Publication detail

Power asymptotics of solutions to the discrete Emden-Fowler type Equation

KOROBKO, E. DIBLÍK, J.

Original Title

Power asymptotics of solutions to the discrete Emden-Fowler type Equation

English Title

Power asymptotics of solutions to the discrete Emden-Fowler type Equation

Type

conference paper

Language

en

Original Abstract

The paper discusses the existence of solutions to the Emden-Fowler type difference equation with a power asymptotics. To prove the result, the given equation is transformed into an equivalent system of difference equations. Then a result on the existence of solutions with graphs remaining in a previously given domain, is applied.

English abstract

The paper discusses the existence of solutions to the Emden-Fowler type difference equation with a power asymptotics. To prove the result, the given equation is transformed into an equivalent system of difference equations. Then a result on the existence of solutions with graphs remaining in a previously given domain, is applied.

Keywords

difference equation; Emden-Fowler type equation; power asymptotics; equivalent system

Released

16.06.2020

ISBN

978-80-7582-307-6

Book

Matematika, Informační technologie a aplikované vědy (MITAV 2020)

Pages from

1

Pages to

10

Pages count

10

Documents

BibTex


@inproceedings{BUT164368,
  author="Evgeniya {Korobko} and Josef {Diblík}",
  title="Power asymptotics of solutions to the discrete Emden-Fowler type Equation",
  annote="The paper discusses the existence of solutions to the Emden-Fowler type difference equation with  a power asymptotics. To prove the result, the given equation is transformed into an equivalent system of difference equations. Then a result on the existence of solutions with graphs remaining in a previously given domain, is applied.",
  booktitle="Matematika, Informační technologie a aplikované vědy (MITAV 2020)",
  chapter="164368",
  howpublished="electronic, physical medium",
  year="2020",
  month="june",
  pages="1--10",
  type="conference paper"
}