On bivariate Archimax copulas: Level sets, mass distributions and related results

Abstract

Motivated by the results in n [Mai and Scherer, 2011; Trutschnig et al., 2016], which examine the way bivariate Extreme Value copulas distribute their mass, we extend these findings to the larger family of bivariate Archimax copulas Cam. Working with Markov kernels (conditional distributions), we analyze the mass distributions of Archimax copulas C ∈ Cam and show that the support of C is determined by some functions f0, gL and gR. Additionally, we prove that the discrete component (if any) of C concentrates its mass on the graphs of certain convex functions fs or non-decreasing functions gt. Investigating the level sets Lt of Archimax copulas C ∈ Cam, we establish that these sets can also be characterized in terms of the afore-mentioned functions fs and gt. Furthermore, recognizing the close relationship between the level sets Lt of a copula C and its Kendall distribution function FCK, we provide an alternative proof for the representation of FCK for arbitrary Archimax copulas C∈ Cam and derive simple expressions for the level set masses μC(Lt). Building upon the fact that Archimax copulas C ∈ Cam can be represented via two univariate probability measures γ and - so-called Williamson and Pickands dependence measures - we show that absolute continuity, discreteness and singularity properties of these measures γ and carry over to the corresponding Archimax copula Cγ, . Finally, we derive conditions on γ and such that the support of the absolutely continuous, discrete or singular component of Cγ, coincides with the support of Cγ, .