Non-negative matrices and their structured singular values

Аннотация

In this article, we present new results for the computation of structured singular values of non-negative matrices subject to pure complex perturbations. We prove the equivalence of structured singular values and spectral radius of perturbed matrix ( M ∆). The presented new results on the equivalence of structured singular values, non-negative spectral radius and non-negative determinant of ( M ∆) is presented and analyzed. Furthermore, it has been shown that for a unit spectral radius of ( M ∆), both structured singular values and spectral radius are exactly equal. Finally, we present the exact equivalence between structured singular value and the largest singular value of ( M ∆).

Темы

Идентификаторы

DOI

10.26907/0021-3446-2023-10-36-45

Цитирования и источники