Publication detail
Oscillation of solution of a linear third-order discrete delayed equation
DIBLÍK, J. BAŠTINCOVÁ, A. BAŠTINEC, J.
Original Title
Oscillation of solution of a linear third-order discrete delayed equation
Type
conference paper
Language
English
Original Abstract
A linear third-order discrete delayed equation $Delta x(n)=-p(n)x(n-2)$ with a positive coefficient $p$ is considered for $n$ going to $\infty$. This equation is known to have a positive solution if $p$ fulfils an inequality. The goal of the paper is to show that, in the case of the opposite inequality for $p$, all solutions of the equation considered are oscillating for $n$ tending to $\infty$.
Keywords
Discrete delayed equation, oscillating solution, positive solution, asymptotic behavior.
Authors
DIBLÍK, J.; BAŠTINCOVÁ, A.; BAŠTINEC, J.
RIV year
2011
Released
24. 10. 2011
Publisher
EPI
Location
Kunovice
ISBN
978-80-7314-221-6
Book
NINTH INTERNATIONAL CONFERENCE ON SOFT COMPUTING APPLIED IN COMPUTER AND ECONOMIC ENVIRONMENTS, ICSC 2011
Pages from
95
Pages to
101
Pages count
7
BibTex
@inproceedings{BUT74172,
author="Josef {Diblík} and Alena {Baštincová} and Jaromír {Baštinec}",
title="Oscillation of solution of a linear third-order discrete delayed equation",
booktitle="NINTH INTERNATIONAL CONFERENCE ON SOFT COMPUTING APPLIED IN COMPUTER AND ECONOMIC ENVIRONMENTS, ICSC 2011",
year="2011",
pages="95--101",
publisher="EPI",
address="Kunovice",
isbn="978-80-7314-221-6"
}