- Research article
- Open Access
- Open Peer Review
Comparison of imputation methods for handling missing covariate data when fitting a Cox proportional hazards model: a resampling study
BMC Medical Research Methodology volume 10, Article number: 112 (2010)
The appropriate handling of missing covariate data in prognostic modelling studies is yet to be conclusively determined. A resampling study was performed to investigate the effects of different missing data methods on the performance of a prognostic model.
Observed data for 1000 cases were sampled with replacement from a large complete dataset of 7507 patients to obtain 500 replications. Five levels of missingness (ranging from 5% to 75%) were imposed on three covariates using a missing at random (MAR) mechanism. Five missing data methods were applied; a) complete case analysis (CC) b) single imputation using regression switching with predictive mean matching (SI), c) multiple imputation using regression switching imputation, d) multiple imputation using regression switching with predictive mean matching (MICE-PMM) and e) multiple imputation using flexible additive imputation models. A Cox proportional hazards model was fitted to each dataset and estimates for the regression coefficients and model performance measures obtained.
CC produced biased regression coefficient estimates and inflated standard errors (SEs) with 25% or more missingness. The underestimated SE after SI resulted in poor coverage with 25% or more missingness. Of the MI approaches investigated, MI using MICE-PMM produced the least biased estimates and better model performance measures. However, this MI approach still produced biased regression coefficient estimates with 75% missingness.
Very few differences were seen between the results from all missing data approaches with 5% missingness. However, performing MI using MICE-PMM may be the preferred missing data approach for handling between 10% and 50% MAR missingness.
Arbitrary missingness in covariates is common in prognostic modelling studies . Many approaches for handling missing covariates when fitting a Cox proportional hazards model have been proposed such as likelihood based techniques (e.g. ) and imputation approaches (e.g. [3–5]). Likelihood based approaches generally require problem-specific programmes and therefore are not generally readily available. The best imputation approach remains unclear. A simulation study  comparing imputation procedures suggested that performing multiple imputation (MI) with regression switching (MICE) and using predictive mean matching (PMM)  may be preferred over other MI approaches or single imputation (SI) with highly skewed incomplete continuous covariates. In addition, MICE was found to produce similar results to MI using data augmentation and assuming a joint multivariate normal model or a general location model . It is not clear whether MICE with PMM would remain beneficial in other populations, where the data may be closer to the underlying assumptions of the imputation methods.
Simulation studies based on fully generated data may be criticised for being too simplistic as they often use models based on limited perceived structures of the population to generate the datasets thus not always fully reflecting a realistic population even if based on attributes from real datasets. A resampling study, however, samples data from a large empirical complete dataset. The data in the smaller samples are observations from real patients  and thus reflect the appropriate level of diversity and variability found in realistic populations . The initial dataset needs to be sufficiently large to permit numerous samples of reasonable size to be selected without seriously endangering any future assumption of independence; it can be from one large study (e.g. ) or the combination of several similar studies (e.g. ). In addition, for prognostic modelling studies, an adequate number of events, is considered necessary to provide stable conclusions within the smaller samples, with a general rule of thumb of at least ten events per covariate studied . Sampling with replacement, as in bootstrapping , replaces selected cases back into the potential selection pool after each draw . The variability between samples is similar to what would be experienced among many samples from an infinite population . Alternatively, sampling without replacement allows each case to be selected only once for a particular sample . Sampling without replacement is only suitable when the available population can be considered infinitely large, and thus representative of the true population, or when the maximum sample size required is less than 10% of the total population .
This paper presents the results of a resampling study to investigate the effects of different methods used to handle multivariate missing covariate data when fitting a Cox proportional hazards model to the full set of covariates.
Baseline data from a large randomised colorectal cancer trial [15, 16] formed the empirical population for this resampling study. Approval from the Chief Investigators of this trial was granted for use of their data in this resampling study. Data were available on a total of 7507 patients randomised between May 1994 and September 2003 to assess benefit of adjuvant chemotherapy (CT) in terms of overall survival. The collection of eight patient, tumour and planned treatment characteristics was mandatory at randomisation and hence all were complete (Table 1). The randomised treatment for each patient was unavailable for this research. The exclusion of treatment is not detrimental to this resampling study as its purpose was to assess the impact of enforcing missing data on an obtained prognostic model for all patients irrespective of the randomised treatment.
