TY - JOUR
T1 - Multi-parameter regression survival modelling with random effects
AU - Jaouimaa, Fatima Zahra
AU - Ha, Il Do
AU - Burke, Kevin
N1 - Publisher Copyright:
© 2022 Statistical Modeling Society.
PY - 2024/6
Y1 - 2024/6
N2 - We consider a parametric modelling approach for survival data where covariates are allowed to enter the model through multiple distributional parameters (i.e., scale and shape). This is in contrast with the standard convention of having a single covariate-dependent parameter, typically the scale. Taking what is referred to as a multi-parameter regression (MPR) approach to modelling has been shown to produce flexible and robust models with relatively low model complexity cost. However, it is very common to have clustered data arising from survival analysis studies, and this is something that is under developed in the MPR context. The purpose of this article is to extend MPR models to handle multivariate survival data by introducing random effects in both the scale and the shape regression components. We consider a variety of possible dependence structures for these random effects (independent, shared and correlated), and estimation proceeds using a h-likelihood approach. The performance of our estimation procedure is investigated by a way of an extensive simulation study, and the merits of our modelling approach are illustrated through applications to two real data examples, a lung cancer dataset and a bladder cancer dataset.
AB - We consider a parametric modelling approach for survival data where covariates are allowed to enter the model through multiple distributional parameters (i.e., scale and shape). This is in contrast with the standard convention of having a single covariate-dependent parameter, typically the scale. Taking what is referred to as a multi-parameter regression (MPR) approach to modelling has been shown to produce flexible and robust models with relatively low model complexity cost. However, it is very common to have clustered data arising from survival analysis studies, and this is something that is under developed in the MPR context. The purpose of this article is to extend MPR models to handle multivariate survival data by introducing random effects in both the scale and the shape regression components. We consider a variety of possible dependence structures for these random effects (independent, shared and correlated), and estimation proceeds using a h-likelihood approach. The performance of our estimation procedure is investigated by a way of an extensive simulation study, and the merits of our modelling approach are illustrated through applications to two real data examples, a lung cancer dataset and a bladder cancer dataset.
KW - correlated survival data
KW - frailty model
KW - h-likelihood
KW - multi-parameter regression
KW - parametric regression modelling
KW - survival analysis
UR - http://www.scopus.com/inward/record.url?scp=85138322030&partnerID=8YFLogxK
U2 - 10.1177/1471082X221117377
DO - 10.1177/1471082X221117377
M3 - Article
AN - SCOPUS:85138322030
SN - 1471-082X
VL - 24
SP - 245
EP - 265
JO - Statistical Modelling
JF - Statistical Modelling
IS - 3
ER -