The PHREG Procedure
- Overview
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Getting Started
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SyntaxPROC PHREG StatementASSESS StatementBASELINE StatementBAYES StatementBY StatementCLASS StatementCONTRAST StatementEFFECT StatementESTIMATE StatementFREQ StatementHAZARDRATIO StatementID StatementLSMEANS StatementLSMESTIMATE StatementMODEL StatementOUTPUT StatementProgramming StatementsRANDOM StatementSTRATA StatementSLICE StatementSTORE StatementTEST StatementWEIGHT Statement
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DetailsFailure Time DistributionTime and CLASS Variables UsagePartial Likelihood Function for the Cox ModelCounting Process Style of InputLeft-Truncation of Failure TimesThe Multiplicative Hazards ModelProportional Rates/Means Models for Recurrent EventsThe Frailty ModelProportional Subdistribution Hazards Model for Competing-Risks DataHazard RatiosNewton-Raphson MethodFirth’s Modification for Maximum Likelihood EstimationRobust Sandwich Variance EstimateTesting the Global Null HypothesisType 3 Tests and Joint TestsConfidence Limits for a Hazard RatioUsing the TEST Statement to Test Linear HypothesesAnalysis of Multivariate Failure Time DataModel Fit StatisticsSchemper-Henderson Predictive MeasureResidualsDiagnostics Based on Weighted ResidualsInfluence of Observations on Overall Fit of the ModelSurvivor Function EstimatorsCaution about Using Survival Data with Left TruncationEffect Selection MethodsAssessment of the Proportional Hazards ModelThe Penalized Partial Likelihood Approach for Fitting Frailty ModelsSpecifics for Bayesian AnalysisComputational ResourcesInput and Output Data SetsDisplayed OutputODS Table NamesODS Graphics
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ExamplesStepwise RegressionBest Subset SelectionModeling with Categorical PredictorsFirth’s Correction for Monotone LikelihoodConditional Logistic Regression for m:n MatchingModel Using Time-Dependent Explanatory VariablesTime-Dependent Repeated Measurements of a CovariateSurvival CurvesAnalysis of ResidualsAnalysis of Recurrent Events DataAnalysis of Clustered DataModel Assessment Using Cumulative Sums of Martingale ResidualsBayesian Analysis of the Cox ModelBayesian Analysis of Piecewise Exponential ModelAnalysis of Competing-Risks Data
- References
In fitting the Cox regression model by maximizing the partial likelihood, the estimate of an explanatory variable X will be infinite if the value of X at each uncensored failure time is the largest of all the values of X in the risk set at that time (Tsiatis, 1981; Bryson and Johnson, 1981). You can exploit this information to artificially create a data set that has the condition of monotone likelihood for the
Cox regression. The following DATA step modifies the Myeloma data in Example 73.1 to create a new explanatory variable, Contrived, which has the value 1 if the observed time is less than or equal to 65 and has the value 0 otherwise. The phenomenon of
monotone likelihood will be demonstrated in the new data set Myeloma2.
data Myeloma2; set Myeloma; Contrived= (Time <= 65); run;
For illustration purposes, consider a Cox model with three explanatory variables, one of which is the variable Contrived. The following statements invoke PROC PHREG to perform the Cox regression. The IPRINT option is specified in the MODEL statement
to print the iteration history of the optimization.
proc phreg data=Myeloma2; model Time*Vstatus(0)=LOGbun HGB Contrived / itprint; run;
The symptom of monotonity is demonstrated in Output 73.4.1. The log likelihood converges to the value of –136.56 while the coefficient for Contrived diverges. Although the Newton-Raphson optimization process did not fail, it is obvious that convergence is questionable.
A close examination of the standard errors in the "Analysis of Maximum Likelihood Estimates" table reveals a very large value
for the coefficient of Contrived. This is very typical of a diverged estimate.
