The OUT= data set contains the forecast values produced by the OUTPUT statement. The following output variables can be created:
the BY variables
the ID variable
the MODEL statement dependent (endogenous) variables. These variables contain the actual values from the input data set.
FORi, numeric variables that contain the forecasts. The FORi variables contain the forecasts for the ith endogenous variable in the MODEL statement list. Forecasts are one-step-ahead predictions until the end of the data or until the observation specified by the BACK= option. Multistep forecasts can be computed after that point based on the LEAD= option.
RESi, numeric variables that contain the residual for the forecast of the ith endogenous variable in the MODEL statement list. For multistep forecast observations, the actual values are missing and the RESi variables contain missing values.
STDi, numeric variables that contain the standard deviation for the forecast of the ith endogenous variable in the MODEL statement list. The values of the STDi variables can be used to construct univariate confidence limits for the corresponding forecasts.
LCIi, numeric variables that contain the lower confidence limits for the corresponding forecasts of the ith endogenous variable in the MODEL statement list.
UCIi, numeric variables that contain the upper confidence limits for the corresponding forecasts of the ith endogenous variable in the MODEL statement list.
The OUT= data set contains the values shown in Table 36.3 and Table 36.4 for a bivariate case.
Consider the following example:
proc varmax data=simul1 noprint; id date interval=year; model y1 y2 / p=1 noint; output out=out lead=5; run;
proc print data=out(firstobs=98); run;
The output in Figure 36.66 shows part of the results of the OUT= data set for the preceding example.
Figure 36.66: OUT= Data Set
Obs | date | y1 | FOR1 | RES1 | STD1 | LCI1 | UCI1 | y2 | FOR2 | RES2 | STD2 | LCI2 | UCI2 |
---|---|---|---|---|---|---|---|---|---|---|---|---|---|
98 | 1997 | -0.58433 | -0.13500 | -0.44934 | 1.13523 | -2.36001 | 2.09002 | 0.64397 | -0.34932 | 0.99329 | 1.19096 | -2.68357 | 1.98492 |
99 | 1998 | -2.07170 | -1.00649 | -1.06522 | 1.13523 | -3.23150 | 1.21853 | 0.35925 | -0.07132 | 0.43057 | 1.19096 | -2.40557 | 2.26292 |
100 | 1999 | -3.38342 | -2.58612 | -0.79730 | 1.13523 | -4.81113 | -0.36111 | -0.64999 | -0.99354 | 0.34355 | 1.19096 | -3.32779 | 1.34070 |
101 | 2000 | . | -3.59212 | . | 1.13523 | -5.81713 | -1.36711 | . | -2.09873 | . | 1.19096 | -4.43298 | 0.23551 |
102 | 2001 | . | -3.09448 | . | 1.70915 | -6.44435 | 0.25539 | . | -2.77050 | . | 1.47666 | -5.66469 | 0.12369 |
103 | 2002 | . | -2.17433 | . | 2.14472 | -6.37792 | 2.02925 | . | -2.75724 | . | 1.74212 | -6.17173 | 0.65725 |
104 | 2003 | . | -1.11395 | . | 2.43166 | -5.87992 | 3.65203 | . | -2.24943 | . | 2.01925 | -6.20709 | 1.70823 |
105 | 2004 | . | -0.14342 | . | 2.58740 | -5.21463 | 4.92779 | . | -1.47460 | . | 2.25169 | -5.88782 | 2.93863 |