| Authors: | Dodig, Marija Stošić, Marko |
Affiliations: | Mechanics Mathematics Mathematical Institute of the Serbian Academy of Sciences and Arts |
Title: | IS THE BOUNDED RANK PERTURBATIONS PROBLEM FOR MATRIX PENCILS JUST A COMPLETION PROBLEM? | Journal: | Electronic Journal of Linear Algebra | Volume: | 41 | First page: | 491 | Last page: | 510 | Issue Date: | 2025 | Rank: | M22 | ISSN: | 1537-9582 | DOI: | 10.13001/ela.2025.9593 | Abstract: | In this paper, we study a direct link between the bounded rank perturbations problem and the completion problem for matrix pencils. We conjecture that the bounded rank perturbations problem is, in fact, equivalent to a completion problem. We prove the conjecture in three cases: when the rank bound is one, when the involved pencils are of full row rank, and when the rank bound equals the rank distance of the involved matrix pencils. |
Keywords: | Bounded rank perturbations | Completion of matrix pencils | Matrix pencils | Publisher: | International Linear Algebra Society |
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