On exact regions between measures of concordance and Chatterjee's rank correlation for lower semilinear copulas

Abstract

We explore how the classical concordance measures - Kendall's τ, Spearman's rank correlation , and Spearman's footrule φ - relate to Chatterjee's rank correlation when restricted to lower semilinear copulas. First, we provide a complete characterization of the attainable τ- region for this class, thus resolving the conjecture in [18]. Building on this result, we then derive the exact τ-φ and φ- regions, obtain a closed-form relationship between and τ, and establish the exact τ- region. In particular, we prove that never exceeds τ, , or φ. Our results clarify the relationship between undirected and directed dependence measures and reveal novel insights into the dependence structures that result from lower semilinear copulas.