Shared inverse Gaussian frailty models based on additive hazards

被引:11
作者
Hanagal, David D. [1 ]
Pandey, Arvind [2 ]
机构
[1] Univ Pune, Dept Stat, Pune 411007, Maharashtra, India
[2] Pachhunga Univ Coll, Dept Stat, Aizawl, Mizoram, India
来源
COMMUNICATIONS IN STATISTICS-THEORY AND METHODS | 2017年 / 46卷 / 22期
关键词
Additive hazard rate; Bayesian model comparison; Exponential power distribution; Generalized log-logistic distribution; Generalized Weibull distribution; Inverse Gaussian frailty; MCMC; Shared frailty; BIVARIATE SURVIVAL-DATA; EXPONENTIATED WEIBULL FAMILY; BAYES FACTORS; HETEROGENEITY; DISTRIBUTIONS; REGRESSION; ASSOCIATION;
D O I
10.1080/03610926.2016.1260740
中图分类号
O21 [概率论与数理统计]; C8 [统计学];
学科分类号
020208 ; 070103 ; 0714 ;
摘要
Frailty models are used in the survival analysis to account for the unobserved heterogeneity in individual risks to disease and death. To analyze the bivariate data on related survival times (e.g., matched pairs experiments, twin, or family data), the shared frailty models were suggested. These models are based on the assumption that frailty acts multiplicatively to hazard rate. In this article, we assume that frailty acts additively to hazard rate. We introduce the shared inverse Gaussian frailty models with three different baseline distributions, namely the generalized log-logistic, the generalized Weibull, and exponential power distribution. We introduce the Bayesian estimation procedure using Markov chain Monte Carlo technique to estimate the parameters involved in these models. We apply these models to a real-life bivariate survival dataset of McGilchrist and Aisbett (1991) related to the kidney infection data, and a better model is suggested for the data.
引用
收藏
页码:11143 / 11162
页数:20
相关论文
共 55 条
[1]   A LINEAR-REGRESSION MODEL FOR THE ANALYSIS OF LIFE TIMES [J].
AALEN, OO .
STATISTICS IN MEDICINE, 1989, 8 (08) :907-925
[2]  
Akaike H., 1992, 2 INT S INF THEOR, P610, DOI [10.1007/978-1-4612-1694-0, 10.1007/978-1-4612-0919-538, 10.1007/978-1-4612-0919-5_38, 10.1007/978-0-387-98135-2, DOI 10.1007/978-1-4612-0919-538]
[3]  
[Anonymous], 1999, The Inverse Gaussian Distribution: Statistical Theory and Applications
[4]  
[Anonymous], 1995, Federal Reserve Bank of Minneapolis, DOI DOI 10.21034/SR.148
[5]  
BACON RW, 1993, OXFORD B ECON STAT, V55, P355
[6]   A NOTE ON ELECTRICAL NETWORKS AND THE INVERSE GAUSSIAN DISTRIBUTION [J].
BARNDORFFNIELSEN, OE .
ADVANCES IN APPLIED PROBABILITY, 1994, 26 (01) :63-67
[7]   ADDITIVE HAZARDS MODEL WITH TIME-VARYING REGRESSION COEFFICIENTS [J].
Bin, Huang .
ACTA MATHEMATICA SCIENTIA, 2010, 30 (04) :1318-1326
[8]  
Chen M-H., 2001, Bayesian Survival Analysis
[9]  
Chhikara R.S., 1986, INVERSE GAUSSIAN DIS
[10]   MULTIVARIATE GENERALIZATIONS OF THE PROPORTIONAL HAZARDS MODEL [J].
CLAYTON, D ;
CUZICK, J .
JOURNAL OF THE ROYAL STATISTICAL SOCIETY SERIES A-STATISTICS IN SOCIETY, 1985, 148 :82-117
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