squares framework.
2 2,, and GE WE GE WE
* Open and summarize datause grunfeld2, clearsummarize
* SUR sureg ( inv_ge v_ge k_ge) ( inv_we v_we k_we), corrtest ([inv_ge]_cons = [inv_we]_cons) ([inv_ge]_b[v_ge] = [inv_we]_b[v_we]) ([inv_ge]_b[k_ge] = [inv_we]_b[k_we])
There are two situations where separate least squares estimation is
just as good as the SUR technique :
(i) when the equation errors are not contemporaneously correlated;
(ii)when the same explanatory variables appear in each equation.
If the explanatory variables in each equation are different, then a test
to see if the correlation between the errors is significantly different
from zero is of interest.
In this case we have 3 parameters in each equation so:
22,2
, 2 2
ˆ 207.58710.53139
ˆ ˆ 777.4463 104.3079GE WE
GE WEGE WE
r
20 20
, , , , ,1 1
1 1ˆ ˆ ˆ ˆ ˆ
3GE WE GE t WE t GE t WE tt tGE WE
e e e eTT K T K
3.GE WEK K
Testing for correlated errors for two equations:
LM = 10.628 > 3.84
Hence we reject the null hypothesis of no correlation between the
errors and conclude that there are potential efficiency gains from
estimating the two investment equations jointly using SUR.
0 ,: 0GE WEH
2 2, (1) 0 under .GE WELM Tr H
Testing for correlated errors for three equations:
0 12 13 23: 0H
2 2 2 212 13 23 (3)LM T r r r
Testing for correlated errors for M equations:
Under the null hypothesis that there are no contemporaneous
correlations, this LM statistic has a χ2-distribution with M(M–1)/2
degrees of freedom, in large samples.
12
2 1
M i
iji j
LM T r
Most econometric software will perform an F-test and/or a Wald χ2–test; in the context of SUR equations both tests are large sample approximate tests.
The F-statistic has J numerator degrees of freedom and (MTK) denominator degrees of freedom, where J is the number of hypotheses, M is the number of equations, and K is the total number of coefficients in the whole system, and T is the number of time series observations per equation. The χ2-statistic has J degrees of freedom.
0 1, 1, 2, 2, 3, 3,: , ,GE WE GE WE GE WEH
We cannot consistently estimate the 3×N×T parameters in (15.9) with only NT total observations. But we can impose some more structure…
1 2 2 3 3it it it it it it ity x x e
1 1 2 2 3 3, ,it i it it
We consider only one-way effects and assume common slopeparameters across cross-sectional units
All behavioral differences between individual firms and over time are
captured by the intercept. Individual intercepts are included to
“control” for these firm specific differences.
1 2 2 3 3it i it it ity x x e
This specification is sometimes called the least squares dummy
variable model, or the fixed effects model.
1 2 3
1 1 1 2 1 3, , , etc.
0 otherwise 0 otherwise 0 otherwisei i i
i i iD D D
11 1 12 2 1,10 10 2 2 3 3it i i i it it itINV D D D V K e
These N–1= 9 joint null hypotheses are tested using the usual F-test
statistic. In the restricted model all the intercept parameters are equal.
If we call their common value β1, then the restricted model is:
0 11 12 1
1 1
:
: the are not all equal
N
i
H
H
1 2 3it it it itINV V K e
We reject the null hypothesis that the intercept parameters for all
firms are equal. We conclude that there are differences in firm
intercepts, and that the data should not be pooled into a single model
with a common intercept parameter.
1749128 522855 948.99
522855 200 12
R U
U
SSE SSE JF
SSE NT K
1 2 2 3 3 1, ,it i it it ity x x e t T
1 2 2 3 31
1 T
it i it it itt
y x x eT
1 2 2 3 31 1 1 1
1 2 2 3 3
1 1 1 1T T T T
i it i it it itt t t t
i i i i
y y x x eT T T T
x x e
1 2 2 3 3
1 2 2 3 3
2 2 2 3 3 3
( )
( ) ( ) ( )
it i it it it
i i i i i
it i it i it i it i
y x x e
y x x e
y y x x x x e e
2 3it it it ity x x e
.1098 .3106
(se*) (.0116) (.0169)
itit itINV V K
2*ˆ 2e SSE NT
2 2 198 188 1.02625NT NT N
1 2 2 3 3i i i iy b b x b x
1 2 2 3 3 1, ,i i i ib y b x b x i N
ONE PROBLEM: Even with the trick of using the within estimator, we still implicitly (even if no longer explicitly) include N-1 dummy variables in our model (not N, since we remove the intercept), so we use up N-1 degrees of freedom.
