Publication detail

Solution of weakly delayed linear discrete systems in $R^3$

ŠAFAŘÍK, J. DIBLÍK, J.

Original Title

Solution of weakly delayed linear discrete systems in $R^3$

Type

abstract

Language

English

Original Abstract

In the paper we investigate weakly delayed linear discrete systems with constant delay $$x(k+1) = Ax(k) + Bx(k-m), k = 0, 1, \dots, m,$$ in $\mathbb{R}^3$. Conditions for the system to be a weakly delayed system are given and the initial problem is explicitely solved in one of possible cases.

Keywords

Discrete system, weakly delayed system, linear system, initial problem.

Authors

ŠAFAŘÍK, J.; DIBLÍK, J.

Released

31. 1. 2017

Publisher

Slovak University of Technology

Location

Bratislava

ISBN

978-80-227-4649-6

Book

Aplimat 2017, 16th Conference on Applied Mathematcs, Book of Abstracts

Edition number

1

Pages from

91

Pages to

92

Pages count

2

URL

BibTex

@misc{BUT132880,
  author="Jan {Šafařík} and Josef {Diblík}",
  title="Solution of weakly delayed linear discrete systems in $R^3$",
  booktitle="Aplimat 2017, 16th Conference on Applied Mathematcs, Book of Abstracts",
  year="2017",
  edition="1",
  pages="91--92",
  publisher="Slovak University of Technology",
  address="Bratislava",
  isbn="978-80-227-4649-6",
  url="http://evlm.stuba.sk/APLIMAT/",
  note="abstract"
}