Motivated by recently investigated results on dependence measures and robust risk models, this paper provides an overview of dependence properties of many well known bivariate copula families, where the focus is on the Schur order for conditional distributions, which has the fundamental property that minimal elements characterize independence and maximal elements characterize perfect directed dependence. We give conditions on copulas that imply the Schur ordering of the associated conditional distribution functions. For extreme value copulas, we prove the equivalence of the lower orthant order, the Schur order for conditional distributions, and the pointwise order of the associated Pickands dependence functions. Further, we provide several tables and figures that list and illustrate various positive dependence and monotonicity properties of copula families, in particular from classes of Archimedean, extreme value, and elliptical copulas. Finally, for Chatterjee's rank correlation, which is consistent with respect to the Schur order for conditional distributions, we give some new closed-form formulas in terms of the parameter of the underlying copula family.
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