Compara mètodes
Revisa els mètodes seleccionats l'un al costat de l'altre; les files que difereixen es ressalten.
| Anàlisi de Riscos Competitius Emparellats× | Pes pesat per la probabilitat inversa (IPW / IPTW)× | |
|---|---|---|
| Camp≠ | Epidemiologia | Inferència causal |
| Família≠ | Process / pipeline | Regression model |
| Any d'origen≠ | 1999 (Fine-Gray model); extended to matched designs ~2010s | 2000 |
| Autor original≠ | Fine & Gray (subdistribution hazard model); Austin, Lee & Fine (matched competing risks framework) | Robins, Hernán & Brumback |
| Tipus≠ | Observational survival analysis with matching and competing events | Causal inference weighting estimator |
| Font seminal≠ | Fine, J. P., & Gray, R. J. (1999). A proportional hazards model for the subdistribution of a competing risk. Journal of the American Statistical Association, 94(446), 496–509. DOI ↗ | Robins, J. M., Hernán, M. A., & Brumback, B. (2000). Marginal Structural Models and Causal Inference in Epidemiology. Epidemiology, 11(5), 550-560. DOI ↗ |
| Àlies≠ | matched Fine-Gray analysis, propensity-matched competing risks, matched cause-specific hazard analysis, matched subdistribution hazard analysis | IPW, IPTW, inverse probability of treatment weighting, marginal structural model weighting |
| Relacionats≠ | 4 | 5 |
| Resum≠ | Matched competing risks analysis combines subject-level matching (e.g., propensity-score matching) with competing risks survival methods to estimate the cause-specific or subdistribution hazard of an event of interest while accounting for competing events that preclude the occurrence of that event. It is widely used in clinical and epidemiological observational studies where patients may die from causes other than the primary outcome of interest, and where treatment groups differ on baseline confounders. | Inverse Probability Weighting is a causal-inference method that assigns each observation a weight equal to the inverse of its probability of receiving the treatment it actually received. Introduced by Robins, Hernán and Brumback (2000) for marginal structural models, it builds a pseudo-population in which treatment is independent of measured confounders, balancing selection bias. |
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