heteroskedasticity econ 4550 econometrics memorial university of newfoundland adapted from vera...
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ECON 4550 Econometrics Memorial University of Newfoundland
Adapted from Vera Tabakova’s notes
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8.1 The Nature of Heteroskedasticity
8.2 Using the Least Squares Estimator
8.3 The Generalized Least Squares Estimator
8.4 Detecting Heteroskedasticity
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1 2( )E y x
1 2( )i i i i ie y E y y x
1 2i i iy x e
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Figure 8.1 Heteroskedastic Errors
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2( ) 0 var( ) cov( , ) 0i i i jE e e e e
var( ) var( ) ( )i i iy e h x
ˆ 83.42 10.21i iy x
ˆ 83.42 10.21i i ie y x
Food expenditure example:
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Figure 8.2 Least Squares Estimated Expenditure Function and Observed Data Points
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The existence of heteroskedasticity implies:
The least squares estimator is still a linear and unbiased estimator, but
it is no longer best. There is another estimator with a smaller
variance.
The standard errors usually computed for the least squares estimator
are incorrect. Confidence intervals and hypothesis tests that use these
standard errors may be misleading.
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21 2 var( )i i i iy x e e
2
22
1
var( )( )
N
ii
bx x
21 2 var( )i i i i iy x e e
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2 2
2 2 12 2
1 2
1
( )var( )
( )
N
i iNi
i iNi
ii
x xb w
x x
2 2
2 2 12 2
1 2
1
ˆ( )ˆvar( )
( )
N
i iNi
i iNi
ii
x x eb w e
x x
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ˆ 83.42 10.21
(27.46) (1.81) (White se)
(43.41) (2.09) (incorrect se)
i iy x
2 2
2 2
White: se( ) 10.21 2.024 1.81 [6.55, 13.87]
Incorrect: se( ) 10.21 2.024 2.09 [5.97, 14.45]
c
c
b t b
b t b
We can use a robust estimator: regress food_exp income, robust
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In SHAZAM the HETCOV option on the OLS command reports the White's heteroskedasticity-consistent standard errors
OLS FOOD INCOME / HETCOV
Confidence interval estimate using the White standard errors CONFID INCOME / TCRIT=2.024
But the White standard errors reported by SHAZAM have numeric differences compared to our textbook results.
There is a correction we could apply, but we will not worry about it for now
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1 2
2( ) 0 var( ) cov( , ) 0
i i i
i i i i j
y x e
E e e e e
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2 2var i i ie x
1 2
1i i i
i i i i
y x e
x x x x
1 2
1 i i i
i i i i i
i i i i
y x ey x x x e
x x x x
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1 1 2 2i i i iy x x e
2 21 1var( ) var var( )i
i i ii ii
ee e x
x xx
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To obtain the best linear unbiased estimator for a model with
heteroskedasticity of the type specified in equation (8.11):
1. Calculate the transformed variables given in (8.13).
2. Use least squares to estimate the transformed model given in (8.14).
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The generalized least squares estimator is as a weighted least
squares estimator. Minimizing the sum of squared transformed errors
that is given by:
When is small, the data contain more information about the
regression function and the observations are weighted heavily.
When is large, the data contain less information and the
observations are weighted lightly.
22 1/2 2
1 1 1
( )N N N
ii i i
i i ii
ee x e
x
ix
ix
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ˆ 78.68 10.45
(se) (23.79) (1.39)i iy x
2 2ˆ ˆse( ) 10.451 2.024 1.386 [7.65,13.26]ct
Food example again, where was the problem coming from?
regress food_exp income [aweight = 1/income]
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ˆ 78.68 10.45
(se) (23.79) (1.39)i iy x
2 2ˆ ˆse( ) 10.451 2.024 1.386 [7.65,13.26]ct
Food example again, where was the problem coming from?
Specify a weight variable (SHAZAM works with the inverse) GENR W=1/INCOME OLS FOOD INCOME / WEIGHT=W 95% confidence interval, p. 205 CONFID INCOME / TCRIT=2.024
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Note that
The residual statistics reported in a WLS regression (SIGMA**2, STANDARD ERROR OF THE ESTIMATE-SIGMA, and SUM OF SQUARED ERRORS-SSE) are all based on the transformed (weighted) residuals
You should remember when making model comparisons, that the high-variance observations are systematically underweighted by this procedure
This may be a good thing, if you want to avoid having these observations dominate the model selection comparisons.
