Bayesian inference on the number of recurrent events: A joint model of recurrence and survival

The number of recurrent events before a terminating event is often of interest. For instance, death terminates an individual’s process of rehospitalizations and the number of rehospitalizations is an important indicator of economic cost. We propose a model in which the number of recurrences before termination is a random variable of interest, enabling inference and prediction on it. Then, conditionally on this number, we specify a joint distribution for recurrence and survival. This novel conditional approach induces dependence between recurrence and survival, which is often present, for instance, due to frailty that affects both. Additional dependence between recurrence and survival is introduced by the specification of a joint distribution on their respective frailty terms. Moreover, through the introduction of an autoregressive model, our approach is able to capture the temporal dependence in the recurrent events trajectory. A non-parametric random effects distribution for the frailty terms accommodates population heterogeneity and allows for data-driven clustering of the subjects. A tailored Gibbs sampler involving reversible jump and slice sampling steps implements posterior inference. We illustrate our model on colorectal cancer data, compare its performance with existing approaches and provide appropriate inference on the number of recurrent events.

[1]  E. Rackow Rehospitalizations among patients in the Medicare fee-for-service program. , 2009, The New England journal of medicine.

[2]  Wesley O Johnson,et al.  Bayesian Nonparametric Nonproportional Hazards Survival Modeling , 2009, Biometrics.

[3]  Yu Zhangsheng,et al.  A joint model of recurrent events and a terminal event with a nonparametric covariate function , 2011, Statistics in medicine.

[4]  Virginie Rondeau,et al.  frailtypack: An R Package for the Analysis of Correlated Survival Data with Frailty Models Using Penalized Likelihood Estimation or Parametrical Estimation , 2012 .

[5]  Francesca Ieva,et al.  Joint modeling of recurrent events and survival: a Bayesian non-parametric approach. , 2018, Biostatistics.

[6]  S. Walker Invited comment on the paper "Slice Sampling" by Radford Neal , 2003 .

[7]  Douglas E Schaubel,et al.  Semiparametric Analysis of Correlated Recurrent and Terminal Events , 2007, Biometrics.

[8]  Joseph G Ibrahim,et al.  Current Methods for Recurrent Events Data With Dependent Termination , 2008, Journal of the American Statistical Association.

[9]  Lei Liu,et al.  Joint model of recurrent events and a terminal event with time‐varying coefficients , 2014, Biometrical journal. Biometrische Zeitschrift.

[10]  Esteve Fernandez,et al.  Sex differences in hospital readmission among colorectal cancer patients , 2005, Journal of Epidemiology and Community Health.

[11]  D. Himmelstein,et al.  The Hospital Readmissions Reduction Program. , 2016, The New England journal of medicine.

[12]  J. Sethuraman A CONSTRUCTIVE DEFINITION OF DIRICHLET PRIORS , 1991 .

[13]  Alessandra Guglielmi,et al.  Bayesian Autoregressive Frailty Models for Inference in Recurrent Events , 2019, The international journal of biostatistics.

[14]  Rahul Wadke,et al.  Atrial fibrillation. , 2022, Disease-a-month : DM.

[15]  Lei Liu,et al.  Joint frailty models for zero‐inflated recurrent events in the presence of a terminal event , 2016, Biometrics.

[16]  M. Chung,et al.  Lifestyle and Risk Factor Modification for Reduction of Atrial Fibrillation: A Scientific Statement From the American Heart Association. , 2020, Circulation.

[17]  Albert Y. Lo,et al.  On a Class of Bayesian Nonparametric Estimates: I. Density Estimates , 1984 .

[18]  P. Green,et al.  Bayesian Model-Based Clustering Procedures , 2007 .

[19]  D. Binder Bayesian cluster analysis , 1978 .

[20]  Zdravko I. Botev,et al.  Fast and accurate computation of the distribution of sums of dependent log-normals , 2017, Ann. Oper. Res..

[21]  Ming Wang,et al.  A Bayesian joint model of recurrent events and a terminal event , 2018, Biometrical journal. Biometrische Zeitschrift.

