Publication result detail

The stability and asymptotic properties of the Theta-methods for the pantograph equation

ČERMÁK, J.

Original Title

The stability and asymptotic properties of the Theta-methods for the pantograph equation

English Title

The stability and asymptotic properties of the Theta-methods for the pantograph equation

Type

Peer-reviewed article not indexed in WoS or Scopus

Original Abstract

This paper discusses stability and asymptotic properties of a numerical solution of the nonhomogeneous pantograph equation. The utilized discretizations originate from the Theta-methods considered on uniform as well as quasi-geometric mesh.

English abstract

This paper discusses stability and asymptotic properties of a numerical solution of the nonhomogeneous pantograph equation. The utilized discretizations originate from the Theta-methods considered on uniform as well as quasi-geometric mesh.

Keywords

Pantograph equation, Theta-method, stability, asymptotic behaviour

Key words in English

Pantograph equation, Theta-method, stability, asymptotic behaviour

Authors

ČERMÁK, J.

RIV year

2012

Released

01.10.2011

Publisher

Oxford University Press

ISBN

0272-4979

Periodical

IMA JOURNAL OF NUMERICAL ANALYSIS

Volume

31

Number

4

State

United Kingdom of Great Britain and Northern Ireland

Pages from

1533

Pages to

1551

Pages count

19

BibTex

@article{BUT74131,
  author="Jan {Čermák}",
  title="The stability and asymptotic properties of the Theta-methods for the pantograph equation",
  journal="IMA JOURNAL OF NUMERICAL ANALYSIS",
  year="2011",
  volume="31",
  number="4",
  pages="1533--1551",
  issn="0272-4979"
}