Exponential Stability of Volterra Integro Dynamic Equations on Time Scales

Andrejs Reinfelds; Shraddha Christian

doi:10.3390/math13243918

Exponential Stability of Volterra Integro Dynamic Equations on Time Scales

Andrejs Reinfelds^*
, Shraddha Christian^*

^*Corresponding author for this work

University of Latvia
Riga Technical University

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper, we give new sufficient conditions for boundedness and exponential stability of solutions for nonlinear Volterra integro dynamic equations from above on unbounded time scales using first Lyapunovs method. To prove this result we reduce the n-dimensional problem to the corresponding scalar one using the concept of matrix measure and a new simpler proof of Coppel’s inequality on the time scales. There is an example that illustrates the conditions of the theorem.

Original language	English
Article number	3918
Journal	Mathematics
Volume	13
Issue number	24
DOIs	https://doi.org/10.3390/math13243918
Publication status	Published - Dec 2025
Externally published	Yes

Keywords

boundedness
Coppel’s inequality
exponential stability
matrix measure
time scales
Volterra integro dynamic equations

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10.3390/math13243918

Cite this

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abstract = "In this paper, we give new sufficient conditions for boundedness and exponential stability of solutions for nonlinear Volterra integro dynamic equations from above on unbounded time scales using first Lyapunovs method. To prove this result we reduce the n-dimensional problem to the corresponding scalar one using the concept of matrix measure and a new simpler proof of Coppel{\textquoteright}s inequality on the time scales. There is an example that illustrates the conditions of the theorem.",

keywords = "boundedness, Coppel{\textquoteright}s inequality, exponential stability, matrix measure, time scales, Volterra integro dynamic equations",

author = "Andrejs Reinfelds and Shraddha Christian",

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AU - Christian, Shraddha

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N2 - In this paper, we give new sufficient conditions for boundedness and exponential stability of solutions for nonlinear Volterra integro dynamic equations from above on unbounded time scales using first Lyapunovs method. To prove this result we reduce the n-dimensional problem to the corresponding scalar one using the concept of matrix measure and a new simpler proof of Coppel’s inequality on the time scales. There is an example that illustrates the conditions of the theorem.

AB - In this paper, we give new sufficient conditions for boundedness and exponential stability of solutions for nonlinear Volterra integro dynamic equations from above on unbounded time scales using first Lyapunovs method. To prove this result we reduce the n-dimensional problem to the corresponding scalar one using the concept of matrix measure and a new simpler proof of Coppel’s inequality on the time scales. There is an example that illustrates the conditions of the theorem.

KW - boundedness

KW - Coppel’s inequality

KW - exponential stability

KW - matrix measure

KW - time scales

KW - Volterra integro dynamic equations

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DO - 10.3390/math13243918

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ER -

Exponential Stability of Volterra Integro Dynamic Equations on Time Scales

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Keywords

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