AbstractWe study conditions under which the solutions of a time varying linear dynamic system of the form xΔ(t)=A(t)x(t) are stable on certain time scales. We give sufficient conditions for various types of stability, including Lyapunov-type stability criteria and eigenvalue conditions on “slowly varying'' systems that ensure exponential stability. Finally, perturbations of the unforced system are investigated, and an instability criterion is also developed
Consider the linear dynamic equation on time scales ( ) ( ) ( ) ( ) ( ) [)0 0 0, ; , ,,Tx t A t...
In this paper, necessary and sufficient numerical conditions for stability and for asymptotic stabil...
In this survey, we introduce the notion of stability of time varying nonlinear systems. In particula...
AbstractWe develop eigenvalue criteria under which the solutions of a “slowly” time varying linear d...
AbstractWe study conditions under which the solutions of a time varying linear dynamic system of the...
AbstractWe develop eigenvalue criteria under which the solutions of a “slowly” time varying linear d...
Abstract. We study conditions under which the solutions of a time vary-ing linear dynamic system of ...
Abstract: This study firstly considers the exponential stability of unforced linear systems of slowl...
We consider Lyapunov stability theory of linear time-varying system and derive sufficient conditions...
AbstractVery recently, a new theory known as set dynamic equations on time scales has been built. In...
In this work, the stability of nonautonomous linear dynamic systems on time scales is investigated a...
We examine the various types of stability for the solutions of linear dynamic systems on time scales...
We investigate the exponential stability of the zero solution to a system of dynamic equa-tions on t...
AbstractIn this paper we examine the stability and instability of the equilibrium solution x = 0 to ...
Abstract—A recent development in Lyapunov stability theory allows for analysis of switched linear sy...
Consider the linear dynamic equation on time scales ( ) ( ) ( ) ( ) ( ) [)0 0 0, ; , ,,Tx t A t...
In this paper, necessary and sufficient numerical conditions for stability and for asymptotic stabil...
In this survey, we introduce the notion of stability of time varying nonlinear systems. In particula...
AbstractWe develop eigenvalue criteria under which the solutions of a “slowly” time varying linear d...
AbstractWe study conditions under which the solutions of a time varying linear dynamic system of the...
AbstractWe develop eigenvalue criteria under which the solutions of a “slowly” time varying linear d...
Abstract. We study conditions under which the solutions of a time vary-ing linear dynamic system of ...
Abstract: This study firstly considers the exponential stability of unforced linear systems of slowl...
We consider Lyapunov stability theory of linear time-varying system and derive sufficient conditions...
AbstractVery recently, a new theory known as set dynamic equations on time scales has been built. In...
In this work, the stability of nonautonomous linear dynamic systems on time scales is investigated a...
We examine the various types of stability for the solutions of linear dynamic systems on time scales...
We investigate the exponential stability of the zero solution to a system of dynamic equa-tions on t...
AbstractIn this paper we examine the stability and instability of the equilibrium solution x = 0 to ...
Abstract—A recent development in Lyapunov stability theory allows for analysis of switched linear sy...
Consider the linear dynamic equation on time scales ( ) ( ) ( ) ( ) ( ) [)0 0 0, ; , ,,Tx t A t...
In this paper, necessary and sufficient numerical conditions for stability and for asymptotic stabil...
In this survey, we introduce the notion of stability of time varying nonlinear systems. In particula...