The distribution of age was unimodal but modestly skewed towards a more elderly population (skewness = -0.67). Most covariates were weakly associated with each other, but stage of disease and indication for CT were highly correlated (phi correlation coefficient (r) = -0.72), whilst site of cancer was moderately correlated with pre-operative radiotherapy (RT) (r = 0.32) and planned post-operative RT (r = 0.42).
Follow-up information was available until October 2003, by which time there had been 2652 (35%) events among the 7507 patients. For the 4855 (65%) patients with censored observations, the median length of follow-up was 6.5 years with a maximum of 9 years. The Kaplan-Meier estimated survival probability at five years was 64%.
Each dataset in the resampling study consisted of 1000 cases, which represented the average sample size from a review of published prognostic studies , and was sampled with replacement from the full colorectal dataset. The observed covariate data, survival time and event status from these sampled cases were utilised. Using simple random sampling allowed some variability in the covariate structure and the proportion of events whilst retaining, on average, the 65% censoring present in the whole of the colorectal dataset.
A total of 500 replications were performed. With this number of replications, regression coefficients for six of the eight prognostic covariates could be estimated with at least 5% accuracy , given the coefficient values and associated standard errors (SEs) from fitting a Cox proportional hazards model including all eight covariates to the whole colorectal dataset. The regression coefficients for the CT schedule and site of cancer, which were non-significant in the model using the whole colorectal dataset, could be estimated with 13% and 37% accuracy respectively with 500 replications. An unworkable number of replications of approximately 3500 and 27000 replications respectively would be required to achieve 5% accuracy, as the regression coefficients were close to zero.
Imposing missingness on multivariate data
Missingness was imposed on stage, post-operative RT and age according to seven missing data patterns (R i ,i = 1,...,7) chosen to match those observed in an ovarian cancer study  (Table 2). In practice, age is unlikely to be missing, but was used for illustrative purposes to enable the effects of a continuous covariate with missing values to be investigated. Five overall rates of missingness, denoted p 0, of 5%, 10%, 25%, 50% and 75% per case were considered to cover the range of missing data that may be seen in practice, such that p 0 cases had at least one covariate with missing values.
Missingness was imposed using a missing at random (MAR) mechanism , where the missingness was associated with shorter survival times, having cancer of the rectum or both rectum and colon, having a clear indication for CT and the observed values of stage, post-operative RT and age. This MAR mechanism resulted in a higher proportion of missing observations among older cases, those with Dukes' C stage or those planning on having post-operative RT. The missing data patterns (Table 2) were generated using the procedures proposed by van Buuren et al , summarised in additional file 1, to give a total of p 0 cases with at least one covariate with missing data.
Missing data methods and imputation model
We investigated five missing data methods, for which code is freely available within the R statistical software (Table 3). These were complete case analysis (CC), single imputation (SI) using predictive mean matching , MI fitting separate flexible additive imputation models to each incomplete covariate with predictive mean matching  (MI-aregImpute), MI using regression switching (MI-MICE) and the addition of predictive mean matching (MI-MICE-PMM) . Predictive mean matching incorporates a non-parametric element and therefore relies less on the parametric assumptions of the imputation models. The imputation models included all available covariates, the event status and the survival times after a logarithmic transformation. Ten imputations were performed for each of the MI approaches, which still gave a minimum relative efficiency compared to using an infinite number of imputations  of approximately 95% when 75% overall missingness was imposed. Each missing data method was applied to the same 500 independent samples generated.
Analysis and outcomes of interest
The applicability of the linearity assumption for age was investigated using fractional polynomials , fitted using the 'fp' function within the 'mfp' library in the R statistical software . The appropriate functional form for fitting the continuous covariate, age, in the regression model was assessed using fractional polynomials based on 500 full datasets, prior to missing data being imposed. The most commonly chosen functional form for age was linear; selected in 90% (n = 452) of samples. Therefore, age was fitted assuming a linear relationship throughout this resampling study.
A Cox proportional hazards model including all eight covariates was fitted to each dataset. The outcomes of interest were the regression coefficients, their associated SEs and the significance of each covariate in the regression model. The performance of the prognostic model in each dataset was assessed in terms of the Nagelkerke's R2 statistic , the prognostic separation D statistic  and the 2 and 5 year predicted survival probabilities.