But if you want model selection to be based on how well the alternative models fit the original (untransformed) data, you must base the model selection tests on the untransformed residuals.
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2 2var( )i i ie x
2 2ln( ) ln( ) ln( )i ix
2 2
1 2
exp ln( ) ln( )
exp( )
i i
i
x
z
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21 2 2exp( )i i s iSz z
21 2ln( )i iz
1 2( )i i i i iy E y e x e
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2 21 2ˆln( ) ln( )i i i i ie v z v
2ˆln( ) .9378 2.329i iz
21 1ˆ ˆˆ exp( )i iz
1 2
1i i i
i i i i
y x e
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22 2
1 1var var( ) 1i
i ii i i
ee
1 2
1ˆ ˆ ˆ
i ii i i
i i i
y xy x x
1 1 2 2i i i iy x x e
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1 2 2i i k iK iy x x e
21 2 2var( ) exp( )i i i s iSe z z
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The steps for obtaining a feasible generalized least squares estimator
for are:
1. Estimate (8.25) by least squares and compute the squares of
the least squares residuals .
2. Estimate by applying least squares to the equation
1 2, , , K
2ie
1 2, , , S
21 2 2ˆln i i S iS ie z z v
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3. Compute variance estimates .
4. Compute the transformed observations defined by (8.23),
including if .
5. Apply least squares to (8.24), or to an extended version of
(8.24) if .
21 2 2ˆ ˆ ˆˆ exp( )i i S iSz z
3, ,i iKx x 2K
2K
ˆ 76.05 10.63
(se) (9.71) (.97)iy x
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For our food expenditure example:
gen z = log(income)regress food_exp incomepredict ehat, residualgen lnehat2 = log(ehat*ehat)regress lnehat2 z
* --------------------------------------------* Feasible GLS* --------------------------------------------predict sig2, xbgen wt = exp(sig2)regress food_exp income [aweight = 1/wt]
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The HET command can be used for Maximum Likelihood Estimation of the model given in Equations (8.25) and (8.26), p. 207.
This method is an alternative estimation method to the GLS method discussed in the text (so the results will also be different):
HET FOOD INCOME (INCOME) / MODEL=MULT
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9.914 1.234 .133 1.524
(se) (1.08) (.070) (.015) (.431)
WAGE EDUC EXPER METRO
1 2 3 1,2, ,Mi M Mi Mi Mi MWAGE EDUC EXPER e i N
1 2 3 1,2, ,Ri R Ri Ri Ri RWAGE EDUC EXPER e i N
1 9.914 1.524 8.39Mb
Using our wage data (cps2.dta):
???
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2 2var( ) var( )Mi M Ri Re e
2 2ˆ ˆ31.824 15.243M R
1 2 3
1 2 3
9.052 1.282 .1346
6.166 .956 .1260
M M M
R R R
b b b
b b b
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1 2 3
1Mi Mi Mi MiM
M M M M M
WAGE EDUC EXPER e
1,2, , Mi N
1 2 3
1Ri Ri Ri RiR
R R R R R
WAGE EDUC EXPER e
1,2, , Ri N
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Feasible generalized least squares:
1. Obtain estimated and by applying least squares separately to
the metropolitan and rural observations.
2.
