2014
DOI: 10.1016/j.fss.2013.05.017
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Frankʼs condition for multivariate Archimedean copulas

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Cited by 9 publications
(6 citation statements)
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“…Remark 10. From the equivalence between signature representation and properties (i) and (iv) we can conclude that, under our conditions, the same information contained in G 1:r , ..., G r:r is also contained in the family of all the reliability functions R (ϕ) S (t) in (10). We emphasize that such a family is indexed by all the coherent structures ϕ for binary systems made of r components.…”
Section: Diagonal Sections and Distributions Of Order Statisticsmentioning
confidence: 57%
“…Remark 10. From the equivalence between signature representation and properties (i) and (iv) we can conclude that, under our conditions, the same information contained in G 1:r , ..., G r:r is also contained in the family of all the reliability functions R (ϕ) S (t) in (10). We emphasize that such a family is indexed by all the coherent structures ϕ for binary systems made of r components.…”
Section: Diagonal Sections and Distributions Of Order Statisticsmentioning
confidence: 57%
“…We recall that the diagonal section characterizes uniquely many Archimedean copulas (under a condition that is called Frank's condition, see e.g., [17]), some non-parametric estimators of the generator of an Archimedean copulas directly rely on this diagonal section. We consider here the case where the df of Z has spectral random vector W.…”
Section: Domination Spectrummentioning
confidence: 99%
“…Under what is called Frank's condition (see [17]), the Archimedean copula is uniquely determined by its diagonal section δ(u) = C(u, . .…”
Section: Estimation In the Archimedean Casementioning
confidence: 99%