The regression coefficient estimates were compared against the "true" values in terms of their bias, coverage and efficiency . The average regression coefficient estimates and associated empirical SE obtained from performing 20000 replications of 1000 cases with complete data were considered as the "true" values. This analysis produced SEs that were more representative of the resampling study to be performed than would have been obtained from fitting a Cox model to the available population of 7507 patients.
To incorporate the appropriate uncertainty from imputation, the results from each multiply imputed dataset were combined using Rubin's rules  after suitable transformations to approximate normality, as previously recommended . The median and inter-quartile ranges of the Nagelkerke's R2 statistics were determined for each of the 500 replicated datasets . Any deficiencies in these combining approaches should be similar across all MI methods, thus still allowing a valuable comparison. The outcomes of interest from the 500 replicated datasets were summarised using the average or median value where appropriate.
The average percentage of available covariate data items for the 1000 cases in each dataset remained relatively high for all amounts of missingness imposed; ranging from 99% with 5% missingness to 86% when 75% of cases had one or more missing data items.
Regression coefficient estimates from a Cox proportional hazards model
Using a complete case (CC) analysis produced very unstable regression coefficient estimates when there were large amounts of missingness, especially for the binary pre-operative RT covariate, which had a 95:5 split in the data. All estimates remained within the limits for unproblematic estimates  of ± 0.5SE from the true value with up to 50% missingness. Only the regression coefficient estimates for stage, pre-operative RT, post-operative RT and indication for CT (Figure 1) could be deemed problematic  with 75% missingness. However, the percentage biases were more extreme than the specified accuracy given the number of replications performed for the majority of covariates with 25% or more missingness (Figure 2). The exceptions were for stage, sex and age, where the bias remained within the specified 5% accuracy until at least 50% missingness.
After imputation, all regression coefficient estimates remained within ± 0.5SE of the true value for all levels of missingness (Figure 1). Using SI or MI-MICE-PMM produced the least biased estimates for all covariates (Figure 2). Greater percentage bias was seen for site, pre-operative RT and post-operative RT when using MI-MICE than with the other imputation approaches, producing biases greater than 5% with as little as 5% missingness. The estimates for stage and indication for CT were slightly more underestimated after MI using the "aregImpute" function (MI-aregImpute).
SE of regression coefficient estimates
The average SE estimates from the different MI approaches were similar and, as expected, fell below the inflated SE estimates after a CC analysis and in general above the underestimated SE after SI (Figure 3). The SEs after a CC analysis were extremely unreliable for pre-operative RT. With increasing levels of missingness, the SE after MI increased more for the incomplete binary covariates than for the continuous covariate; age.
Coverage was most affected using SI (Figure 4). The coverage after SI for stage and post-operative RT fell to around 90% when 25% of the cases were incomplete and below 80% with 75% missingness. The coverage of indication for CT fell to around 80% using SI with 75% missingness. The coverage for the remaining five covariates for SI and all covariates using a CC analysis or applying MI remained around 90% for all levels of missingness.
Significance of covariates in the prognostic model
The two highly prognostic covariates of age and stage remained significant in the model even with 75% missingness using any missing data method, except when performing a CC analysis where age became non-significant at the 5% level with 50% or more missingness (Figure 5). The indication for CT was of borderline prognostic ability in the resampling study, but became non-significant after a CC analysis with 10% or more missingness and after imputation with 25% or more missingness. After SI, the non-prognostic covariates of site and post-operative RT became more significant in the model with higher levels of missingness, although always remaining non-significant. In contrast, post-operative RT became less significant in the model with increasing levels of missingness for all the MI approaches.
Model performance measures
The Nagelkerke's R2 statistic increased slightly with higher levels of missingness after performing a CC analysis, suggesting that the model had better predictive ability when fewer cases were analysed (Figure 6a). In contrast, applying MI-aregImpute produced slightly lower predictive ability with increasing levels of missingness.
Similar prognostic separation values were produced after imputation for all percentages of missingness imposed (Figure 6b). However when a CC analysis was performed, the prognostic separation statistic estimates were more than ± 0.5SE from the true value when the missingness exceeded 25% missingness.
The predicted survival probabilities were unaffected by the amount of missingness or the imputation approach applied (Figure 6c and 6d). However, the predicted survival probability estimates after performing a CC analysis were consistently higher than those obtained after imputation and diverged further away as the level of missingness increased, reflecting that the incomplete cases were associated with survival.
