Publication detail
Weighted asymptotically periodic solutions of linear volterra difference equations
DIBLÍK, J. RŮŽIČKOVÁ, M. SCHMEIDEL, E. ZBASZYNIAK, M.
Original Title
Weighted asymptotically periodic solutions of linear volterra difference equations
Type
journal article - other
Language
English
Original Abstract
A linear Volterra difference equation of the form $$ x(n+1)=a(n)+b(n)x(n)+\sum\limits^{n}_{i=0}K(n,i)x(i) $$ where $x\colon\bN_0\to\bR$, $a\colon \bN_0\to\bR$, $K\colon\bN_0\times\bN_0\to \bR$ and $b\colon\bN_0 \to \bR\setminus\{0\}$ is $\omega$-periodic is considered. Sufficient conditions for the existence of weighted asymptotically periodic solutions of this equation are obtained. Unlike previous investigations, no restriction on $\prod_{j=0}^{\omega-1}b(j)$ is assumed. The results generalize some of the recent results.
Keywords
Linear Volterra difference equation, weighted asymptotically periodic solution
Authors
DIBLÍK, J.; RŮŽIČKOVÁ, M.; SCHMEIDEL, E.; ZBASZYNIAK, M.
RIV year
2011
Released
3. 8. 2011
ISBN
1085-3375
Periodical
Abstract and Applied Analysis
Year of study
2011
Number
1
State
United States of America
Pages from
1
Pages to
14
Pages count
14
BibTex
@article{BUT72873,
author="Josef {Diblík} and Miroslava {Růžičková} and Ewa {Schmeidel} and Malgorzata {Zbaszyniak}",
title="Weighted asymptotically periodic solutions of linear volterra difference equations",
journal="Abstract and Applied Analysis",
year="2011",
volume="2011",
number="1",
pages="1--14",
issn="1085-3375"
}