[22]  R. Waagepetersen,et al.  A Tutorial on Reversible Jump MCMC with a View toward Applications in QTL‐mapping , 2001 .

[23]  Radford M. Neal Markov Chain Sampling Methods for Dirichlet Process Mixture Models , 2000 .

[24]  O. Aalen,et al.  Statistical analysis of repeated events forming renewal processes. , 1991, Statistics in medicine.

[25]  Jens Ledet Jensen,et al.  Exponential Family Techniques for the Lognormal Left Tail , 2014, 1403.4689.

[26]  P. Green Reversible jump Markov chain Monte Carlo computation and Bayesian model determination , 1995 .

[27]  Faissal El Bouanani,et al.  Efficient Performance Evaluation for EGC, MRC and SC Receivers over Weibull Multipath Fading Channel , 2015, CrownCom.

[28]  T. Ferguson A Bayesian Analysis of Some Nonparametric Problems , 1973 .

[29]  Elham Mahmoudi,et al.  Use of electronic medical records in development and validation of risk prediction models of hospital readmission: systematic review , 2020, BMJ.

[30]  J. Qin,et al.  Semiparametric Analysis for Recurrent Event Data with Time‐Dependent Covariates and Informative Censoring , 2010, Biometrics.

[31]  L. Fenton The Sum of Log-Normal Probability Distributions in Scatter Transmission Systems , 1960 .

[32]  M. Escobar,et al.  Bayesian Density Estimation and Inference Using Mixtures , 1995 .

[33]  Joseph Futoma,et al.  A comparison of models for predicting early hospital readmissions , 2015, J. Biomed. Informatics.

[34]  Y. Bao,et al.  A joint modelling approach for clustered recurrent events and death events , 2013 .

[35]  E John Orav,et al.  Readmissions, Observation, and the Hospital Readmissions Reduction Program. , 2016, The New England journal of medicine.

[36]  Raffaele Argiento,et al.  A “Density-Based” Algorithm for Cluster Analysis Using Species Sampling Gaussian Mixture Models , 2014 .

[37]  D. Sinha,et al.  Bayesian analysis of recurrent event with dependent termination: an application to a heart transplant study , 2013, Statistics in medicine.

[38]  Amanda H. Salanitro,et al.  Risk prediction models for hospital readmission: a systematic review. , 2011, JAMA.

[39]  Gregory Y H Lip,et al.  Quality of life in patients with atrial fibrillation: a systematic review. , 2006, The American journal of medicine.

[40]  Maria De Iorio,et al.  Bayesian Joint Modelling of Recurrence and Survival: a Conditional Approach , 2020 .

[41]  E. Parner,et al.  Correcting for selection using frailty models , 2006, Statistics in medicine.

[42]  S. Asmussen,et al.  Orthonormal Polynomial Expansions and Lognormal Sum Densities , 2015, Risk and Stochastics.

[43]  Richard J. Cook,et al.  The Statistical Analysis of Recurrent Events , 2007 .

[44]  Virginie Rondeau,et al.  Joint frailty models for recurring events and death using maximum penalized likelihood estimation: application on cancer events. , 2006 .

[45]  Lei Liu,et al.  A Joint Frailty Model for Survival and Gap Times Between Recurrent Events , 2007, Biometrics.

[46]  T. Martinussen,et al.  Recurrent event survival analysis predicts future risk of hospitalization in patients with paroxysmal and persistent atrial fibrillation , 2019, PloS one.

[47]  V. Chinchilli,et al.  A time‐varying Bayesian joint hierarchical copula model for analysing recurrent events and a terminal event: an application to the Cardiovascular Health Study , 2019, Journal of the Royal Statistical Society: Series C (Applied Statistics).

[48]  R. Wolfe,et al.  Shared Frailty Models for Recurrent Events and a Terminal Event , 2004, Biometrics.

[49]  Leigh J. Halliwell,et al.  The Lognormal Random Multivariate , 2015 .