Direct modeling of regression effects for transition probabilities in the progressive illness–death model
Abstract
In this work, we present direct regression analysis for the transition probabilities in the possibly non‐Markov progressive illness–death model. The method is based on binomial regression, where the response is the indicator of the occupancy for the given state along time. Randomly weighted score equations that are able to remove the bias due to censoring are introduced. By solving these equations, one can estimate the possibly time‐varying regression coefficients, which have an immediate interpretation as covariate effects on the transition probabilities. The performance of the proposed estimator is investigated through simulations. We apply the method to data from the Registry of Systematic Lupus Erythematosus RELESSER, a multicenter registry created by the Spanish Society of Rheumatology. Specifically, we investigate the effect of age at Lupus diagnosis, sex, and ethnicity on the probability of damage and death along time. Copyright © 2017 John Wiley & Sons, Ltd.
Citing Literature
Number of times cited according to CrossRef: 3
- Dennis Dobler, Andrew Titman, Dynamic inference for non‐Markov transition probabilities under random right censoring, Scandinavian Journal of Statistics, 10.1111/sjos.12443, 47, 2, (572-586), (2020).
- Luís Meira‐Machado, Marta Sestelo, Estimation in the progressive illness‐death model: A nonexhaustive review, Biometrical Journal, 10.1002/bimj.201700200, 61, 2, (245-263), (2018).
- Jacobo Uña‐Álvarez, Micha Mandel, Nonparametric estimation of transition probabilities for a general progressive multi‐state model under cross‐sectional sampling, Biometrics, 10.1111/biom.12874, 74, 4, (1203-1212), (2018).
