Improved kernel estimation of copulas: Weak convergence and goodness-of-fit testing
Marek Omelka, Ir\`ene Gijbels, No\"el Veraverbeke
TL;DR
This paper introduces improved kernel estimators for copula functions that address corner bias issues, providing theoretical weak convergence results, practical bandwidth selection methods, and applications to goodness-of-fit testing.
Contribution
The paper proposes novel kernel estimators for copulas that mitigate corner bias, with proven weak convergence and practical bandwidth selection, enhancing copula modeling accuracy.
Findings
Improved estimators reduce corner bias in copula estimation.
Theoretical weak convergence established for most copula families.
Enhanced goodness-of-fit testing performance demonstrated.
Abstract
We reconsider the existing kernel estimators for a copula function, as proposed in Gijbels and Mielniczuk [Comm. Statist. Theory Methods 19 (1990) 445--464], Fermanian, Radulovi\v{c} and Wegkamp [Bernoulli 10 (2004) 847--860] and Chen and Huang [Canad. J. Statist. 35 (2007) 265--282]. All of these estimators have as a drawback that they can suffer from a corner bias problem. A way to deal with this is to impose rather stringent conditions on the copula, outruling as such many classical families of copulas. In this paper, we propose improved estimators that take care of the typical corner bias problem. For Gijbels and Mielniczuk [Comm. Statist. Theory Methods 19 (1990) 445--464] and Chen and Huang [Canad. J. Statist. 35 (2007) 265--282], the improvement involves shrinking the bandwidth with an appropriate functional factor; for Fermanian, Radulovi\v{c} and Wegkamp [Bernoulli 10 (2004)…
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