| [1] |
Aalen, O. O., Borgan, Ø., & Gjessing, H. K. (2008). Survival and event history analysis. Springer Series in Statistics for Biology and Health. Springer. · Zbl 1204.62165 |
| [2] |
Andersen, P. K., Borgan, Ø., Gill, R. D., & Keiding, N. (1993). Statistical models based on counting processes. Springer Series in Statistics. Springer‐Verlag. · Zbl 0769.62061 |
| [3] |
Andersen, P. K., Klein, J. P., & Rosthøj, S. (2003). Generalised linear models for correlated pseudo‐observations, with applications to multi‐state models. Biometrika, 90(1), 15-27. · Zbl 1034.62062 |
| [4] |
Bouaziz, O., Lauridsen, E., & Nuel, G. (2022). Regression modelling of interval‐censored data based on the adaptive‐ridge procedure. Journal of Applied Statistics, 49(13), 3319-3343. · Zbl 07611104 |
| [5] |
Chen, P.‐Y., & Tsiatis, A. A. (2001). Causal inference on the difference of the restricted mean lifetime between two groups. Biometrics, 57(4), 1030-1038. · Zbl 1209.62267 |
| [6] |
Feng, D., & Zhao, L. (2021). Bdnnsurv: Bayesian deep neural networks for survival analysis using pseudo values. Journal of Data Science, 19(4), 542-554. |
| [7] |
Gill, R. D. (1994). Lectures on survival analysis. In Lectures on probability theory (pp. 115-241). Springer. · Zbl 0809.62028 |
| [8] |
Ginestet, P. G., Weitz, P., Rantalainen, M., & Gabriel, E. E. (2021). A deep CNN approach for predicting cumulative incidence based on pseudo‐observations. https://www.researchsquare.com/article/rs-668944/v1 |
| [9] |
Graw, F., Gerds, T. A., & Schumacher, M. (2009). On pseudo‐values for regression analysis in competing risks models. Lifetime Data Analysis, 15(2), 241-255. · Zbl 1282.62223 |
| [10] |
Groeneboom, P., & Wellner, J. A. (1992a). Information bounds and nonparametric maximum likelihood estimation. Oberwolfach Seminars, Vol. 19. Springer Science and Business Media. · Zbl 0757.62017 |
| [11] |
Groeneboom, P., & Wellner, J. A. (1992b). Information bounds and nonparametric maximum likelihood estimation, vol. 19. Springer Science & Business Media. · Zbl 0757.62017 |
| [12] |
Huang, J. (1999). Asymptotic properties of nonparametric estimation based on partly interval‐censored data. Statistica Sinica, 9, 501-519. · Zbl 0933.62038 |
| [13] |
Huang, J., & Wellner, J. A. (1995). Efficient estimation for the proportional hazards model with “case 2” interval censoring (Tech. rep. 290). University of Washington. |
| [14] |
Jacobsen, M., & Martinussen, T. (2016). A note on the large sample properties of estimators based on generalized linear models for correlated pseudo‐observations. Scandinavian Journal of Statistics, 43(3), 845-862. · Zbl 1468.62323 |
| [15] |
Jaeckel, L. A. (1972). The infinitesimal jackknife. Bell Telephone Laboratories. |
| [16] |
Lesaffre, E., Komárek, A., & Declerck, D. (2005). An overview of methods for interval‐censored data with an emphasis on applications in dentistry. Statistical Methods in Medical Research, 14(6), 539-552. · Zbl 1099.62130 |
| [17] |
Lindsey, J. (1998). A study of interval censoring in parametric regression models. Lifetime Data Analysis, 4(4), 329-354. · Zbl 0917.62085 |
| [18] |
Nygård Johansen, M., Lundbye‐Christensen, S., & Thorlund Parner, E. (2020). Regression models using parametric pseudo‐observations. Statistics in Medicine, 39(22), 2949-2961. |
| [19] |
Sabathe, C., Andersen, P. K., Helmer, C., Gerds, T. A., Jacqmin‐Gadda, H., & Joly, P. (2020). Regression analysis in an illness‐death model with interval‐censored data: A pseudo‐value approach. Statistical Methods in Medical Research, 29(3), 752-764. |
| [20] |
Sachs, M. C., Discacciati, A., Everhov, Å., Olén, O., & Gabriel, E. E. (2019). Ensemble prediction of time‐to‐event outcomes with competing risks: A case study of surgical complications in Crohn’s disease. Journal of the Statistical Society, Applied statistics, series C, 68(5), 1431-1446. |
| [21] |
Sun, J. (2007). The statistical analysis of interval‐censored failure time data. Springer Science and Business Media. |
| [22] |
Turnbull, B. W. (1976). The empirical distribution function with arbitrarily grouped, censored and truncated data. Journal of the Royal Statistical Society. Series B (Methodological), 38, 290-295. · Zbl 0343.62033 |
| [23] |
Van der Vaart, A. (1995). Efficiency of infinite dimensional m‐estimators. Statistica Neerlandica, 49(1), 9-30. · Zbl 0830.62029 |
| [24] |
Van Der Vaart, A. W., & Wellner, J. A. (1996). Weak convergence. In Weak convergence and empirical processes (pp. 16-28). Springer. · Zbl 0862.60002 |
| [25] |
Wang, X., & Schaubel, D. E. (2018). Modeling restricted mean survival time under general censoring mechanisms. Lifetime Data Analysis, 24(1), 176-199. · Zbl 1468.62416 |
| [26] |
Wellner, J. A. (1995). Interval censoring, case 2: Alternative hypotheses. Institute of Mathematical Statistics Lecture Notes‐Monograph Series, 27, 271-291. · Zbl 0876.62044 |
| [27] |
Yu, Q., Li, L., & Wong, G. Y. (2000). On consistency of the self‐consistent estimator of survival functions with interval‐censored data. Scandinavian Journal of Statistics, 27(1), 35-44. · Zbl 0938.62110 |
| [28] |
Zhang, M., & Schaubel, D. E. (2011). Estimating differences in restricted mean lifetime using observational data subject to dependent censoring. Biometrics, 67(3), 740-749. · Zbl 1226.62099 |
| [29] |
Zhang, Z., Sun, L., Zhao, X., & Sun, J. (2005). Regression analysis of interval‐censored failure time data with linear transformation models. Canadian Journal of Statistics, 33(1), 61-70. · Zbl 1063.62061 |
| [30] |
Zhao, L. (2021). Deep neural networks for predicting restricted mean survival times. Bioinformatics, 36(24), 5672-5677. |
| [31] |
Zhao, L., & Feng, D. (2019). Dnnsurv: Deep neural networks for survival analysis using pseudo values. arXiv. https://doi.org/10.48550/arXiv.1908.02337 · doi:10.48550/arXiv.1908.02337 |
| [32] |
Zhao, L., & Feng, D. (2020). Deep neural networks for survival analysis using pseudo values. IEEE Journal of Biomedical and Health Informatics, 24(11), 3308-3314. |
| [33] |
Zucker, D. M. (1998). Restricted mean life with covariates: Modification and extension of a useful survival analysis method. Journal of the American Statistical Association, 93(442), 702-709. · Zbl 1130.62362 |
