The LIFEREG Procedure

Modeling Right-Censored Failure Time Data

The following example demonstrates how you can use the LIFEREG procedure to fit a model to right-censored failure time data.

Suppose you conduct a study of two headache pain relievers. You divide patients into two groups, with each group receiving a different type of pain reliever. You record the time taken (in minutes) for each patient to report headache relief. Because some of the patients never report relief for the entire study, some of the observations are censored.

The following DATA step creates the SAS data set headache:

data Headache;
   input Minutes Group Censor @@;
   datalines;
11  1  0   12  1  0   19  1  0   19  1  0
19  1  0   19  1  0   21  1  0   20  1  0
21  1  0   21  1  0   20  1  0   21  1  0
20  1  0   21  1  0   25  1  0   27  1  0
30  1  0   21  1  1   24  1  1   14  2  0
16  2  0   16  2  0   21  2  0   21  2  0
23  2  0   23  2  0   23  2  0   23  2  0
25  2  1   23  2  0   24  2  0   24  2  0
26  2  1   32  2  1   30  2  1   30  2  0
32  2  1   20  2  1
;

The data set Headache contains the variable Minutes, which represents the reported time to headache relief; the variable Group, the group to which the patient is assigned; and the variable Censor, a binary variable indicating whether the observation is censored. Valid values of the variable Censor are 0 (no) and 1 (yes). Figure 51.1 shows the first five records of the data set Headache.

Figure 51.1: Headache Data

Obs Minutes Group Censor
1 11 1 0
2 12 1 0
3 19 1 0
4 19 1 0
5 19 1 0


The following statements invoke the LIFEREG procedure:

proc lifereg data=Headache;
   class Group;
   model Minutes*Censor(1)=Group;
   output out=New cdf=Prob;
run;

The CLASS statement specifies the variable Group as the classification variable. The MODEL statement syntax indicates that the response variable Minutes is right censored when the variable Censor takes the value 1. The MODEL statement specifies the variable Group as the single explanatory variable. Because the MODEL statement does not specify the DISTRIBUTION= option, the LIFEREG procedure fits the default type 1 extreme-value distribution by using $\log (\Variable{Minutes})$ as the response. This is equivalent to fitting the Weibull distribution.

The OUTPUT statement creates the output data set New. In addition to containing the variables in the original data set Headache, the SAS data set New also contains the variable Prob. This new variable is created by the CDF= option to contain the estimates of the cumulative distribution function evaluated at the observed response. The results of this analysis are displayed in the following figures.

Figure 51.2: Model Fitting Information from the LIFEREG Procedure

The LIFEREG Procedure

Model Information
Data Set WORK.HEADACHE
Dependent Variable Log(Minutes)
Censoring Variable Censor
Censoring Value(s) 1
Number of Observations 38
Noncensored Values 30
Right Censored Values 8
Left Censored Values 0
Interval Censored Values 0
Number of Parameters 3
Name of Distribution Weibull
Log Likelihood -9.37930239

Class Level Information
Name Levels Values
Group 2 1 2


Figure 51.2 displays the class level information and model fitting information. There are 30 uncensored observations and 8 right-censored observations. The log likelihood for the Weibull distribution is –9.3793. The log-likelihood value can be used to compare the goodness of fit for nested models with different covariates, but with the same distribution.

Figure 51.3: Model Fit Statistics from the LIFEREG Procedure

Fit Statistics
-2 Log Likelihood 18.759
AIC (smaller is better) 24.759
AICC (smaller is better) 25.464
BIC (smaller is better) 29.671

Fit Statistics (Unlogged Response)
-2 Log Likelihood 199.747
Weibull AIC (smaller is better) 205.747
Weibull AICC (smaller is better) 206.453
Weibull BIC (smaller is better) 210.660


Figure 51.3 displays fit statistics for the model. The Fit Statistics table displays statistics based on the maximum extreme-value log likelihood fit by using $\log (\Variable{Minutes})$ as the response. These statistics are useful in comparing the fit of a different model when the fit criteria from the model that you compare is also based on the log likelihood using $\log (\Variable{Minutes})$ as the response. The Fit Statistics (Unlogged Response) table is based on the maximum Weibull log likelihood using Minutes as the response. The AIC, BIC, and AICC statistics in this table can be used to compare models with different covariates, in addition to models with different distributions, as long as the fit statistics for the models that you compare use Minutes as the response.

Figure 51.4: Model Parameter Estimates from the LIFEREG Procedure

Analysis of Maximum Likelihood Parameter Estimates
Parameter   DF Estimate Standard Error 95% Confidence Limits Chi-Square Pr > ChiSq
Intercept   1 3.3091 0.0589 3.1938 3.4245 3161.70 <.0001
Group 1 1 -0.1933 0.0786 -0.3473 -0.0393 6.05 0.0139
Group 2 0 0.0000 . . . . .
Scale   1 0.2122 0.0304 0.1603 0.2809    
Weibull Shape   1 4.7128 0.6742 3.5604 6.2381    


The table of parameter estimates is displayed in Figure 51.4. Both the intercept and the slope parameter for the variable group are significantly different from 0 at the 0.05 level. Because the variable group has only one degree of freedom, parameter estimates are given for only one level of the variable group (group=1). However, the estimate for the intercept parameter provides a baseline for group=2.

The resulting model is as follows:

\[  \log (\Variable{minutes})= \left\{  \begin{array}{ll} 3.30911843 - 0.1933025 &  \mr {for~ ~ ~  }\Variable{group}=1\\ 3.30911843 &  \mr {for~ ~ ~  }\Variable{group}=2 \end{array} \right.  \]

Note that the Weibull shape parameter for this model is the reciprocal of the extreme-value scale parameter estimate shown in Figure 51.4 ($1/0.21219 = 4.7128$).

The following statements produce a graph of the cumulative distribution values versus the variable Minutes.

proc sgplot data=New;
   scatter x=Minutes y=Prob / group=Group;
   discretelegend;
run;

Figure 51.5 displays the estimated cumulative distribution function values contained in the output data set New for each group.

Figure 51.5: Plot of the Estimated Cumulative Distribution Function

Plot of the Estimated Cumulative Distribution Function