Concordance, symmetrization and non-exchangeability for bivariate copulas

Abstract

We study the relationship between measures of non-exchangeability μp (p∈[1,+∞]), in the sense of Durante et al. (2010), and classical dependence functionals for bivariate copulas. We show that the symmetrization C(C+Ct)/2 preserves Spearman's while annihilating μp, and that Blomqvist's β carries no information about the degree of non-exchangeability. We also establish the sharp lower bound σ(C) 6\,μ1(C), where σ is the Schweizer-Wolff dependence measure, showing that asymmetry implies dependence. Closed-form expressions for τ, , and the tail-dependence coefficients of the maximally non-exchangeable family \Mθ\ are derived as illustrations.