New rank-statistic estimators for Cramér-von-Mises, first-order Sobol, metric-space, and higher-moment global sensitivity indices, with consistency and a central limit theorem for Sobol indices.
Sensitivity indices for output on a Riemannian manifold
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abstract
In the context of computer code experiments, sensitivity analysis of a complicated input-output system is often performed by ranking the so-called Sobol indices. One reason of the popularity of Sobol's approach relies on the simplicity of the statistical estimation of these indices using the so-called Pick and Freeze method. In this work we propose and study sensitivity indices for the case where the output lies on a Riemannian manifold. These indices are based on a Cram\'er von Mises like criterion that takes into account the geometry of the output support. We propose a Pick-Freeze like estimator of these indices based on an $U$--statistic. The asymptotic properties of these estimators are studied. Further, we provide and discuss some interesting numerical examples.
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stat.ME 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Global Sensitivity Analysis: a novel generation of mighty estimators based on rank statistics
New rank-statistic estimators for Cramér-von-Mises, first-order Sobol, metric-space, and higher-moment global sensitivity indices, with consistency and a central limit theorem for Sobol indices.