Abstract
The generalized gamma distribution statistics constitute an extensive family that contains nearly all of the most commonly used distributions including the exponential, Weibull and log normal. A saturated version of the model allows covariates having effects through all the parameters of survival time distribution. Accelerated failure-time models assume that only one parameter of the distribution depends on the covariates. We fitted both the conventional GG model and the saturated form for each of its members including the Weibull and lognormal distribution; and compared them using likelihood ratios. To compare the selected parameter distribution with log logistic distribution which is a famous distribution in survival analysis that is not included in generalized gamma family, we used the Akaike information criterion (AIC; r=l(b)-2p). All models were fitted using data for 369 women age 50 years or more, diagnosed with stage IV breast cancer in BC during 1990-1999 and followed to 2010. In both conventional and saturated parametric models, the lognormal was the best candidate among the GG family members; also, the lognormal fitted better than log-logistic distribution. By the conventional GG model, the variables "surgery", "radiotherapy", "hormone therapy", "erposneg" and interaction between "hormone therapy" and "erposneg"are significant. In the AFT model, we estimated the relative time for these variables. By the saturated GG model, similar significant variables are selected. Estimating the relative times in different percentiles of extended model illustrate the pattern in which the relative survival time change during the time. The advantage of using the generalized gamma distribution is that it facilitates estimating a model with improved fit over the standard Weibull or log- normal distributions. Alternatively, the generalized F family of distributions might be considered, of which the generalized gamma distribution is a member and also includes the commonly used log-logistic distribution.
Highlights
When a parametric survival analysis is considered, we assume that the survival time follows a given theoretical distribution and has an explicit relationship with the covariates (Lee and Wang, 2003)
We fitted the generalized gamma distribution, the extensive family that contains most of the most commonly used distribution including the exponential, Weibull and lognormal; and we extend the analysis to covariates having effects through all the parameters of survival time distribution
Most of the researches on parametric survival assume that the accelerated failure time assumption is true; that is, only one parameter of the distribution is related to covariates
Summary
When a parametric survival analysis is considered, we assume that the survival time (or a function of it) follows a given theoretical distribution (or model) and has an explicit relationship with the covariates (Lee and Wang, 2003). We fitted the generalized gamma distribution, the extensive family that contains most of the most commonly used distribution including the exponential, Weibull and lognormal; and we extend the analysis to covariates having effects through all the parameters of survival time distribution. We compared these models with the conventional AFT form of parametric models which assumes that only one parameter of distribution depends on the covariates. Fitting the extended distribution to the conventional AFT form shows how a variable can affect the survival time of breast cancer patients
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