This resampling study used a large complete empirical dataset as the population from which samples were drawn. Hence, the distributions for the survival times and the covariates reflected those seen in a real situation. Empirical evidence from an ovarian cancer study  provided realistic patterns of missingness and the relative proportions of missing values for each incomplete covariate.
This resampling study identified that, with up to 10% multivariate MAR missingness, a CC analysis provided reasonable estimates of the regression coefficients, associated SEs, significance of the covariates in the model and model performance measures. However, these measures were all adversely affected when there were 25% or more incomplete cases. These findings corroborate the results seen by others with univariate missingness (; ) and with multivariate missingness , although they obtained unbiased regression coefficients estimates with a MAR mechanism, as the mechanism that depended on outcome was imposed on the covariate with the least amount of missingness only. These results suggest that a CC analysis with 10% or less missingness is useful provided that the missing data mechanism is not highly dependent on outcome, especially at shorter survival times (; ), the sample size is reasonably large  and the hazard ratios for survival are not large . In practice, the missing data mechanism is rarely fully known and so the dependence on survival will be unclear and therefore in general CC analysis should be avoided. Caution is needed when covariates have very uneven splits with only a small proportion of cases in one group, e.g. pre-operative RT, as this can lead to very unstable regression estimates and SEs when performing a CC analysis.
Using SI with PMM produced reasonable regression coefficient estimates that were within 20% of the true value for all covariates except the non-prognostic covariate site of cancer, where the bias reached 50% with 75% missingness. The underestimation of the variability and hence narrower confidence intervals after SI, however, resulted in poor coverage with 25% or more missingness, especially for the incomplete covariates. Therefore SI is not recommended for use with more than 10% MAR multivariate missingness, as previously found (e.g. ).
This resampling study identified that standard MI methods for handling missing covariate data can be adequately used in prognostic modelling studies where the outcome is survival time with up to 50% MAR missingness within binary or continuous covariates with moderate skewness. The distribution of the incomplete covariates can affect the performance of the MI approaches, as poorer results were seen in another simulation study with highly skewed covariate data . With more than 50% MAR missingness, MI may produce biased and misleading results and therefore its use with this high level of missingness should be with caution and considered only as part of a sensitivity analysis.
MICE-PMM outperformed all other MI approaches considered in this resampling study with one moderately skewed covariate. This corroborated the findings from previous research, where MICE-PMM was also the preferred approach with highly skewed covariates (; ; ; ). MICE-PMM proved empirically to be more useful than those with stronger distributional assumptions, despite its lack of formal theoretical justifications .
The performance of the imputation approaches depends on the consistency between the imputation and analysis models , the more compatible these models are the better the imputation methods will perform. MICE-PMM imputes data from observed cases with similar predictive values and therefore relies less on any distributional assumptions of the covariates and outcome and on the consistency of the imputation and analysis models compared to other MI approaches. Any biases that may occur after including log transformed survival time and event status in the imputation model and then using a Cox proportional hazards model to analyse the imputed datasets are generally smaller when MICE-PMM is used, This has resulted in an improved performance of MICE-PMM with a censored survival outcome and highly skewed covariates  but also in this resampling study with less skewed data.
However, MICE-PMM may not remain the better approach with more normally distributed incomplete covariates or with a fully observed normally distributed outcome, where the imputation and analysis models are more compatible. In addition, care must be taken when using MICE-PMM with small samples and when covariates have rare events, as there may not be many available cases to be used as imputed values. A better approach for including survival data in an imputation model may be using the Nelson-Aalen estimate of the cumulative hazard for survival .
These results broadly confirm previous findings, but they are only based on one realistic population and one multivariate MAR missing data mechanism. Therefore the results may not be fully generalisable to alternative populations, with differing distributions, correlations and missing data mechanisms.
With 5% missingness, very few differences were seen between the results from performing a CC analysis, SI or MI using MICE-PMM. However, applying MI using MICE-PMM was found in this resampling study to be the most useful missing data approach for handling between 10% and 50% MAR missingness.
Burton A, Altman DG: Missing covariate data within cancer prognostic studies: a review of current reporting and proposed guidelines. British Journal of Cancer. 2004, 91 (1): 4-8. 10.1038/sj.bjc.6601907.
