AbstractWe study the h-stability for linear dynamic equations on time scales and their perturbations by using the Bihari type inequality on time scales and the unified time scale quadratic Lyapunov functions
Abstract. This is an introductory article about the dynamic equations on time scales. The foundation...
Using nonnegative definite Lyapunov functionals, we prove general theorems for the boundedness of al...
AbstractThe study of dynamic equations on time scales, which goes back to its founder Stefan Hilger ...
Dichotomic maps are used to check the stability of ordinary differential equations and difference eq...
We study the h-stability of dynamic equations on time scales, without the regressivity condition on ...
AbstractVery recently, a new theory known as set dynamic equations on time scales has been built. In...
AbstractWe study conditions under which the solutions of a time varying linear dynamic system of the...
We study the h-stability of dynamic equations on time scales, without the regressivity condition on ...
AbstractIn this paper we examine the stability and instability of the equilibrium solution x = 0 to ...
We first give conditions which guarantee that every solution of a first order linear delay dynamic e...
AbstractA new theory known as set dynamic equations on time scales has been built. The criteria for ...
AbstractWe give sufficient conditions under which the trivial solution of a nonlinear dynamic equati...
AbstractIn this paper, by using elementary analysis, we establish several new Lyapunov type inequali...
The existence of a Lyapunov function is established following a method of Yoshizawa for the uniform ...
AbstractUtilizing the theory of dynamic systems on time scales, which unifies the theory of continuo...
Abstract. This is an introductory article about the dynamic equations on time scales. The foundation...
Using nonnegative definite Lyapunov functionals, we prove general theorems for the boundedness of al...
AbstractThe study of dynamic equations on time scales, which goes back to its founder Stefan Hilger ...
Dichotomic maps are used to check the stability of ordinary differential equations and difference eq...
We study the h-stability of dynamic equations on time scales, without the regressivity condition on ...
AbstractVery recently, a new theory known as set dynamic equations on time scales has been built. In...
AbstractWe study conditions under which the solutions of a time varying linear dynamic system of the...
We study the h-stability of dynamic equations on time scales, without the regressivity condition on ...
AbstractIn this paper we examine the stability and instability of the equilibrium solution x = 0 to ...
We first give conditions which guarantee that every solution of a first order linear delay dynamic e...
AbstractA new theory known as set dynamic equations on time scales has been built. The criteria for ...
AbstractWe give sufficient conditions under which the trivial solution of a nonlinear dynamic equati...
AbstractIn this paper, by using elementary analysis, we establish several new Lyapunov type inequali...
The existence of a Lyapunov function is established following a method of Yoshizawa for the uniform ...
AbstractUtilizing the theory of dynamic systems on time scales, which unifies the theory of continuo...
Abstract. This is an introductory article about the dynamic equations on time scales. The foundation...
Using nonnegative definite Lyapunov functionals, we prove general theorems for the boundedness of al...
AbstractThe study of dynamic equations on time scales, which goes back to its founder Stefan Hilger ...