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Autori principali: Djaloud, Toihir Soulaimana, Seck, Cheikh Tidiane
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2407.19596
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author Djaloud, Toihir Soulaimana
Seck, Cheikh Tidiane
author_facet Djaloud, Toihir Soulaimana
Seck, Cheikh Tidiane
contents The conditional copula model arises when the dependence between random variables is influenced by another covariate. Despite its importance in modelling complex dependence structures, there are very few fully nonparametric approaches to estimate the conditional copula function. In the bivariate setting, the only nonparametric estimator for the conditional copula is based on Sklar's Theorem and proposed by Gijbels \textit{et al.} (2011). In this paper, we propose an alternative nonparametric approach %based on functional principal component analysis. We to construct an estimator for the bivariate conditional copula from the Karhunen-Loève representation of a suitably defined conditional copula process. We establish its consistency and weak convergence to a limit Gaussian process with explicit covariance function.
format Preprint
id arxiv_https___arxiv_org_abs_2407_19596
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A Functional Principal Component Analysis Approach to Conditional Copula Estimation
Djaloud, Toihir Soulaimana
Seck, Cheikh Tidiane
Statistics Theory
The conditional copula model arises when the dependence between random variables is influenced by another covariate. Despite its importance in modelling complex dependence structures, there are very few fully nonparametric approaches to estimate the conditional copula function. In the bivariate setting, the only nonparametric estimator for the conditional copula is based on Sklar's Theorem and proposed by Gijbels \textit{et al.} (2011). In this paper, we propose an alternative nonparametric approach %based on functional principal component analysis. We to construct an estimator for the bivariate conditional copula from the Karhunen-Loève representation of a suitably defined conditional copula process. We establish its consistency and weak convergence to a limit Gaussian process with explicit covariance function.
title A Functional Principal Component Analysis Approach to Conditional Copula Estimation
topic Statistics Theory
url https://arxiv.org/abs/2407.19596