Frank copula is minimum information copula under fixed Kendall's \(\tau\)

In dependence modeling, various copulas have been utilized. Among them, the Frank copula has been one of the most typical choices due to its simplicity. In this work, we demonstrate that the Frank copula is the minimum information copula under fixed Kendall's \(\tau\) (MICK), both theoretically...

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Bibliographic Details
Published inarXiv.org
Main Authors Sukeda, Issey, Sei, Tomonari
Format Paper
LanguageEnglish
Published Ithaca Cornell University Library, arXiv.org 21.06.2024
Subjects
Density
Liouville equations
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Summary:In dependence modeling, various copulas have been utilized. Among them, the Frank copula has been one of the most typical choices due to its simplicity. In this work, we demonstrate that the Frank copula is the minimum information copula under fixed Kendall's \(\tau\) (MICK), both theoretically and numerically. First, we explain that both MICK and the Frank density follow the hyperbolic Liouville equation. Moreover, we show that the copula density satisfying the Liouville equation is uniquely the Frank copula. Our result asserts that selecting the Frank copula as an appropriate copula model is equivalent to using Kendall's \(\tau\) as the sole available information about the true distribution, based on the entropy maximization principle.
ISSN:2331-8422