Publication detail
On stability intervals of Euler methods for a delay differential equation
HRABALOVÁ, J.
Czech title
On stability intervals of Euler methods for a delay differential equation
English title
On stability intervals of Euler methods for a delay differential equation
Type
conference paper
Language
en
Original abstract
The paper discusses the asymptotic stability regions of Euler discretizations for a linear delay differential equation y'(t) = a y(t-\tau). We compare our results with the asymptotic stability domain for the underlying delay differential equation.
Czech abstract
The paper discusses the asymptotic stability regions of Euler discretizations for a linear delay differential equation y'(t) = a y(t-\tau). We compare our results with the asymptotic stability domain for the underlying delay differential equation.
English abstract
The paper discusses the asymptotic stability regions of Euler discretizations for a linear delay differential equation y'(t) = a y(t-\tau). We compare our results with the asymptotic stability domain for the underlying delay differential equation.
Keywords in Czech
delay differential equation, Euler methods, asymptotic stability
Keywords in English
delay differential equation, Euler methods, asymptotic stability
RIV year
2012
Released
07.02.2012
Publisher
Aplimat
Location
Bratislava
ISBN
978-80-89313-58-7
Book
APLIMAT 11th INTERNATIONAL CONFERENCE
Pages from–to
153–160
Pages count
8
BIBTEX
@inproceedings{BUT89854,
author="Jana {Dražková},
title="On stability intervals of Euler methods for a delay differential equation",
booktitle="APLIMAT 11th INTERNATIONAL CONFERENCE",
year="2012",
month="February",
pages="153--160",
publisher="Aplimat",
address="Bratislava",
isbn="978-80-89313-58-7"
}