Guardado en:
Detalles Bibliográficos
Autores principales: Oliveira, Cassius Henrique Xavier, Demarqui, Fabio Nogueira, Mayrink, Vinicius Diniz
Formato: Preprint
Publicado: 2024
Materias:
Acceso en línea:https://arxiv.org/abs/2403.07650
Etiquetas: Agregar Etiqueta
Sin Etiquetas, Sea el primero en etiquetar este registro!
_version_ 1866929592135057408
author Oliveira, Cassius Henrique Xavier
Demarqui, Fabio Nogueira
Mayrink, Vinicius Diniz
author_facet Oliveira, Cassius Henrique Xavier
Demarqui, Fabio Nogueira
Mayrink, Vinicius Diniz
contents The Yang and Prentice (YP) regression models have garnered interest from the scientific community due to their ability to analyze data whose survival curves exhibit intersection. These models include proportional hazards (PH) and proportional odds (PO) models as specific cases. However, they encounter limitations when dealing with multivariate survival data due to potential dependencies between the times-to-event. A solution is introducing a frailty term into the hazard functions, making it possible for the times-to-event to be considered independent, given the frailty term. In this study, we propose a new class of YP models that incorporate frailty. We use the exponential distribution, the piecewise exponential distribution (PE), and Bernstein polynomials (BP) as baseline functions. Our approach adopts a Bayesian methodology. The proposed models are evaluated through a simulation study, which shows that the YP frailty models with BP and PE baselines perform similarly to the generator parametric model of the data. We apply the models in two real data sets.
format Preprint
id arxiv_https___arxiv_org_abs_2403_07650
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A Class of Semiparametric Yang and Prentice Frailty Models
Oliveira, Cassius Henrique Xavier
Demarqui, Fabio Nogueira
Mayrink, Vinicius Diniz
Methodology
62N02
The Yang and Prentice (YP) regression models have garnered interest from the scientific community due to their ability to analyze data whose survival curves exhibit intersection. These models include proportional hazards (PH) and proportional odds (PO) models as specific cases. However, they encounter limitations when dealing with multivariate survival data due to potential dependencies between the times-to-event. A solution is introducing a frailty term into the hazard functions, making it possible for the times-to-event to be considered independent, given the frailty term. In this study, we propose a new class of YP models that incorporate frailty. We use the exponential distribution, the piecewise exponential distribution (PE), and Bernstein polynomials (BP) as baseline functions. Our approach adopts a Bayesian methodology. The proposed models are evaluated through a simulation study, which shows that the YP frailty models with BP and PE baselines perform similarly to the generator parametric model of the data. We apply the models in two real data sets.
title A Class of Semiparametric Yang and Prentice Frailty Models
topic Methodology
62N02
url https://arxiv.org/abs/2403.07650