A Martingale Approach To Fluctuations of Rank Estimators in Sensitivity Analysis

Abstract

Given a bivariate random pair (X,Y), a natural problem is to estimate, from a single sample (Xi,Yi)1 i n, quantities such as E[ E[ Y X ]2 ]. More broadly, sensitivity indices are designed to quantify the possibly nonlinear influence of an input variable X on an output variable Y. A classical example is the Sobol' index Var(E[Y X])Var(Y) ∈ [0,1] \ . Another important example is the Cram\'er--von Mises (CvM) index. Following the pioneering work of Chatterjee chatterjee2021new, consistent rank-based estimators are now available for such quantities. In this paper, we prove sharp fluctuation results using martingale methods. Our framework yields a unified treatment of the univariate Sobol' index, a multivariate extension involving several functions of the same scalar input, and the CvM index. As a consequence, we recover, unify, and simplify results from Gamboa et al. gamboa2022global, gamboa2023erratum, Lin--Han lin2022limit, and Kroll kroll2024asymptotic. In particular, we work under minimal regularity assumptions. Furthermore, while the Gaussian fluctuation phenomenon itself was already known, the novelty lies in the structure of the asymptotic variance: for the CvM index, we obtain, to the best of our knowledge, the first explicit formula, while for the Sobol' index, we derive a new expression with a more structured form.

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