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Thin Sets Are Not Equally Thin: Minimax Learning of Submanifold Integrals

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  • Xiaohong Chen
  • Wayne Yuan Gao

Abstract

Many economic parameters are identified by ``thin sets'' (submanifolds with Lebesgue measure zero) and hence difficult to recover from data in an ambient space. This paper provides a unified theory for estimation and inference of such ``thin-set'' identified functionals. We show that thin sets are \emph{not} equally thin: their intrinsic dimensionality $m$ matters in a precise manner. For a nonparametric regression $h_0$ with H\"{o}lder smoothness $s$ and $d$-dimensional covariates in the ambient space, we show that $n^{-\frac{s}{2s+d-m}}$ is the minimax optimal rate of estimating linear and nonlinear (e.g., quadratic, upper contour) integrals of $h_0$ on an $m$-dimensional submanifold ($0\leq m

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  • Xiaohong Chen & Wayne Yuan Gao, 2025. "Thin Sets Are Not Equally Thin: Minimax Learning of Submanifold Integrals," Papers 2507.12673, arXiv.org, revised Mar 2026.
    • Handle: RePEc:arx:papers:2507.12673
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    Cited by:

    1. Xiaohong Chen & Wayne Yuan Gao & Likang Wen, 2025. "ReLU-Based and DNN-Based Generalized Maximum Score Estimators," Cowles Foundation Discussion Papers 2476, Cowles Foundation for Research in Economics, Yale University.
    2. Xiaohong Chen & Zhenxiao Chen & Wayne Yuan Gao, 2025. "Inference on Welfare and Value Functionals under Optimal Treatment Assignment," Papers 2510.25607, arXiv.org.
    3. Xiaohong Chen & Wayne Yuan Gao & Likang Wen, 2025. "ReLU-Based and DNN-Based Generalized Maximum Score Estimators," Papers 2511.19121, arXiv.org.

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