Publication detail
Stability properties of a discretized neutral delay differential equation
HRABALOVÁ, J.
Czech title
Stability properties of a discretized neutral delay differential equation
English title
Stability properties of a discretized neutral delay differential equation
Type
journal article - other
Language
en
Original abstract
The paper discusses the asymptotic stability region of a discretization of a linear neutral delay differential equation $${x'}(t) = a x(t-\tau) + b {x'}(t-\tau).$$ We present necessary and sufficient conditions specifying this region and describe some of its properties.
Czech abstract
The paper discusses the asymptotic stability region of a discretization of a linear neutral delay differential equation $${x'}(t) = a x(t-\tau) + b {x'}(t-\tau).$$ We present necessary and sufficient conditions specifying this region and describe some of its properties.
English abstract
The paper discusses the asymptotic stability region of a discretization of a linear neutral delay differential equation $${x'}(t) = a x(t-\tau) + b {x'}(t-\tau).$$ We present necessary and sufficient conditions specifying this region and describe some of its properties.
Keywords in Czech
delay differential and difference equation, neutral type, asymptotic stability, the Euler method
Keywords in English
delay differential and difference equation, neutral type, asymptotic stability, the Euler method
RIV year
2013
Released
29.05.2013
ISSN
1210-3195
Volume
2013
Number
54
Pages from–to
83–92
Pages count
10
BIBTEX
@article{BUT99140,
author="Jana {Dražková},
title="Stability properties of a discretized neutral delay differential equation",
year="2013",
volume="2013",
number="54",
month="May",
pages="83--92",
issn="1210-3195"
}