A Bayesian Chi‐Squared Goodness‐of‐Fit Test for Censored Data Models |
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Authors: | Jing Cao Ann Moosman Valen E. Johnson |
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Affiliation: | 1. Department of Statistical Science, Southern Methodist University, Dallas, Texas 75275, U.S.A. email: jcao@smu.edu;2. USAF 45th SW/SEAN, Patrick Air Force Base, Florida 32925, U.S.A. email: Ann.Moosman@patrick.af.mil;3. Department of Biostatistics, U.T. M.D. Anderson Cancer Center, Houston, Texas 77030, U.S.A. email: vejohnson@mdanderson.org |
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Abstract: | Summary We propose a Bayesian chi‐squared model diagnostic for analysis of data subject to censoring. The test statistic has the form of Pearson's chi‐squared test statistic and is easy to calculate from standard output of Markov chain Monte Carlo algorithms. The key innovation of this diagnostic is that it is based only on observed failure times. Because it does not rely on the imputation of failure times for observations that have been censored, we show that under heavy censoring it can have higher power for detecting model departures than a comparable test based on the complete data. In a simulation study, we show that tests based on this diagnostic exhibit comparable power and better nominal Type I error rates than a commonly used alternative test proposed by Akritas (1988, Journal of the American Statistical Association 83, 222–230). An important advantage of the proposed diagnostic is that it can be applied to a broad class of censored data models, including generalized linear models and other models with nonidentically distributed and nonadditive error structures. We illustrate the proposed model diagnostic for testing the adequacy of two parametric survival models for Space Shuttle main engine failures. |
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Keywords: | Bayesian model diagnostic Censored data model Goodness‐of‐fit Noncentrality parameter Pivotal quantity |
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