Output 73.4.1: Monotone Likelihood Behavior Displayed
| Maximum Likelihood Iteration History | |||||
|---|---|---|---|---|---|
| Iter | Ridge | Log Likelihood | LogBUN | HGB | Contrived |
| 0 | 0 | -154.8579914384 | 0.0000000000 | 0.000000000 | 0.000000000 |
| 1 | 0 | -140.6934052686 | 1.9948819671 | -0.084318519 | 1.466331269 |
| 2 | 0 | -137.7841629416 | 1.6794678962 | -0.109067888 | 2.778361123 |
| 3 | 0 | -136.9711897754 | 1.7140611684 | -0.111564202 | 3.938095086 |
| 4 | 0 | -136.7078932606 | 1.7181735043 | -0.112273248 | 5.003053568 |
| 5 | 0 | -136.6164264879 | 1.7187547532 | -0.112369756 | 6.027435769 |
| 6 | 0 | -136.5835200895 | 1.7188294108 | -0.112382079 | 7.036444978 |
| 7 | 0 | -136.5715152788 | 1.7188392687 | -0.112383700 | 8.039763533 |
| 8 | 0 | -136.5671126045 | 1.7188405904 | -0.112383917 | 9.040984886 |
| 9 | 0 | -136.5654947987 | 1.7188407687 | -0.112383947 | 10.041434266 |
| 10 | 0 | -136.5648998913 | 1.7188407928 | -0.112383950 | 11.041599592 |
| 11 | 0 | -136.5646810709 | 1.7188407960 | -0.112383951 | 12.041660414 |
| 12 | 0 | -136.5646005760 | 1.7188407965 | -0.112383951 | 13.041682789 |
| 13 | 0 | -136.5645709642 | 1.7188407965 | -0.112383951 | 14.041691020 |
| 14 | 0 | -136.5645600707 | 1.7188407965 | -0.112383951 | 15.041694049 |
| 15 | 0 | -136.5645560632 | 1.7188407965 | -0.112383951 | 16.041695162 |
| 16 | 0 | -136.5645545889 | 1.7188407965 | -0.112383951 | 17.041695572 |
Next, the Firth correction was applied as shown in the following statements. Also, the profile-likelihood confidence limits for the hazard ratios are requested by using the RISKLIMITS=PL option.
proc phreg data=Myeloma2;
model Time*Vstatus(0)=LogBUN HGB Contrived /
firth risklimits=pl itprint;
run;
PROC PHREG uses the penalized likelihood maximum to obtain a finite estimate for the coefficient of Contrived (Output 73.4.2). The much preferred profile-likelihood confidence limits, as shown in (Heinze and Schemper, 2001), are also displayed.
Output 73.4.2: Convergence Obtained with the Firth Correction
| Maximum Likelihood Iteration History | |||||
|---|---|---|---|---|---|
| Iter | Ridge | Log Likelihood | LogBUN | HGB | Contrived |
| 0 | 0 | -150.7361197494 | 0.0000000000 | 0.000000000 | 0.0000000000 |
| 1 | 0 | -136.9933949142 | 2.0262484120 | -0.086519138 | 1.4338859318 |
| 2 | 0 | -134.5796594364 | 1.6770836974 | -0.109172604 | 2.6221444778 |
| 3 | 0 | -134.1572923217 | 1.7163408994 | -0.111166227 | 3.4458043289 |
| 4 | 0 | -134.1229607193 | 1.7209210332 | -0.112007726 | 3.7923555412 |
| 5 | 0 | -134.1228364805 | 1.7219588214 | -0.112178328 | 3.8174197804 |
| 6 | 0 | -134.1228355256 | 1.7220081673 | -0.112187764 | 3.8151642206 |
| Analysis of Maximum Likelihood Estimates | ||||||||
|---|---|---|---|---|---|---|---|---|
| Parameter | DF | Parameter Estimate |
Standard Error |
Chi-Square | Pr > ChiSq | Hazard Ratio |
95% Hazard Ratio Profile Likelihood Confidence Limits |
|
| LogBUN | 1 | 1.72201 | 0.58379 | 8.7008 | 0.0032 | 5.596 | 1.761 | 17.231 |
| HGB | 1 | -0.11219 | 0.06059 | 3.4279 | 0.0641 | 0.894 | 0.794 | 1.007 |
| Contrived | 1 | 3.81516 | 1.55812 | 5.9955 | 0.0143 | 45.384 | 5.406 | 6005.404 |