3. Apply least squares to the transformed model
ˆ M ˆ R
ˆ when 1ˆ
ˆ when 0
M i
i
R i
METRO
METRO
1 2 3
1ˆ ˆ ˆ ˆ ˆ ˆ
i i i i iR
i i i i i i
WAGE EDUC EXPER METRO e
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9.398 1.196 .132 1.539
(se) (1.02) (.069) (.015) (.346)
WAGE EDUC EXPER METRO
_cons -9.398362 1.019673 -9.22 0.000 -11.39931 -7.397408 metro 1.538803 .3462856 4.44 0.000 .8592702 2.218336 exper .1322088 .0145485 9.09 0.000 .1036595 .160758 educ 1.195721 .068508 17.45 0.000 1.061284 1.330157 wage Coef. Std. Err. t P>|t| [95% Conf. Interval]
Total 36081.2155 999 36.1173328 Root MSE = 5.1371 Adj R-squared = 0.2693 Residual 26284.1488 996 26.3897076 R-squared = 0.2715 Model 9797.0667 3 3265.6889 Prob > F = 0.0000 F( 3, 996) = 123.75 Source SS df MS Number of obs = 1000
(sum of wgt is 3.7986e+01). regress wage educ exper metro [aweight = 1/wt]
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* --------------------------------------------* Rural subsample regression* --------------------------------------------regress wage educ exper if metro == 0 scalar rmse_r = e(rmse)scalar df_r = e(df_r)* --------------------------------------------* Urban subsample regression* --------------------------------------------regress wage educ exper if metro == 1 scalar rmse_m = e(rmse)scalar df_m = e(df_r)* --------------------------------------------* Groupwise heteroskedastic regression using FGLS* --------------------------------------------gen rural = 1 - metrogen wt=(rmse_r^2*rural) + (rmse_m^2*metro)regress wage educ exper metro [aweight = 1/wt]
STATA Commands:
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Remark: To implement the generalized least squares estimators
described in this Section for three alternative heteroskedastic
specifications, an assumption about the form of the
heteroskedasticity is required. Using least squares with White
standard errors avoids the need to make an assumption about the
form of heteroskedasticity, but does not realize the potential
efficiency gains from generalized least squares.
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8.4.1 Residual Plots
Estimate the model using least squares and plot the least squares
residuals.
With more than one explanatory variable, plot the least squares
residuals against each explanatory variable, or against , to see if
those residuals vary in a systematic way relative to the specified
variable.
ˆiy
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8.4.2 The Goldfeld-Quandt Test
2 2
( , )2 2
ˆ
ˆ M M R R
M MN K N K
R R
F F
2 2 2 20 0: against :M R M RH H
2
2
ˆ 31.8242.09
ˆ 15.243M
R
F
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8.4.2 The Goldfeld-Quandt Test
2
2
ˆ 31.8242.09
ˆ 15.243M
R
F
* --------------------------------------------* Goldfeld Quandt test* --------------------------------------------
scalar GQ = rmse_m^2/rmse_r^2scalar crit = invFtail(df_m,df_r,.05)scalar pvalue = Ftail(df_m,df_r,GQ)scalar list GQ pvalue crit
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8.4.2 The Goldfeld-Quandt Test
21ˆ 3574.8
22ˆ 12,921.9
2221
ˆ 12,921.93.61
ˆ 3574.8F
For the food expenditure data
You should now be able to obtain this test statistic
And check whether it exceeds the critical value
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8.4.2 The Goldfeld-Quandt Test
Sort the data by income:
SORT INCOME FOOD / DESC
OLS FOOD INCOME
On the DIAGNOS command the CHOWONE= option reports the Goldfeld-Quandt test for heteroskedasticity (bottom of page 212) with a p-value for a one-sided test. The HET option reports the tests for heteroskedasticity reported on page 215.
DIAGNOS / CHOWONE=20 HET
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8.4.2 The Goldfeld-Quandt Test
SORT INCOME FOOD / DESC
OLS FOOD INCOME
On the DIAGNOS command the CHOWONE= option reports the Goldfeld-Quandt test for heteroskedasticity (bottom of page 212) with a p-value for a one-sided test. The HET option reports the tests for heteroskedasticity reported on page 215.
DIAGNOS / CHOWONE=20 HET
Of course, this option also computes the Chow test statistic for structural change (that is, tests the null of parameter stability in the two subsamples).
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8.4.2 The Goldfeld-Quandt Test
SEQUENTIAL CHOW AND GOLDFELD-QUANDT TESTS N1 N2 SSE1 SSE2 CHOW PVALUE G-Q DF1 DF2 PVALUE 20 20 0.23259E+06 64346. 0.45855 0.636 3.615 18 18 0.005 CHOW TEST - F DISTRIBUTION WITH DF1= 2 AND DF2= 36
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8.4.2 The Goldfeld-Quandt Test
SHAZAM considers that the alternative hypothesis is smaller error variance in the second subset relative to the first subset.
