Projects per year
Abstract
We present a detailed discussion of the theoretical properties of quadratic inference function estimators of the parameters in marginal linear regression models. We consider the effect of the choice of working correlation on fundamental questions including the existence of quadratic inference function estimators, their relationship with generalized estimating equations estimators, and the robustness and asymptotic relative efficiency of quadratic inference function and generalized estimating equations estimators. We show that the quadratic inference function estimators do not always exist and propose a way to handle this. We then show that they have unbounded influence functions and can be more or less asymptotically efficient than generalized estimating equations estimators. We also present empirical evidence to demonstrate these results. We conclude that the choice of working correlation can have surprisingly large effects.
Original language | English |
---|---|
Pages (from-to) | 891-912 |
Number of pages | 22 |
Journal | Scandinavian Journal of Statistics |
Volume | 51 |
Issue number | 2 |
Early online date | 2 Jan 2024 |
DOIs | |
Publication status | Published - Jun 2024 |
Bibliographical note
Copyright © 2024 The Authors. Scandinavian Journal of Statistics published by John Wiley & Sons Ltd on behalf of The Board of the Foundation of the Scandinavian Journal of Statistics. Version archived for private and non-commercial use with the permission of the author/s and according to publisher conditions. For further rights please contact the publisher.Keywords
- asymptotic efficiency
- generalized estimating equation estimator
- influence function
- quadratic inference function estimator
- robustness
- sensitivity curve
Fingerprint
Dive into the research topics of 'The effect of the working correlation on fitting models to longitudinal data'. Together they form a unique fingerprint.Projects
- 1 Active
-
DP23: Reliable and accurate statistical solutions for modern complex data
Welsh, A. H., Hui, F., Muller, S. & Cantoni, E.
21/02/23 → 20/02/26
Project: Research