Detail publikace

Exponential Stability of Linear Discrete Systems with Delay

Originální název

Exponential Stability of Linear Discrete Systems with Delay

Anglický název

Exponential Stability of Linear Discrete Systems with Delay

Jazyk

en

Originální abstrakt

The paper studies the exponential stability to a linear system of difference equations with delay x (k + 1) = A(k)x (k) + B(k)x (k - m(k)) , k = 0, 1, ... where A(k), B(k) are square constant matrices. New sufficient conditions for exponential stability are derived and illustrated by an example.

Anglický abstrakt

The paper studies the exponential stability to a linear system of difference equations with delay x (k + 1) = A(k)x (k) + B(k)x (k - m(k)) , k = 0, 1, ... where A(k), B(k) are square constant matrices. New sufficient conditions for exponential stability are derived and illustrated by an example.

BibTex


@inproceedings{BUT150438,
  author="Josef {Diblík} and Denys {Khusainov} and Miroslava {Růžičková}",
  title="Exponential Stability of Linear Discrete Systems with Delay",
  annote="The paper studies the exponential stability to a linear system of difference equations with delay x (k + 1) = A(k)x (k) + B(k)x (k - m(k)) ,  k = 0, 1, ... where A(k), B(k) are square constant matrices. New sufficient conditions for exponential stability are derived and illustrated by an example.",
  address="American Institute of Physics",
  booktitle="INTERNATIONAL CONFERENCE OF NUMERICAL ANALYSIS AND APPLIED MATHEMATICS (ICNAAM 2017)",
  chapter="150438",
  doi="10.1063/1.5044019",
  howpublished="online",
  institution="American Institute of Physics",
  year="2018",
  month="july",
  pages="430004-1--430004-4",
  publisher="American Institute of Physics",
  type="conference paper"
}