Herring AH, Ibrahim JG: Likelihood-based methods for missing covariates in the Cox proportional hazards model. Journal of the American Statistical Association. 2001, 96 (453): 292-302. 10.1198/016214501750332866.
Rubin DB: Multiple Imputation for Nonresponse in Surveys. 1987, New York: John Wiley and Sons
Schafer JL: Analysis of Incomplete Multivariate Data. 1997, New York: Chapman and Hall
van Buuren S, Boshuizen HC, Knook DL: Multiple imputation of missing blood pressure covariates in survival analysis. Statistics in Medicine. 1999, 18 (6): 681-694. 10.1002/(SICI)1097-0258(19990330)18:6<681::AID-SIM71>3.0.CO;2-R.
Marshall A, Altman D, Royston P, Holder R: Comparison of techniques for handling missing covariate data within prognostic modelling studies: a simulation study. BMC Med Res Methodol. 2010, 10 (1): 7-10.1186/1471-2288-10-7.
Murphy SP, Perera T: Successes and failures in UK/US development of simulation. Simulation Practice and Theory. 2002, 9: 333-348. 10.1016/S0928-4869(01)00048-9.
Schafer J, Ezzati-Rice T, Johnson W, Khare M, Little R, Rubin D: The NHANES III multiple imputation project. Proceedings of the Survey Research Methods Section of the American Statistical Association. Chicago, Illnois. 1996, 28-37.
Schafer JL, Olsen MK: Modelling and imputation of semicontinuous survey variables. 2000, The Methodology Center, Penn State University, USA
Ezzati-Rice T, Johnson W, Khare M, Little R, Rubin D, Schafer J: A simulation study to evaluate the performance of model-based multiple imputations in NCHS health examination surveys. Proceedings of the Bureau of the Census Annual Research Conference. Washington, DC. 1995, 257-266.
Concato J, Peduzzi P, Holford TR, Feinstein AR: Importance of events per independent variable in proportional hazards analysis. I. Background, goals, and general strategy. Journal of Clinical Epidemiology. 1995, 48 (12): 1495-1501. 10.1016/0895-4356(95)00510-2.
Efron B, Tibshirani RJ: An introduction to the bootstrap. 1993, London: Chapman and Hall/CRC
Xia Z: Sampling with and without replacement. Encyclopedia of Biostatistics. Edited by: Armitage P, Colton T. 1998, New York: John Wiley & Sons, 3944-3945.
Deeks JJ, Dinnes J, D'Amico R, Sowden AJ, Sakarovitch C, Song F, Petticrew M, Altman DG: Empirical evaluation of the ability of case-mix adjustment methodologies to control for selection bias. Health Technology Assessment. 2003, 7 (27): 63-86.
Gray RG, Kerr DJ, McConkey CC, Williams NS, Hills RK, On behalf of the Quasar Collaborative group: Comparison of flurouracil with additional levamisole, higher-dose folinic acid, or both, as adjuvant chemotherapy for colorectal cancer: a randomised trial. Lancet. 2000, 355 (9215): 1588-1596. 10.1016/S0140-6736(00)02214-5.
Quasar Collaborative Group, Gray R, Barnwell J, McConkey C, Hills R, Williams N, Kerr D: Adjuvant chemotherapy versus observation in patients with colorectal cancer: a randomised study. Lancet. 2007, 370 (9604): 2020-2029. 10.1016/S0140-6736(07)61866-2.
Burton A, Altman DG, Royston P, Holder RL: The design of simulation studies in medical statistics. Statistics in Medicine. 2006, 25 (24): 4279-4292. 10.1002/sim.2673.
Clark TG, Stewart ME, Altman DG, Gabra H, Smyth JF: A prognostic model for ovarian cancer. British Journal of Cancer. 2001, 85 (7): 944-952. 10.1054/bjoc.2001.2030.
Little RJA, Rubin DB: Statistical Analysis with Missing Data. 2002, New York: John Wiley and Sons, Second
van Buuren S, Brand JPL, Groothuis-Oudshoorn CGM, Rubin DB: Fully conditional specification in multivariate imputation. Journal of Statistical Computation and Simulation. 2006, 76 (12): 1049-1064. 10.1080/10629360600810434.
Harrell FE: Hmisc: Harrell Miscellaneous library for R statistical software. R package 2. 2004, 2-3.
