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\$

English Title

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

Type

conference paper

Language

en

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.

English 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.

Released

31.01.2017

Publisher

Slovak University of Technology

Location

Bratislava

ISBN

978-80-227-4650-2

Book

Aplimat 2017, 16th Conference on Applied Mathematcs, Proceedings

Edition

First Edition

Edition number

1

Pages from

454

Pages to

460

Pages count

7

URL

Documents

BibTex

``````
@inproceedings{BUT132912,
author="Jan {Šafařík} and Josef {Diblík}",
title="Solution of weakly delayed linear discrete systems in \$R^3\$",
annote="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.",