It might not be then the most efficient way to estimate the common slope
ANOTHER ONE. By using deviations from the means, the procedure wipes out all the static variables, whose effects might be of interest
In order to overcome this problem, we can consider the random effects/or error components model
1 1i iu
20, cov , 0, vari i j i uE u u u u
1 2 2 3 3
1 2 2 3 3
it i it it it
i it it it
y x x e
u x x e
Randomness of the intercept
Usual error
Because the random effects regression error has two components, one
for the individual and one for the regression, the random effects
model is often called an error components model.
1 2 2 3 3
1 2 2 3 3
it it it it i
it it it
y x x e u
x x v
it i itv u e
a composite error
0 0 0it i it i itE v E u e E u E e
2
2 2
var var
var var 2cov ,
v it i it
i it i it
u e
v u e
u e u e
There are several correlations that can be considered.
The correlation between two individuals, i and j, at the same
point in time, t. The covariance for this case is given by
cov , ( )
0 0 0 0 0
it jt it jt i it j jt
i j i jt it j it jt
v v E v v E u e u e
E u u E u e E e u E e e
The correlation between errors on the same individual (i) at
different points in time, t and s. The covariance for this case is
given by
2
2 2
cov , ( )
0 0 0
it is it is i it i is
i i is it i it is
u u
v v E v v E u e u e
E u E u e E e u E e e
The correlation between errors for different individuals in
different time periods. The covariance for this case is
cov , ( )
0 0 0 0 0
it js it js i it j js
i j i js it j it js
v v E v v E u e u e
E u u E u e E e u E e e
2
2 2
cov( , )corr( , )
var( ) var( )it is u
it isu eit is
v vv v
v v
1 2 2 3 3it it it ity x x e
1 2 2 3 3it it it ite y b b x b x
2
1 1
2
1 1
ˆ1
2 1 ˆ
N T
iti t
N T
iti t
eNT
LMT e
* * * * *1 1 2 2 3 3it it it it ity x x x v
* * * *1 2 2 2 3 3 3, 1 , ,it it i it it it i it it iy y y x x x x x x x
2 21 e
u eT
2 2
ˆ .1951ˆ 1 1 .7437
5 .1083 .0381ˆ ˆe
u eT
Summary for now
Pooled OLS vs different intercepts: test (use a Chow type, after FE or run RE and test if the variance of the intercept component of the error is zero)
You cannot pool onto OLS? Then…
FE vs RE: test (Hausman type)
Different slopes too perhaps? => use SURE of RCM and test for equality of slopes across units
Summary for now
Note that there is within variation versus between variation
The OLS is an unweighted average of the between estimator and the within estimator
The RE is a weighted average of the between estimator and the within estimator
The FE is also a weighted average of the between estimator and the within estimator with zero as the weight for the between part
Summary for now
The RE is a weighted average of the between estimator and the within estimator
The FE is also a weighted average of the between estimator and the within estimator with zero as the weight for the between part
So now you see where the extra efficiency of RE comes from!...
