Bayesian accrual modeling and prediction in multicenter clinical trials with varying center activation times

Investigators who manage multicenter clinical trials need to pay careful attention to patterns of subject accrual, and the prediction of activation time for pending centers is potentially crucial for subject accrual prediction. We propose a Bayesian hierarchical model to predict subject accrual for multicenter clinical trials in which center activation times vary. We define center activation time as the time at which a center can begin enrolling patients in the trial. The difference in activation times between centers is assumed to follow an exponential distribution, and the model of subject accrual integrates prior information for the study with actual enrollment progress. We apply our proposed Bayesian multicenter accrual model to two multicenter clinical studies. The first is the PAIN-CONTRoLS study, a multicenter clinical trial with a goal of activating 40 centers and enrolling 400 patients within 104 weeks. The second is the HOBIT trial, a multicenter clinical trial with a goal of activating 14 centers and enrolling 200 subjects within 36 months. In summary, the Bayesian multicenter accrual model provides a prediction of subject accrual while accounting for both center- and individual patient-level variation.

[1]  Ignacio Ferreira-González,et al.  Prevalence, characteristics, and publication of discontinued randomized trials. , 2014, JAMA.

[2]  Byron J Gajewski,et al.  Building efficient comparative effectiveness trials through adaptive designs, utility functions, and accrual rate optimization: finding the sweet spot , 2015, Statistics in medicine.

[3]  Yi Deng,et al.  Bayesian modeling and prediction of accrual in multi-regional clinical trials , 2017, Statistical methods in medical research.

[4]  Byron J Gajewski,et al.  On the Existence of Constant Accrual Rates in Clinical Trials and Direction for Future Research. , 2012, International journal of statistics and probability.

[5]  Byron J Gajewski,et al.  Modeling and validating Bayesian accrual models on clinical data and simulations using adaptive priors , 2015, Statistics in medicine.

[6]  Jon Nicholl,et al.  A reinvestigation of recruitment to randomised, controlled, multicenter trials: a review of trials funded by two UK funding agencies , 2013, Trials.

[7]  S Senn,et al.  Some controversies in planning and analysing multi-centre trials. , 1998, Statistics in medicine.

[8]  Byron J Gajewski,et al.  Predicting accrual in clinical trials with Bayesian posterior predictive distributions , 2008, Statistics in medicine.

[9]  Byron J Gajewski,et al.  Bayesian hierarchical EMAX model for dose‐response in early phase efficacy clinical trials , 2019, Statistics in medicine.

[10]  Sandrine Andrieu,et al.  How to deal with the Poisson-gamma model to forecast patients' recruitment in clinical trials when there are pauses in recruitment dynamic? , 2017, Contemporary clinical trials communications.

[11]  R. Silbergleit,et al.  Hyperbaric oxygen brain injury treatment (HOBIT) trial: a multifactor design with response adaptive randomization and longitudinal modeling , 2016, Pharmaceutical statistics.

[12]  V. Fedorov,et al.  Design of multi‐centre trials with binary response , 2006, Statistics in medicine.

[13]  Vladimir V Anisimov,et al.  Modelling, prediction and adaptive adjustment of recruitment in multicentre trials , 2007, Statistics in medicine.

[14]  Daniel F Heitjan,et al.  Real-time prediction of clinical trial enrollment and event counts: A review. , 2015, Contemporary clinical trials.

[15]  M. Pasnoor,et al.  A Bayesian comparative effectiveness trial in action: developing a platform for multisite study adaptive randomization , 2016, Trials.

[16]  Accrual Prediction Program: A web-based clinical trials tool for monitoring and predicting accrual for early-phase cancer studies , 2019, Clinical trials.

[17]  Shuangge Ma,et al.  Bayesian accrual prediction for interim review of clinical studies: open source R package and smartphone application , 2016, Trials.

[18]  V. Anisimov Statistical Modeling of Clinical Trials (Recruitment and Randomization) , 2011 .