Stability Theory for Matrix Polynomials in One and Several Variables with Extensions of Classical Theorems
- Resource Type
- Working Paper
- Authors
- Szymański, Oskar Jakub
- Source
- Subject
- Mathematics - Complex Variables
15A18, 15A22, 15B57, 30C15, 32A60
- Language
The file contains PhD Dissertation by Oskar Jakub Szyma\'nski. This work ends his study at Doctoral School of Exact and Natural Sciences at Jagiellonian University where the Author has attended in years 2019-2024. The subject of the Thesis is the stability theory developed for matrix polynomials. The main concept described in the Dissertation is hyperstability with respect to an open or closed subset of the complex plane. The notion of hyperstability is a contribution of the Author of the Thesis. Disseration is devoted mostly to regular polynomials, singular polynomials play marginal role in the Thesis. The Author of the Thesis has discovered several interesting results extending classical theorems from complex analysis. These are for example: multi-variable Gauss-Lucas theorem for matrix polynomials and Sz\'asz-type inequalities for matrix norms such as the matrix two-norm and the Frobenius norm.
Comment: 69 pages. arXiv admin note: text overlap with arXiv:2203.10509