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Convergence of Hessian
estimator from random samples on a manifold with boundary
Chih-Wei Chen and Hau-Tieng Wu |
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Vol. 7 (2025), No. 3, 807–864
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Abstract |
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A common method for estimating the Hessian operator from random samples on a low-dimensional manifold involves locally fitting a quadratic polynomial. Although widely used, it is unclear if this estimator introduces bias, especially in complex manifolds with boundaries and nonuniform sampling. Rigorous theoretical guarantees of its asymptotic behavior have been lacking. We show that, under mild conditions, this estimator asymptotically converges to the Hessian operator, with nonuniform sampling and curvature effects proving negligible, even near boundaries. Our analysis framework simplifies the intensive computations required for direct analysis. |
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Keywords
manifold learning, Hessian operator
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Mathematical Subject Classification
Primary: 62-08, 68Q87, 68W40
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Milestones
Received: 12 July 2024
Revised: 7 April 2025
Accepted: 15 July 2025
Published: 4 September 2025
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Authors |
| Chih-Wei Chen | |
| Department of Applied
Mathematics National Sun Yat-sen University Kaohsiung Taiwan |
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| Hau-Tieng Wu | |
| Courant Institute of Mathematical
Sciences New York University New York, NY United States |
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| © 2025 MSP (Mathematical Sciences Publishers). |
