Add to ORKGWe examine the conditions of asymptotic stability of second-order linear dynamic equations on time scales. To establish asymptotic stability we prove the stability estimates by using integral representations of the solutions via asymptotic solutions, error estimates, and calculus on time scales.</p
Stability of dynamic equations on time scales is investigated in this paper. The main results are ne...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
Stability of dynamic equations on time scale is analyzed. The main results are new conditions of sta...
This paper is dedicated to Dr. Lynn Erbe ABSTRACT.We establish the stability of second-order linear ...
We consider linear dynamic systems on time scales, which contain as special cases linear differentia...
We investigate the exponential stability of the zero solution to a system of dynamic equations on t...
We prove several growth theorems for second-order dynamic equations on time scales. These theorems c...
Abstract. We discuss a number of recent results for second order linear and nonlinear dynamic equati...
AbstractUtilizing the theory of dynamic systems on time scales, which unifies the theory of continuo...
We investigate the exponential stability of the zero solution to a system of dynamic equa-tions on t...
We examine the various types of stability for the solutions of linear dynamic systems on time scales...
In this paper, we obtain sufficient conditions for Hyers–Ulam and Hyers–Ulam–Rassias stability of an...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
As a way to unify a discussion of many kinds of problems for equations in the contionous and discret...
Stability of dynamic equations on time scales is investigated in this paper. The main results are ne...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
Stability of dynamic equations on time scale is analyzed. The main results are new conditions of sta...
This paper is dedicated to Dr. Lynn Erbe ABSTRACT.We establish the stability of second-order linear ...
We consider linear dynamic systems on time scales, which contain as special cases linear differentia...
We investigate the exponential stability of the zero solution to a system of dynamic equations on t...
We prove several growth theorems for second-order dynamic equations on time scales. These theorems c...
Abstract. We discuss a number of recent results for second order linear and nonlinear dynamic equati...
AbstractUtilizing the theory of dynamic systems on time scales, which unifies the theory of continuo...
We investigate the exponential stability of the zero solution to a system of dynamic equa-tions on t...
We examine the various types of stability for the solutions of linear dynamic systems on time scales...
In this paper, we obtain sufficient conditions for Hyers–Ulam and Hyers–Ulam–Rassias stability of an...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
As a way to unify a discussion of many kinds of problems for equations in the contionous and discret...
Stability of dynamic equations on time scales is investigated in this paper. The main results are ne...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
Stability of dynamic equations on time scale is analyzed. The main results are new conditions of sta...