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Autori principali: Lentjes, Bram, de Wolff, Babette A. J.
Natura: Preprint
Pubblicazione: 2026
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Accesso online:https://arxiv.org/abs/2603.21711
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author Lentjes, Bram
de Wolff, Babette A. J.
author_facet Lentjes, Bram
de Wolff, Babette A. J.
contents In this paper, we introduce the notion of a characteristic operator for closable linear operators and explore their connected spectral properties via equivalence. Additionally, we develop an explicit scheme for constructing characteristic operators for a broad class of closable linear operators which are commonly encountered in periodic evolution equations. Our findings are illustrated through examples involving classical delay differential equations, delay differential equations with infinite delay and mixed functional differential equations. Notably, we resolve an open problem concerning the discrete spectral structure of the Floquet exponents for this latter class of differential equations. This work can be regarded as a natural and significant extension of the powerful framework developed by Kaashoek and Verduyn Lunel [40] on characteristic matrices and spectral properties induced by autonomous evolution equations.
format Preprint
id arxiv_https___arxiv_org_abs_2603_21711
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Characteristic Operators and Spectral Properties of Periodic Evolutionary Systems
Lentjes, Bram
de Wolff, Babette A. J.
Dynamical Systems
Spectral Theory
34K20, 47A10, 47A56
In this paper, we introduce the notion of a characteristic operator for closable linear operators and explore their connected spectral properties via equivalence. Additionally, we develop an explicit scheme for constructing characteristic operators for a broad class of closable linear operators which are commonly encountered in periodic evolution equations. Our findings are illustrated through examples involving classical delay differential equations, delay differential equations with infinite delay and mixed functional differential equations. Notably, we resolve an open problem concerning the discrete spectral structure of the Floquet exponents for this latter class of differential equations. This work can be regarded as a natural and significant extension of the powerful framework developed by Kaashoek and Verduyn Lunel [40] on characteristic matrices and spectral properties induced by autonomous evolution equations.
title Characteristic Operators and Spectral Properties of Periodic Evolutionary Systems
topic Dynamical Systems
Spectral Theory
34K20, 47A10, 47A56
url https://arxiv.org/abs/2603.21711