Compară metode

Examinează metodele selectate una lângă alta; rândurile care diferă sunt evidențiate.

	Analiza Bayesiană a Riscurilor Concurente ×	Model de supraviețuire multi-stadiu ×
Domeniu≠	Epidemiologie	Supraviețuire
Familie≠	Process / pipeline	Survival analysis
Anul apariției≠	1980s–2000s (classical CR: 1970s; Bayesian extension: 1990s–2000s)	1978
Autorul original≠	Various; Bayesian formulation advanced by Gelfand, Dey, Larson, and Dinse among others	Andersen, P.K. & Keiding, N. (foundational framework); popularised by Putter, Fiocco & Geskus (2007)
Tip≠	Bayesian survival/time-to-event model	Semi-parametric hazard model
Sursa seminală≠	Larson, M. G., & Dinse, G. E. (1985). A mixture model for the regression analysis of competing risks data. Applied Statistics, 34(3), 201–211. DOI ↗	Putter, H., Fiocco, M. & Geskus, R.B. (2007). Tutorial in Biostatistics: Competing Risks and Multi-State Models. Statistics in Medicine, 26(11), 2389–2430. DOI ↗
Denumiri alternative≠	Bayesian cause-specific hazard model, Bayesian subdistribution hazard model, BCRA, Bayesian cumulative incidence analysis	illness-death model, multi-state transition model, Çok Durumlu Model (Multi-State / Illness-Death)
Înrudite≠	3	4
Rezumat≠	Bayesian competing risks analysis is a time-to-event method for settings where subjects can fail from more than one mutually exclusive cause — such as death from cancer versus death from cardiovascular disease — and prior knowledge or small-sample uncertainty makes a Bayesian framework advantageous. It extends classical competing risks models (cause-specific hazards and cumulative incidence functions) by placing probability distributions over unknown parameters and updating those distributions with observed data, yielding full posterior inference for each failure type.	The multi-state model is a generalised survival framework, formalised in the work of Andersen and Keiding and brought to wide biostatistical practice by Putter, Fiocco and Geskus (2007), that models individuals moving through multiple distinct health states — for example, healthy, ill and dead — over time. A separate hazard function is estimated for each possible transition, and transition probabilities are recovered via the product-integral of the cumulative transition intensities.
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