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Autori principali: Camerlenghi, Federico, Corradin, Riccardo, Ongaro, Andrea
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2410.06394
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author Camerlenghi, Federico
Corradin, Riccardo
Ongaro, Andrea
author_facet Camerlenghi, Federico
Corradin, Riccardo
Ongaro, Andrea
contents Nested nonparametric processes are vectors of random probability measures widely used in the Bayesian literature to model the dependence across distinct, though related, groups of observations. These processes allow a two-level clustering, both at the observational and group levels. Several alternatives have been proposed starting from the nested Dirichlet process by Rodríguez et al. (2008). However, most of the available models are neither computationally efficient or mathematically tractable. In the present paper, we aim to introduce a range of nested processes that are mathematically tractable, flexible, and computationally efficient. Our proposal builds upon Compound Random Measures, which are vectors of dependent random measures early introduced by Griffin and Leisen (2017). We provide a complete investigation of theoretical properties of our model. In particular, we prove a general posterior characterization for vectors of Compound Random Measures, which is interesting per se and still not available in the current literature. Based on our theoretical results and the available posterior representation, we develop the first Ferguson & Klass algorithm for nested nonparametric processes. We specialize our general theorems and algorithms in noteworthy examples. We finally test the model's performance on different simulated scenarios, and we exploit the construction to study air pollution in different provinces of an Italian region (Lombardy). We empirically show how nested processes based on Compound Random Measures outperform other Bayesian competitors.
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id arxiv_https___arxiv_org_abs_2410_06394
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Nested Compound Random Measures
Camerlenghi, Federico
Corradin, Riccardo
Ongaro, Andrea
Methodology
Nested nonparametric processes are vectors of random probability measures widely used in the Bayesian literature to model the dependence across distinct, though related, groups of observations. These processes allow a two-level clustering, both at the observational and group levels. Several alternatives have been proposed starting from the nested Dirichlet process by Rodríguez et al. (2008). However, most of the available models are neither computationally efficient or mathematically tractable. In the present paper, we aim to introduce a range of nested processes that are mathematically tractable, flexible, and computationally efficient. Our proposal builds upon Compound Random Measures, which are vectors of dependent random measures early introduced by Griffin and Leisen (2017). We provide a complete investigation of theoretical properties of our model. In particular, we prove a general posterior characterization for vectors of Compound Random Measures, which is interesting per se and still not available in the current literature. Based on our theoretical results and the available posterior representation, we develop the first Ferguson & Klass algorithm for nested nonparametric processes. We specialize our general theorems and algorithms in noteworthy examples. We finally test the model's performance on different simulated scenarios, and we exploit the construction to study air pollution in different provinces of an Italian region (Lombardy). We empirically show how nested processes based on Compound Random Measures outperform other Bayesian competitors.
title Nested Compound Random Measures
topic Methodology
url https://arxiv.org/abs/2410.06394