Publication detail
Asymptotics of perturbed discrete Euler equations in the critical case
ŘEHÁK, P.
English title
Asymptotics of perturbed discrete Euler equations in the critical case
Type
journal article in Web of Science
Language
en
Original abstract
We consider the difference equation Delta(2)y(k) + p(k)y(k + 1) = 0 under the condition lim(k ->infinity) k(2)p(k) = 1/4; such a setting can cover various perturbations of the critical (double root) case in Euler type difference equations. We establish precise asymptotic formulae for all nonoscillatory solutions. An important role is played by the concept of the refined discrete regular variation, transformations of dependent and independent variable, and asymptotic theory of dynamic equations on time scales. (C) 2020 Elsevier Inc. All rights reserved.
English abstract
We consider the difference equation Delta(2)y(k) + p(k)y(k + 1) = 0 under the condition lim(k ->infinity) k(2)p(k) = 1/4; such a setting can cover various perturbations of the critical (double root) case in Euler type difference equations. We establish precise asymptotic formulae for all nonoscillatory solutions. An important role is played by the concept of the refined discrete regular variation, transformations of dependent and independent variable, and asymptotic theory of dynamic equations on time scales. (C) 2020 Elsevier Inc. All rights reserved.
Keywords in English
Euler difference equation; Asymptotic behavior; Regular variation
Released
15.04.2021
Publisher
ACADEMIC PRESS INC ELSEVIER SCIENCE
Location
SAN DIEGO
ISSN
0022-247X
Volume
496
Number
2
Pages from–to
1–9
Pages count
9
BIBTEX
@article{BUT167822,
author="Pavel {Řehák},
title="Asymptotics of perturbed discrete Euler equations in the critical case",
year="2021",
volume="496",
number="2",
month="April",
pages="1--9",
publisher="ACADEMIC PRESS INC ELSEVIER SCIENCE",
address="SAN DIEGO",
issn="0022-247X"
}