Rubin DB: Multiple Imputation for Nonresponse in Surveys. 2004, New York: John Wiley and Sons
Royston P, Altman DG: Regression using fractional polynomials of continuous covariates: parsimonious parametric modelling. Journal of the Royal Statistical Society Series C-Applied Statistics. 1994, 43 (3): 429-467.
Ambler G, Brenner A: mfp: Multiple Fractional Polynomials library. R package version 1.2.2. 2004
Harrell FE: Regression Modeling Strategies with Applications to Linear Models, Logistic Regression, and Survival Analysis. 2001, New York: Springer-Verlag
Royston P, Sauerbrei W: A new measure of prognostic separation in survival data. Statistics in Medicine. 2004, 23 (5): 723-748. 10.1002/sim.1621.
Schafer JL, Graham JW: Missing data: our view of the state of the art. Psychological Methods. 2002, 7 (2): 147-177. 10.1037/1082-989X.7.2.147.
Marshall A, Altman D, Holder R, Royston P: Combining estimates of interest in prognostic modelling studies after multiple imputation: current practice and guidelines. BMC Medical Research Methodology. 2009, 9 (1): 57-10.1186/1471-2288-9-57.
Clark TG, Altman DG: Developing a prognostic model in the presence of missing data. an ovarian cancer case study. Journal of Clinical Epidemiology. 2003, 56 (1): 28-37. 10.1016/S0895-4356(02)00539-5.
Barzi F, Woodward M: Imputations of missing values in practice: Results from imputations of serum cholesterol in 28 cohort studies. American Journal of Epidemiology. 2004, 160 (1): 34-45. 10.1093/aje/kwh175.
Little RJ: Missing data. Encyclopedia of Biostatistics. Edited by: Armitage P, Colton T. 1998, New York: John Wiley and Sons, 2622-2635.
Vach W, Blettner M: Missing data in epidemiologic studies. Encyclopedia of Biostatistics. Edited by: Armitage P, Colton T. 1998, New York: John Wiley & Sons, 2641-2654.
Demissie S, LaValley MP, Horton NJ, Glynn RJ, Cupples LA: Bias due to missing exposure data using complete-case analysis in the proportional hazards regression model. Statistics in Medicine. 2003, 22 (4): 545-557. 10.1002/sim.1340.
Schenker N, Taylor JMG: Partially parametric techniques for multiple imputation. Computational Statistics & Data Analysis. 1996, 22 (4): 425-446.
Durrant GB: Imputation methods for handling item-nonresponse in the social sciences: a methodological review. 2005, Southampton: University of Southampton
Yu LM, Burton A, Rivero-Arias O: Evaluation of software for multiple imputation of semi-continuous data. Statistical Methods in Medical Research. 2007, 16 (3): 243-258. 10.1177/0962280206074464.
Kenward MG, Carpenter J: Multiple imputation: current perspectives. Statistical Methods in Medical Research. 2007, 16 (3): 199-218. 10.1177/0962280206075304.
Meng XL: Multiple-imputation inferences with uncongenial sources of input. Statistical Science. 1994, 9 (4): 538-558.
White I, Royston P: Imputing missing covariate values for the Cox model. Statistics in Medicine. 2009, 28 (15): 1982-1998. 10.1002/sim.3618.
van Buuren S, Oudshoorn CGM: mice: Multivariate Imputation by Chained Equations library. R package version 1.13.1. 2005
The pre-publication history for this paper can be accessed here:http://0-www.biomedcentral.com.brum.beds.ac.uk/1471-2288/10/112/prepub
Andrea Marshall (nee Burton) was supported by a Cancer Research UK project grant. Douglas G Altman is supported by Cancer Research UK.
The authors declare that they have no competing interests.
AM participated in the design, coordination and analysis of this study and drafted the manuscript. DGA participated in the design of the study, the interpretation of the data and helped in the writing of the manuscript. RH advised on the design and interpretation of the study, and participated in the revision of the manuscript. All authors have read and approved the final manuscript.
Electronic supplementary material
Authors’ original submitted files for images
About this article
Cite this article
Marshall, A., Altman, D.G. & Holder, R.L. Comparison of imputation methods for handling missing covariate data when fitting a Cox proportional hazards model: a resampling study. BMC Med Res Methodol 10, 112 (2010) doi:10.1186/1471-2288-10-112
- Multiple Imputation
- Complete Case
- Regression Coefficient Estimate
- Regression Switching
- Single Imputation