Publication detail

On relative controllability of delayed difference equations with multiple control functions

POSPÍŠIL, M. DIBLÍK, J. FEČKAN, M.

Original Title

On relative controllability of delayed difference equations with multiple control functions

English Title

On relative controllability of delayed difference equations with multiple control functions

Type

conference paper

Language

en

Original Abstract

An n-dimensional linear difference equation with a delay and a vector control function is considered. An equivalent condition for relative controllability is stated, and a complete characterization of control functions is given. Moreover, a sufficient condition for relative controllability of weakly nonlinear difference equation is proved.

English abstract

An n-dimensional linear difference equation with a delay and a vector control function is considered. An equivalent condition for relative controllability is stated, and a complete characterization of control functions is given. Moreover, a sufficient condition for relative controllability of weakly nonlinear difference equation is proved.

Keywords

Delay equation; matrix polynomial; control function

RIV year

2015

Released

10.03.2015

Publisher

American Institute of Physics

Location

Melville, New York

ISBN

978-0-7354-1287-3

Book

Proceedings of the International Conference on Numerical Analysis and Applied Mathematics 2014 (ICNAAM-2014)

Pages from

130001-1

Pages to

130001-4

Pages count

4

Documents

BibTex


@inproceedings{BUT114458,
  author="Michal {Pospíšil} and Josef {Diblík} and Michal {Fečkan}",
  title="On relative controllability of delayed difference equations with multiple control functions",
  annote="An n-dimensional linear difference equation with a delay and a vector control function is considered. An equivalent condition for relative controllability is stated, and a complete characterization of control functions is given. Moreover, a sufficient condition for relative controllability of weakly nonlinear difference equation is proved.",
  address="American Institute of Physics",
  booktitle="Proceedings of the International Conference on Numerical Analysis and Applied Mathematics 2014 (ICNAAM-2014)",
  chapter="114458",
  doi="10.1063/1.4912420",
  howpublished="electronic, physical medium",
  institution="American Institute of Physics",
  number="1",
  year="2015",
  month="march",
  pages="130001-1--130001-4",
  publisher="American Institute of Physics",
  type="conference paper"
}