Weakly-normal basis vector fields in RKHS with an application to shape Newton methods

Paganini, Alberto; Sturm, Kevin

17m1131623.pdf (1.25 MB)

Weakly-normal basis vector fields in RKHS with an application to shape Newton methods

journal contribution

posted on 2019-08-05, 15:31 authored by Alberto Paganini, Kevin Sturm

We construct a space of vector fields that are normal to differentiable curves in the plane. Its basis functions are defined via saddle point variational problems in reproducing kernel Hilbert spaces (RKHSs). First, we study the properties of these basis vector fields and show how to approximate them. Then, we employ this basis to discretise shape Newton methods and investigate the impact of this discretisation on convergence rates.

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Citation

SIAM Journal on Numerical Analysis, 2019, 57(1), 1–26. (26 pages)

Author affiliation

/Organisation/COLLEGE OF SCIENCE AND ENGINEERING/Department of Mathematics

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VoR (Version of Record)

Published in

SIAM Journal on Numerical Analysis

Publisher

Society for Industrial and Applied Mathematics

eissn

1095-7170

Acceptance date

2018-09-27

Copyright date

2019

Available date

2019-08-05

Publisher DOI

https://doi.org/10.1137/17M1131623

Publisher version

https://epubs.siam.org/doi/10.1137/17M1131623

Language

en

Administrator link

https://leicester.figshare.com/account/articles/10220030

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Keywords

shape optimization shape Newton method numerical analysis radial basis functions reproducing kernel Hilbert spaces

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Weakly-normal basis vector fields in RKHS with an application to shape Newton methods

History

Citation

Author affiliation

Version

Published in

Publisher

eissn

Acceptance date

Copyright date

Available date

Publisher DOI

Publisher version

Language

Administrator link

Usage metrics

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Keywords

Licence

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