| Literature DB >> 34898761 |
Federico Ferrari1, David B Dunson1.
Abstract
This article is motivated by the problem of inference on interactions among chemical exposures impacting human health outcomes. Chemicals often co-occur in the environment or in synthetic mixtures and as a result exposure levels can be highly correlated. We propose a latent factor joint model, which includes shared factors in both the predictor and response components while assuming conditional independence. By including a quadratic regression in the latent variables in the response component, we induce flexible dimension reduction in characterizing main effects and interactions. We propose a Bayesian approach to inference under this Factor analysis for INteractions (FIN) framework. Through appropriate modifications of the factor modeling structure, FIN can accommodate higher order interactions. We evaluate the performance using a simulation study and data from the National Health and Nutrition Examination Survey (NHANES). Code is available on GitHub.Entities:
Keywords: Bayesian Modeling; Chemical Mixtures; Correlated Exposures; Quadratic regression; Statistical Interactions
Year: 2020 PMID: 34898761 PMCID: PMC8654343 DOI: 10.1080/01621459.2020.1745813
Source DB: PubMed Journal: J Am Stat Assoc ISSN: 0162-1459 Impact factor: 5.033