Summary for now
The RE uses information from both the cross-sectional variation in the panel and the time series variation, so it mixes LR and and SR effects
The FE uses only information from the time series variation, so it estimates LR effects
Summary for now
With a panel, we can learn about dynamic effects from a short panel, while we need a long time series on a single cross-sectional unit, to learn about dynamics from a time series data set
If the random error is correlated with any of the right-
hand side explanatory variables in a random effects model then the
least squares and GLS estimators of the parameters are biased and
inconsistent.
it i itv u e
1 2 2 3 31 1 1 1 1
1 2 2 3 3
1 1 1 1 1T T T T T
i it it it i itt t t t t
i i i i
y y x x u eT T T T T
x x u e
1 2 2 3 3 ( )it it it i ity x x u e
1 2 2 3 3
1 2 2 3 3
2 2 2 3 3 3
( )
( ) ( ) ( )
it it it i it
i i i i i
it i it i it i it i
y x x u e
y x x u e
y y x x x x e e
We expect to find
because Hausman proved that
, , , ,
1 2 1 22 2
, ,, ,se sevar var
FE k RE k FE k RE k
FE k RE kFE k RE k
b b b bt
b bb b
, ,var var 0.FE k RE kb b
, , , , , ,
, ,
var var var 2cov ,
var var
FE k RE k FE k RE k FE k RE k
FE k RE k
b b b b b b
b b
, , ,cov , var .FE k RE k RE kb b b
The test statistic to the coefficient of SOUTH is:
Using the standard 5% large sample critical value of 1.96, we reject the hypothesis that the estimators yield identical results. Our conclusion is that the random effects estimator is inconsistent, and we should use the fixed effects estimator, or we should attempt to improve the model specification.
, ,
1 2 1 22 2 2 2
, ,
.0163 (.0818) 2.3137
.0361 .0224se se
FE k RE k
FE k RE k
b bt
b b
If the random error is correlated with any of the right-
hand side explanatory variables in a random effects model then the
least squares and GLS estimators of the parameters are biased and
inconsistent.
Then we would have to use the FE model
But with FE we lose the static variables?
Solutions? HT, AM, BMS, instrumental variables models could help
it i itv u e
We can generalise the random effects idea and allow for different
slopes too: Random Coefficients Model
Again, the now it is the slope parameters that differ, but as in RE
model, they are drawn from a common distribution
The RCM in a way is to the RE model what the SURE model is to the
FE model
Further issues
Unit root tests and Cointegration in panels
Dynamics in panels
Further issues
Of course it is not necessary that one of the dimensions of the panel is
time as such Example: i are students and t is for each quiz they take
Of course we could have a one-way effect model on the time
dimension instead
Or a two-way model
Or a three way model! But things get a bit more complicated there…
Further issues
Another way to have more fun with panel data is to consider
dependent variables that are not continuous
Logit, probit, count data can be considered
STATA has commands for these
Based on maximum likelihood and other estimation techniques we
have not yet considered
Further issues
You can understand the use of the FE model as a solution to omitted variable bias
If the unmeasured variables left in the error model are not correlated
with the ones in the model, we would not have a bias in OLS, so we
can safely use RE
If the unmeasured variables left in the error model are correlated with
the ones in the model, we would have a bias in OLS, so we cannot
use RE, we should not leave them out and we should use FE, which
bundles them together in each cross-sectional dummy
Further issues
Another criterion to choose between FE and RE
If the panel include all the relevant cross-sectional units, use FE, if only a random sample from a population, RE is more appropriate (as long as it is valid)
Further issues
Wooldridge’s book on panel data
Baltagi’s book on panel data
Greene’s coverage is also good
Readings
Slide 15-63Principles of Econometrics, 3rd Edition
Slide 15-64Principles of Econometrics, 3rd Edition
Principles of Econometrics, 3rd Edition Slide 15-65
(15A.1)
(15A.2)
(15A.3)
1 2 2 3 3 ( )it it it i ity x x u e
2 2 2 3 3 3( ) ( ) ( )it i it i it i it iy y x x x x e e
2ˆ DVe
slopes
SSE
NT N K
Principles of Econometrics, 3rd Edition Slide 15-66
(15A.4)
(15A.5)
1 2 2 3 3 1, ,i i i i iy x x u e i N
1
22 2
2 21
22
var var var var var
1var
T
i i i i i itt
Te
u it ut
eu
u e u e u e T
Te
T T
T
Principles of Econometrics, 3rd Edition Slide 15-67
(15A.6)
(15A.7)
22 e BEu
BE
SSE
T N K
2 2
2 2 ˆˆ e e BE DV
u uBE slopes
SSE SSE
T T N K T NT N K