Saved in:
Bibliographic Details
Main Authors: Walz, Eva-Maria, Eberl, Andreas, Gneiting, Tilmann
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2510.17994
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866908604285583360
author Walz, Eva-Maria
Eberl, Andreas
Gneiting, Tilmann
author_facet Walz, Eva-Maria
Eberl, Andreas
Gneiting, Tilmann
contents The assessment of monotone dependence between random variables $X$ and $Y$ is a classical problem in statistics and a gamut of application domains. Consequently, researchers have sought measures of association that are invariant under strictly increasing transformations of the margins, with the extant literature being splintered. Rank correlation coefficients, such as Spearman's Rho and Kendall's Tau, have been studied at great length in the statistical literature, mostly under the assumption that $X$ and $Y$ are continuous. In the case of a dichotomous outcome $Y$, receiver operating characteristic analysis and the asymmetric area under the curve (AUC) measure are used to assess monotone dependence of $Y$ on a covariate $X$. Here we unify and extend thus far disconnected strands of literature, by developing common population level theory, estimators, and tests that bridge continuous and dichotomous settings and apply to all linearly ordered outcomes. In particular, we introduce asymmetric grade correlation, AGC$(X,Y)$, as the covariance of the mid distribution function transforms, or grades, of $X$ and $Y$, divided by the variance of the grade of $Y$. The coefficient of monotone association then is CMA$(X,Y) = \frac{1}{2} ($AGC$(X,Y) + 1)$. When $X$ and $Y$ are continuous, AGC is symmetric and equals Spearman's Rho. When $Y$ is dichotomous, CMA equals AUC. We establish central limit theorems for the sample versions of AGC and CMA and develop a test of DeLong type for the equality of AGC or CMA values with a shared outcome $Y$. In case studies, we apply the new measures to assess progress in data-driven weather prediction, and to evaluate methods of uncertainty quantification for large language models.
format Preprint
id arxiv_https___arxiv_org_abs_2510_17994
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Assessing Monotone Dependence: Area Under the Curve Meets Rank Correlation
Walz, Eva-Maria
Eberl, Andreas
Gneiting, Tilmann
Methodology
The assessment of monotone dependence between random variables $X$ and $Y$ is a classical problem in statistics and a gamut of application domains. Consequently, researchers have sought measures of association that are invariant under strictly increasing transformations of the margins, with the extant literature being splintered. Rank correlation coefficients, such as Spearman's Rho and Kendall's Tau, have been studied at great length in the statistical literature, mostly under the assumption that $X$ and $Y$ are continuous. In the case of a dichotomous outcome $Y$, receiver operating characteristic analysis and the asymmetric area under the curve (AUC) measure are used to assess monotone dependence of $Y$ on a covariate $X$. Here we unify and extend thus far disconnected strands of literature, by developing common population level theory, estimators, and tests that bridge continuous and dichotomous settings and apply to all linearly ordered outcomes. In particular, we introduce asymmetric grade correlation, AGC$(X,Y)$, as the covariance of the mid distribution function transforms, or grades, of $X$ and $Y$, divided by the variance of the grade of $Y$. The coefficient of monotone association then is CMA$(X,Y) = \frac{1}{2} ($AGC$(X,Y) + 1)$. When $X$ and $Y$ are continuous, AGC is symmetric and equals Spearman's Rho. When $Y$ is dichotomous, CMA equals AUC. We establish central limit theorems for the sample versions of AGC and CMA and develop a test of DeLong type for the equality of AGC or CMA values with a shared outcome $Y$. In case studies, we apply the new measures to assess progress in data-driven weather prediction, and to evaluate methods of uncertainty quantification for large language models.
title Assessing Monotone Dependence: Area Under the Curve Meets Rank Correlation
topic Methodology
url https://arxiv.org/abs/2510.17994