Abstract
Motivated by a recently established result saying that within the class of bivariate Archimedean copulas standard pointwise convergence implies weak convergence of almost all conditional distributions this contribution studies the class C ar d of all d-dimensional Archimedean copulas with d≥3 and proves the afore-mentioned implication with respect to conditioning on the first d−1 coordinates. Several properties equivalent to pointwise convergence in C ar d are established and - as by-product of working with conditional distributions (Markov kernels) - alternative simple proofs for the well-known formulas for the level set masses μ C(L t) and the Kendall distribution function F K d as well as a novel geometrical interpretation of the latter are provided. Viewing normalized generators ψ of d-dimensional Archimedean copulas from the perspective of their so-called Williamson measures γ on (0,∞) is then shown to allow not only to derive surprisingly simple expressions for μ C(L t) and F K d in terms of γ and to characterize pointwise convergence in C ar d by weak convergence of the Williamson measures but also to prove that regularity/singularity properties of γ directly carry over to the corresponding copula C γ∈C ar d. These results are finally used to prove the fact that the family of all absolutely continuous and the family of all singular d-dimensional copulas is dense in C ar d and to underline that despite of their simple algebraic structure Archimedean copulas may exhibit surprisingly singular behavior in the sense of irregularity of their conditional distribution functions.
Originalsprache | Englisch |
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Aufsatznummer | 127555 |
Fachzeitschrift | Journal of Mathematical Analysis and Applications |
Jahrgang | 529 |
Ausgabenummer | 1 |
Frühes Online-Datum | 4 Juli 2023 |
DOIs | |
Publikationsstatus | Veröffentlicht - Jan. 2024 |
Bibliographische Notiz
Publisher Copyright:© 2023 The Author(s)
Systematik der Wissenschaftszweige 2012
- 101 Mathematik