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Convergence of the reach for a sequence of Gaussian-embedded manifolds

Publication Type : Journal Article

Publisher : Probability Theory and Related Fields

Source : Probability Theory and Related Fields, vol. 171, no. 3–4, pp. 1045–1091, Aug. 2018

Url : https://link.springer.com/article/10.1007/s00440-017-0801-1

Campus : Amritapuri

School : School of Computing

Department : Computer Science and Engineering

Year : 2018

Abstract : Motivated by questions of manifold learning, we study a sequence of random manifolds, generated by embedding a fixed, compact manifold M into Euclidean spheres of increasing dimension via a sequence of Gaussian mappings. One of the fundamental smoothness parameters of manifold learning theorems is the reach, or critical radius, of M. Roughly speaking, the reach is a measure of a manifold’s departure from convexity, which incorporates both local curvature and global topology. This paper develops limit theory for the reach of a family of random, Gaussian-embedded, manifolds, establishing both almost sure convergence for the global reach, and a fluctuation theory for both it and its local version. The global reach converges to a constant well known both in the reproducing kernel Hilbert space theory of Gaussian processes, as well as in their extremal theory.

Cite this Research Publication : : R. J. Adler, S. R. Krishnan*, J. E. Taylor, and S. Weinberger, “Convergence of the reach for a sequence of Gaussian-embedded manifolds,” Probability Theory and Related Fields, vol. 171, no. 3–4, pp. 1045–1091, Aug. 2018.

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