Publication detail
Regular variation and fractional operators
ŘEHÁK, P.
English title
Regular variation and fractional operators
Type
WoS Article
Language
en
Original abstract
The paper can be understood as a contribution to the study of relationships between the notion of regular variation on one hand and fractional calculus on the other hand, along with their consequences. We present a full fractional extension of some of the fundamental statements from the theory of regularly varying functions, thereby providing a characterization of regular variation in terms of fractional operators. Various types of fractional integral and differential operators are included. Asymptotics at infinity as well as at the initial point is studied. We also establish new versions of the fractional L'Hospital rule. The obtained results will find applications in the asymptotic theory of fractional differential equations. As a by-product, we obtain information on the solutions to the equations which, in the limiting case, lead to viscoelastic models.
Keywords in English
Regular variation, Fractional integral, Fractional derivative, Karamata theorem, Monotone density theorem, L'Hospital rule
Released
2026-04-01
Publisher
Springer Nature
Journal
Fractional Calculus and Applied Analysis
Volume
29
Number
2
Pages from–to
662–682
Pages count
21
BIBTEX
@article{BUT201943,
author="Pavel {Řehák}",
title="Regular variation and fractional operators",
journal="Fractional Calculus and Applied Analysis",
year="2026",
volume="29",
number="2",
pages="662--682",
doi="10.1007/s13540-026-00501-0",
issn="1311-0454",
url="https://link.springer.com/article/10.1007/s13540-026-00501-0"
}