1. Positivity and Stability of Delayed Timescale-Type Differential-Difference Equations.
- Author
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Xiao, Qiang, Zeng, Zhigang, Huang, Tingwen, and Lewis, Frank L.
- Subjects
- *
DIFFERENTIAL-difference equations , *OPTIMISM , *EXPONENTIAL stability , *LINEAR systems , *TIME-varying systems - Abstract
In this article, positivity and global exponential stability for a class of timescale-type differential-difference equations with bounded time-varying delay are considered. At first, a sufficient and necessary condition for the positivity of matrix-valued timescale-type exponential function is obtained. Based on this, an explicit criterion for the positivity of coupled timescale-type differential-difference equations with delays bounded above is acquired by timescale-type induction method. Besides, a sufficient and necessary condition of its positivity is obtained when the delay is both bounded above and below by two positive reals. Then, a concise criterion that guarantees the global exponential stability of the considered system is derived based upon analytical techniques of time scales and positivity constraint. On top of that, the theoretical results are applied to investigate the positivity and stability for a class of timescale-type neutral linear systems with bounded time-varying delays. Two numerical examples are given to illustrate the validity of the results. [ABSTRACT FROM AUTHOR]
- Published
- 2021
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