A note on convex relaxations for the inverse eigenvalue problem
Abstract
The affine inverse eigenvalue problem consists of identifying a real symmetric matrix with a prescribed set of eigenvalues in an affine space. Due to its ubiquity in applications, various instances of the problem have been widely studied in the literature. Previous algorithmic solutions were typically nonconvex heuristics and were often developed in a case-by-case manner for specific structured affine spaces. In this short note we describe a general family of convex relaxations for the problem by reformulating it as a question of checking feasibility of a system of polynomial equations, and then leveraging tools from the optimization literature to obtain semidefinite programming relaxations. Our system of polynomial equations may be viewed as a matricial analog of polynomial reformulations of 0/1 combinatorial optimization problems, for which semidefinite relaxations have been extensively investigated. We illustrate numerically the utility of our approach in stylized examples that are drawn from various applications.
Additional Information
© The Author(s), under exclusive licence to Springer-Verlag GmbH, DE part of Springer Nature 2021. Received 06 November 2019; Accepted 22 January 2021; Published 15 February 2021. The authors were supported in part by NSF Grants CCF-1350590 and CCF-1637598, by AFOSR Grant FA9550-16-1-0210, and by a Sloan research fellowship.Attached Files
Submitted - 1911.02225.pdf
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Additional details
- Eprint ID
- 106118
- DOI
- 10.1007/s11590-021-01708-1
- Resolver ID
- CaltechAUTHORS:20201016-144215019
- NSF
- CCF-1350590
- NSF
- CCF-1637598
- Air Force Office of Scientific Research (AFOSR)
- FA9550-16-1-0210
- Alfred P. Sloan Foundation
- Created
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2020-10-16Created from EPrint's datestamp field
- Updated
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2021-09-28Created from EPrint's last_modified field