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ČERMÁK, J. KISELA, T. NECHVÁTAL, L.
Original Title
The Lambert function method in qualitative analysis of fractional delay differential equations
Type
journal article in Web of Science
Language
English
Original Abstract
We discuss an analytical method for qualitative investigations of linear fractional delay differential equations. This method originates from the Lambert function technique that is traditionally used in stability analysis of ordinary delay differential equations. Contrary to the existing results based on such a technique, we show that the method can result into fully explicit stability criteria for a linear fractional delay differential equation, supported by a precise description of its asymptotics. As a by-product of our investigations, we also state alternate proofs of some classical assertions that are given in a more lucid form compared to the existing proofs.
Keywords
Fractional delay differential equation (primary); Lambert function; Stability; Asymptotic behavior
Authors
ČERMÁK, J.; KISELA, T.; NECHVÁTAL, L.
Released
16. 6. 2023
Publisher
Springer Nature
Location
CAMPUS, 4 CRINAN ST, LONDON N1 9XW, ENGLAND
ISBN
1311-0454
Periodical
Fractional Calculus and Applied Analysis
Year of study
26
Number
4
State
Republic of Bulgaria
Pages from
1545
Pages to
1565
Pages count
21
URL
https://link.springer.com/article/10.1007/s13540-023-00176-x
Full text in the Digital Library
http://hdl.handle.net/11012/213603
BibTex
@article{BUT184060, author="Jan {Čermák} and Tomáš {Kisela} and Luděk {Nechvátal}", title="The Lambert function method in qualitative analysis of fractional delay differential equations", journal="Fractional Calculus and Applied Analysis", year="2023", volume="26", number="4", pages="1545--1565", doi="10.1007/s13540-023-00176-x", issn="1311-0454", url="https://link.springer.com/article/10.1007/s13540-023-00176-x" }