Rectifiable curves in proximally smooth sets
Ivanov G, Lopushanski MS. 2022. Rectifiable curves in proximally smooth sets. Set-Valued and Variational Analysis. 30(2), 657–675.
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https://arxiv.org/abs/2012.10691
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Journal Article
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Author
Ivanov, GrigoryISTA;
Lopushanski, Mariana S.
Department
Abstract
In this article we study some geometric properties of proximally smooth sets. First, we introduce a modification of the metric projection and prove its existence. Then we provide an algorithm for constructing a rectifiable curve between two sufficiently close points of a proximally smooth set in a uniformly convex and uniformly smooth Banach space, with the moduli of smoothness and convexity of power type. Our algorithm returns a reasonably short curve between two sufficiently close points of a proximally smooth set, is iterative and uses our modification of the metric projection. We estimate the length of the constructed curve and its deviation from the segment with the same endpoints. These estimates coincide up to a constant factor with those for the geodesics in a proximally smooth set in a Hilbert space.
Publishing Year
Date Published
2022-06-01
Journal Title
Set-Valued and Variational Analysis
Publisher
Springer Nature
Acknowledgement
Theorem 2 was obtained at Steklov Mathematical Institute RAS and supported by Russian Science Foundation, grant N 19-11-00087.
Volume
30
Issue
2
Page
657-675
ISSN
eISSN
IST-REx-ID
Cite this
Ivanov G, Lopushanski MS. Rectifiable curves in proximally smooth sets. Set-Valued and Variational Analysis. 2022;30(2):657-675. doi:10.1007/s11228-021-00612-1
Ivanov, G., & Lopushanski, M. S. (2022). Rectifiable curves in proximally smooth sets. Set-Valued and Variational Analysis. Springer Nature. https://doi.org/10.1007/s11228-021-00612-1
Ivanov, Grigory, and Mariana S. Lopushanski. “Rectifiable Curves in Proximally Smooth Sets.” Set-Valued and Variational Analysis. Springer Nature, 2022. https://doi.org/10.1007/s11228-021-00612-1.
G. Ivanov and M. S. Lopushanski, “Rectifiable curves in proximally smooth sets,” Set-Valued and Variational Analysis, vol. 30, no. 2. Springer Nature, pp. 657–675, 2022.
Ivanov G, Lopushanski MS. 2022. Rectifiable curves in proximally smooth sets. Set-Valued and Variational Analysis. 30(2), 657–675.
Ivanov, Grigory, and Mariana S. Lopushanski. “Rectifiable Curves in Proximally Smooth Sets.” Set-Valued and Variational Analysis, vol. 30, no. 2, Springer Nature, 2022, pp. 657–75, doi:10.1007/s11228-021-00612-1.
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arXiv 2012.10691