Adapted optimal transport convergence restores weak continuity for conditional dependence measures and delivers O(N^{-1/3}) rates for adapted empirical and rank-based copula estimators.
On a copula product linking Wasserstein correlations and rearranged dependence measures
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
Recent research in statistics has focused on dependence measures kappa(Y,X) taking values in [0, 1], where 0 characterizes independence of X and Y, and 1 perfect functional dependence of Y on X. One class of such measures consists of the optimal transport-based Wasserstein correlations introduced by Wiesel. Another class comprises the rearranged dependence measures studied by Strothmann, Dette, and Siburg. While the constructions of Wasserstein correlations and rearranged dependence measures seem to be fundamentally different, we show that they are connected by a copula product T (C) = C v {\Pi} that models conditional comonotonicity. As a main contribution, we prove that the mapping T acts as a reflection on the class of stochastically increasing copulas, whereas T^2 = T \circ T projects a copula onto its increasing rearranged copula. We further study fixed points, ordering results, and continuity properties of T to better understand the interplay between these classes of dependence measures. Our results demonstrate that conditional comonotonicity is an intrinsic feature of dependence measures, whereas conditional independence underlying Chatterjee's rank correlation is a rather exceptional property.
fields
math.ST 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
citing papers explorer
-
Dependence Measures via Adapted Optimal Transport: Stability and Rates of Convergence
Adapted optimal transport convergence restores weak continuity for conditional dependence measures and delivers O(N^{-1/3}) rates for adapted empirical and rank-based copula estimators.