Published January 28, 2022
| Submitted
Journal Article
Open
Exponential convergence of Sobolev gradient descent for a class of nonlinear eigenproblems
- Creators
- Zhang, Ziyun
Abstract
We propose to use the Łojasiewicz inequality as a general tool for analyzing the convergence rate of gradient descent on a Hilbert manifold, without resorting to the continuous gradient flow. Using this tool, we show that a Sobolev gradient descent method with adaptive inner product converges exponentially fast to the ground state for the Gross–Pitaevskii eigenproblem. This method can be extended to a class of general high-degree optimizations or nonlinear eigenproblems under certain conditions. We demonstrate this generalization using several examples, in particular a nonlinear Schrödinger eigenproblem with an extra high-order interaction term. Numerical experiments are presented for these problems.
Additional Information
© 2022 International Press. Received: September 23, 2020; Accepted (in revised form): July 10, 2021. Published 28 January 2022. This research was in part supported by NSF grants DMS-1912654 and DMS-1907977. The author would like to thank Thomas Y. Hou for the helpful comments on earlier versions of this work, and Zhenzhen Li for introducing the Lojasiewicz inequality to the author. The author would also like to acknowledge the warm hospitality of Oberwolfach Research Institute for Mathematics during the seminar Beyond Numerical Homogenization, where the early ideas of this work started.Attached Files
Submitted - 1912.02135.pdf
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1912.02135.pdf
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Additional details
- Eprint ID
- 113832
- Resolver ID
- CaltechAUTHORS:20220309-676806000
- DMS-1912654
- NSF
- DMS-1907977
- NSF
- Created
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2022-03-11Created from EPrint's datestamp field
- Updated
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2022-03-11Created from EPrint's last_modified field