Publication result detail

Stability regions for linear fractional differential systems and their discretizations

ČERMÁK, J.; KISELA, T.; NECHVÁTAL, L.

Original Title

Stability regions for linear fractional differential systems and their discretizations

English Title

Stability regions for linear fractional differential systems and their discretizations

Type

Peer-reviewed article not indexed in WoS or Scopus

Original Abstract

This paper concerns with basic stability properties of linear autonomous fractional differential and difference systems involving derivative operators of the Riemann-Liouville type. We derive stability regions for special discretizations of the studied fractional differential systems including a precise description of their asymptotics.

English abstract

This paper concerns with basic stability properties of linear autonomous fractional differential and difference systems involving derivative operators of the Riemann-Liouville type. We derive stability regions for special discretizations of the studied fractional differential systems including a precise description of their asymptotics.

Keywords

Fractional differential system; fractional difference system; asymptotic stability; Laplace transform

Key words in English

Fractional differential system; fractional difference system; asymptotic stability; Laplace transform

Authors

ČERMÁK, J.; KISELA, T.; NECHVÁTAL, L.

RIV year

2014

Released

15.02.2013

ISBN

0096-3003

Periodical

APPLIED MATHEMATICS AND COMPUTATION

Volume

219

Number

12

State

United States of America

Pages from

7012

Pages to

7022

Pages count

11

BibTex

@article{BUT95733,
  author="Jan {Čermák} and Tomáš {Kisela} and Luděk {Nechvátal}",
  title="Stability regions for linear fractional differential systems and their discretizations",
  journal="APPLIED MATHEMATICS AND COMPUTATION",
  year="2013",
  volume="219",
  number="12",
  pages="7012--7022",
  issn="0096-3003"
}