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The TSCSREG Procedure |

Next, specify the linear regression model with a MODEL statement. The MODEL statement in PROC TSCSREG is specified like the MODEL statement in other SAS regression procedures: the dependent variable is listed first, followed by an equal sign, followed by the list of regressor variables.

proc tscsreg data=a; id state date; model y = x1 x2; run;

The reason for using PROC TSCSREG instead of other SAS regression procedures is that you can incorporate a model for the structure of the random errors. It is important to consider what kind of error structure model is appropriate for your data and to specify the corresponding option in the MODEL statement.

The error structure options supported by the TSCSREG procedure are FIXONE, FIXTWO, RANONE, RANTWO, FULLER, PARKS, and DASILVA. See the "Details" section later in this chapter for more information about these methods and the error structures they assume.

By default, the Fuller-Battese method is used. Thus, the preceding example is the same as specifying the FULLER option, as shown in the following statements:

proc tscsreg data=a; id state date; model y = x1 x2 / fuller; run;

You can specify more than one error structure option in the MODEL statement; the analysis is repeated using each method specified. You can use any number of MODEL statements to estimate different regression models or estimate the same model using different options. See Example 20.1 in the section "Examples."

In order to aid in model specification within this class of models,
the procedure provides two specification test statistics. The first
is an *F* statistic that tests the null hypothesis that the fixed effects
parameters are all zero. The second is a Hausman *m*-statistic that
provides information about the appropriateness of the random effects
specification. It is based on the idea that, under the null hypothesis
of no correlation between the effects variables and the regressors,
OLS and GLS are consistent, but OLS is inefficient. Hence, a test can be
based on the result that the covariance of an efficient estimator
with its difference from an inefficient estimator is zero. Rejection
of the null hypothesis might suggest that the fixed effects model is more
appropriate.

The procedure also provides the Buse R-squared measure, which is the most appropriate goodness-of-fit measure for models estimated using GLS. This number is interpreted as a measure of the proportion of the transformed sum of squares of the dependent variable that is attributable to the influence of the independent variables. In the case of OLS estimation, the Buse R-squared measure is equivalent to the usual R-squared measure.

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