Scholars@Duke publication: Bayesian inference for generalized linear models via quasi-posteriors.

Bayesian inference for generalized linear models via quasi-posteriors.

Publication , Journal Article

Agnoletto, D; Rigon, T; Dunson, DB

Published in: Biometrika

January 2025

Generalized linear models are routinely used for modelling relationships between a response variable and a set of covariates. The simple form of a generalized linear model comes with easy interpretability, but also leads to concerns about model misspecification impacting inferential conclusions. A popular semiparametric solution adopted in the frequentist literature is quasilikelihood, which improves robustness by only requiring correct specification of the first two moments. We develop a robust approach to Bayesian inference in generalized linear models through quasi-posterior distributions. We show that quasi-posteriors provide a coherent generalized Bayes inference method, while also approximating so-called coarsened posteriors. In so doing, we obtain new insights into the choice of coarsening parameter. Asymptotically, the quasi-posterior converges in total variation to a normal distribution and has important connections with the loss-likelihood bootstrap posterior. We demonstrate that it is also well calibrated in terms of frequentist coverage. Moreover, the loss-scale parameter has a clear interpretation as a dispersion, and this leads to a consolidated method-of-moments estimator.

Duke Scholars

Author David B. Dunson Statistical Science

Published In

Biometrika

DOI

10.1093/biomet/asaf022

EISSN

1464-3510

ISSN

0006-3444

Publication Date

January 2025

Volume

112

Issue

Start / End Page

asaf022

Related Subject Headings

Statistics & Probability
4905 Statistics
3802 Econometrics
1403 Econometrics
0104 Statistics
0103 Numerical and Computational Mathematics

Citation

APA

Chicago

ICMJE

MLA

NLM

Agnoletto, D., Rigon, T., & Dunson, D. B. (2025). Bayesian inference for generalized linear models via quasi-posteriors. Biometrika, 112(2), asaf022. https://doi.org/10.1093/biomet/asaf022

Agnoletto, D., T. Rigon, and D. B. Dunson. “Bayesian inference for generalized linear models via quasi-posteriors.” Biometrika 112, no. 2 (January 2025): asaf022. https://doi.org/10.1093/biomet/asaf022.

Agnoletto D, Rigon T, Dunson DB. Bayesian inference for generalized linear models via quasi-posteriors. Biometrika. 2025 Jan;112(2):asaf022.

Agnoletto, D., et al. “Bayesian inference for generalized linear models via quasi-posteriors.” Biometrika, vol. 112, no. 2, Jan. 2025, p. asaf022. Epmc, doi:10.1093/biomet/asaf022.

Agnoletto D, Rigon T, Dunson DB. Bayesian inference for generalized linear models via quasi-posteriors. Biometrika. 2025 Jan;112(2):asaf022.

Published In

Biometrika

DOI

10.1093/biomet/asaf022

EISSN

1464-3510

ISSN

0006-3444

Publication Date

January 2025

Volume

112

Issue

Start / End Page

asaf022

Related Subject Headings

Statistics & Probability
4905 Statistics
3802 Econometrics
1403 Econometrics
0104 Statistics
0103 Numerical and Computational Mathematics