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Main Authors: Bonacina, Francesco, Lopez, Olivier, Thomas, Maud
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2403.12565
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author Bonacina, Francesco
Lopez, Olivier
Thomas, Maud
author_facet Bonacina, Francesco
Lopez, Olivier
Thomas, Maud
contents This paper proposes a regression tree procedure to estimate conditional copulas. The associated algorithm determines classes of observations based on covariate values and fits a simple parametric copula model on each class. The association parameter changes from one class to another, allowing for non-linearity in the dependence structure modeling. It also allows the definition of classes of observations on which the so-called "simplifying assumption" [see Derumigny and Fermanian, 2017] holds reasonably well. When considering observations belonging to a given class separately, the association parameter no longer depends on the covariates according to our model. In this paper, we derive asymptotic consistency results for the regression tree procedure and show that the proposed pruning methodology, that is the model selection techniques selecting the appropriate number of classes, is optimal in some sense. Simulations provide finite sample results and an analysis of data of cases of human influenza presents the practical behavior of the procedure.
format Preprint
id arxiv_https___arxiv_org_abs_2403_12565
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Tree-based conditional copula estimation
Bonacina, Francesco
Lopez, Olivier
Thomas, Maud
Statistics Theory
This paper proposes a regression tree procedure to estimate conditional copulas. The associated algorithm determines classes of observations based on covariate values and fits a simple parametric copula model on each class. The association parameter changes from one class to another, allowing for non-linearity in the dependence structure modeling. It also allows the definition of classes of observations on which the so-called "simplifying assumption" [see Derumigny and Fermanian, 2017] holds reasonably well. When considering observations belonging to a given class separately, the association parameter no longer depends on the covariates according to our model. In this paper, we derive asymptotic consistency results for the regression tree procedure and show that the proposed pruning methodology, that is the model selection techniques selecting the appropriate number of classes, is optimal in some sense. Simulations provide finite sample results and an analysis of data of cases of human influenza presents the practical behavior of the procedure.
title Tree-based conditional copula estimation
topic Statistics Theory
url https://arxiv.org/abs/2403.12565