Publication detail

Unbounded increasing solutions of a system of difference equations with delays

DIBLÍK, J. CHUPÁČ, R. RŮŽIČKOVÁ, M.

Original Title

Unbounded increasing solutions of a system of difference equations with delays

English Title

Unbounded increasing solutions of a system of difference equations with delays

Type

journal article in Web of Science

Language

en

Original Abstract

A a homogeneous system of difference equations with deviating arguments is considered. The asymptotic behavior of solutions is discussed. The existence of unbounded increasing solutions in an exponential form is proved and estimates of solutions are given. The scalar case is discussed as well.

English abstract

A a homogeneous system of difference equations with deviating arguments is considered. The asymptotic behavior of solutions is discussed. The existence of unbounded increasing solutions in an exponential form is proved and estimates of solutions are given. The scalar case is discussed as well.

Keywords

Unbounded solution; system of difference equations; discrete delay; exponential form

RIV year

2015

Released

15.01.2015

Publisher

Elsevier

ISBN

0096-3003

Periodical

APPLIED MATHEMATICS AND COMPUTATION

Year of study

2015

Number

251

State

US

Pages from

489

Pages to

498

Pages count

10

URL

Documents

BibTex


@article{BUT119641,
  author="Josef {Diblík} and Radoslav {Chupáč} and Miroslava {Růžičková}",
  title="Unbounded increasing solutions of a system of difference equations with delays",
  annote="A a homogeneous system of difference equations with deviating arguments is considered. The asymptotic behavior of
solutions is discussed. The existence of unbounded increasing solutions in an exponential form is proved and estimates of
solutions are given. The scalar case is discussed as well.",
  address="Elsevier",
  chapter="119641",
  doi="10.1016/j.amc.2014.11.075",
  howpublished="print",
  institution="Elsevier",
  number="251",
  volume="2015",
  year="2015",
  month="january",
  pages="489--498",
  publisher="Elsevier",
  type="journal article in Web of Science"
}