Risk‐adjusted monitoring of time to event in the presence of long‐term survivors

The use of control charts for monitoring schemes in medical context should consider adjustments to incorporate the specific risk for each individual. Some authors propose the use of a risk-adjusted survival time cumulative sum (RAST CUSUM) control chart to monitor a time-to-event outcome, possibly right censored, using conventional survival models, which do not contemplate the possibility of cure of a patient. We propose to extend this approach considering a risk-adjusted CUSUM chart, based on a cure rate model. We consider a regression model in which the covariates affect the cure fraction. The CUSUM scores are obtained for Weibull and log-logistic promotion time model to monitor a scale parameter for nonimmune individuals. A simulation study was conducted to evaluate and compare the performance of the proposed chart (RACUF CUSUM) with RAST CUSUM, based on optimal control limits and average run length in different situations. As a result, we note that the RAST CUSUM chart is inappropriate when applied to data with a cure rate, while the proposed RACUF CUSUM chart seems to have similar performance if applied to data without a cure rate. The proposed chart is illustrated with simulated data and with a real data set of patients with heart failure treated at the Heart Institute (InCor), at the University of São Paulo, Brazil.

[1]  Charles W. Champ,et al.  The Run Length Distribution of the CUSUM with Estimated Parameters , 2004 .

[2]  R J Cook,et al.  Risk-Adjusted Monitoring of Binary Surgical Outcomes , 2001, Medical decision making : an international journal of the Society for Medical Decision Making.

[3]  Mark Jones,et al.  Risk‐adjusted survival time monitoring with an updating exponentially weighted moving average (EWMA) control chart , 2009, Statistics in medicine.

[4]  Heleno Bolfarine,et al.  Cure rate survival models with missing covariates: a simulation study , 2013 .

[5]  Rena Jie Sun,et al.  A risk-adjusted O-E CUSUM with monitoring bands for monitoring medical outcomes. , 2013, Biometrics.

[6]  Pinaki Biswas,et al.  A risk‐adjusted CUSUM in continuous time based on the Cox model , 2008, Statistics in medicine.

[7]  R Core Team,et al.  R: A language and environment for statistical computing. , 2014 .

[8]  Jan Terje Kvaløy,et al.  Risk-adjusted monitoring of time to event , 2010 .

[9]  S. Steiner,et al.  Monitoring surgical performance using risk-adjusted cumulative sum charts. , 2000, Biostatistics.

[10]  H. White Maximum Likelihood Estimation of Misspecified Models , 1982 .

[11]  William H. Woodall,et al.  The Use of Control Charts in Health-Care and Public-Health Surveillance , 2006 .

[12]  Vern T. Farewell,et al.  An overview of risk‐adjusted charts , 2004 .

[13]  Fred Spiring,et al.  Introduction to Statistical Quality Control , 2007, Technometrics.

[14]  Eugene H Blackstone,et al.  Monitoring surgical performance. , 2004, The Journal of thoracic and cardiovascular surgery.

[15]  E. S. Page CONTINUOUS INSPECTION SCHEMES , 1954 .

[16]  R. Écochard,et al.  Application of the promotion time cure model with time‐changing exposure to the study of HIV/AIDS and other infectious diseases , 2007, Statistics in medicine.

[17]  Joseph G. Ibrahim,et al.  Cure rate models: A unified approach , 2005 .

[18]  Min Zhang,et al.  The Effect of Estimation Error on Risk‐Adjusted Survival Time CUSUM Chart Performance , 2015, Qual. Reliab. Eng. Int..

[19]  Axel Gandy,et al.  Guaranteed Conditional Performance of Control Charts via Bootstrap Methods , 2011, 1111.4180.

[20]  Josemar Rodrigues,et al.  On the unification of long-term survival models , 2009 .

[21]  Landon H. Sego,et al.  Risk‐adjusted monitoring of survival times , 2009, Statistics in medicine.

[22]  V T Farewell,et al.  Use of risk-adjusted CUSUM and RSPRTcharts for monitoring in medical contexts , 2003, Statistical methods in medical research.

[23]  Joseph G. Ibrahim,et al.  A New Bayesian Model For Survival Data With a Surviving Fraction , 1999 .

[24]  G. Moustakides Optimal stopping times for detecting changes in distributions , 1986 .

[25]  Axel Gandy,et al.  An omnibus CUSUM chart for monitoring time to event data , 2013, Lifetime Data Analysis.

[26]  J. Kalbfleisch,et al.  A weighted cumulative sum (WCUSUM) to monitor medical outcomes with dependent censoring , 2014, Statistics in medicine.

[27]  V. Koshti CUMULATIVE SUM CONTROL CHART , 2022 .