Some authors present the alternative as larger variance in the second subset.
Goldfeld and Quandt recommend ordering the observations by the values of one of the explanatory variables.
This can be done with the SORT command in SHAZAM. The DESC option on the SORT command should be used if it is assumed that the variance is positively related to the value of the sort variable.
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8.4.3 Testing the Variance Function
1 2 2( )i i i i K iK iy E y e x x e
2 21 2 2var( ) ( ) ( )i i i i S iSy E e h z z
1 2 2 1 2 2( ) exp( )i S iS i S iSh z z z z
21 2( ) exp ln( ) ln( )i ih z x
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8.4.3 Testing the Variance Function
1 2 2 1 2 2( )i S iS i S iSh z z z z
1 2 2 1( ) ( )i S iSh z z h
0 2 3
1 0
: 0
: not all the in are zero
S
s
H
H H
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8.4.3 Testing the Variance Function
2 21 2 2var( ) ( )i i i i S iSy E e z z
2 21 2 2( )i i i i S iS ie E e v z z v
21 2 2i i S iS ie z z v
2 2 2( 1)SN R
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8.4.3a The White Test
1 2 2 3 3( )i i iE y x x
2 22 2 3 3 4 2 5 3z x z x z x z x
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8.4.3b Testing the Food Expenditure Example
4,610,749,441 3,759,556,169SST SSE
2 1 .1846SSE
RSST
2 2 40 .1846 7.38N R
2 2 40 .18888 7.555 -value .023N R p
whitetst
Or
estat imtest, white
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Further testing in SHAZAM
DIAGNOS / HET Will yield a battery of
heteroskedasticity tests using different specifications
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SHAZAM for food exampleDIAGNOS\HET REQUIRED MEMORY IS PAR= 7 CURRENT PAR= 22480 DEPENDENT VARIABLE = FOOD 40 OBSERVATIONS REGRESSION COEFFICIENTS 10.2096426868 83.4160065402 HETEROSKEDASTICITY TESTS CHI-SQUARE D.F. P-VALUE TEST STATISTIC E**2 ON YHAT: 7.384 1 0.00658 E**2 ON YHAT**2: 7.549 1 0.00600 E**2 ON LOG(YHAT**2): 6.516 1 0.01069 E**2 ON LAG(E**2) ARCH TEST: 0.089 1 0.76544 LOG(E**2) ON X (HARVEY) TEST: 10.654 1 0.00110 ABS(E) ON X (GLEJSER) TEST: 11.466 1 0.00071 E**2 ON X TEST: KOENKER(R2): 7.384 1 0.00658 B-P-G (SSR) : 7.344 1 0.00673 E**2 ON X X**2 (WHITE) TEST: KOENKER(R2): 7.555 2 0.02288 B-P-G (SSR) : 7.514 2 0.02336
Same in SLR
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Slide 8-51Principles of Econometrics, 3rd Edition
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Slide 8-52Principles of Econometrics, 3rd Edition
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Slide 8-53Principles of Econometrics, 3rd Edition
(8A.1)
1 2i i iy x e
2( ) 0 var( ) cov( , ) 0 ( )i i i i jE e e e e i j
2 2 i ib w e
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i
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Slide 8-54Principles of Econometrics, 3rd Edition
2 2
2 2
i i
i i
E b E E w e
w E e
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Slide 8-55Principles of Econometrics, 3rd Edition
(8A.2)
2
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var cov ,
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Slide 8-56Principles of Econometrics, 3rd Edition
(8A.3)
2
2 2var( )i
bx x
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Slide 8-57Principles of Econometrics, 3rd Edition
(8B.2)
(8B.1)21 2 2i i S iS ie z z v
( ) / ( 1)
/ ( )
SST SSE SF
SSE N S
2
2 2 2
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Slide 8-58Principles of Econometrics, 3rd Edition
(8B.4)
(8B.3)2 2( 1)( 1)
/ ( ) S
SST SSES F
SSE N S
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Slide 8-59Principles of Econometrics, 3rd Edition
(8B.6)
(8B.7)
24ˆ2 e
SST SSE
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2 4
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Slide 8-60Principles of Econometrics, 3rd Edition
(8B.8)
2
2
/
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SST SSE
SST N
SSEN
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