In this paper, we introduce various definitions of practical stability and integral stability for nonlinear singular differential systems with maxima and give criteria of stability for such systems via the Lyapunov method and comparison principle
Abstract—This technical note investigates the absolute stability problem for Lur’e singularly pertur...
It is known that practical stability is neither stronger nor weaker than Lyapunov stability. In this...
In this article we present an ordinary differential equation based technique to study the quadratic ...
The stability of nonlinear systems is analyzed by the direct Lyapunov’s method in terms of Lyapunov ...
This is the first book that deals with practical stability and its development. It presents a system...
Singular systems which are also referred to as descriptor systems, semi-state systems, differential-...
AbstractUsing new and known forms of Lyapunov functionals, this paper proposes new stability criteri...
The strict stability notions were systematically developed and sufficient conditions for such concep...
AbstractIn the first section, stability-like definitions for ordinary differential equations are der...
Abstract. New sufficient conditions of the Lp-stability and the Lp-integral stability in terms of tw...
The concept of practical stability is generalized to nonlinear differential equations with non-insta...
It is proved (necessary and) suficient conditions for Ψ conditional stability of the trivial solutio...
The book investigates stability theory in terms of two different measure, exhibiting the advantage o...
A stability criterion for nonlinear systems is presented and can be viewed as a dual to Lyapunov's s...
The aim of this paper is to apply Lyapunov functions to obtain some necessary and sufficient conditi...
Abstract—This technical note investigates the absolute stability problem for Lur’e singularly pertur...
It is known that practical stability is neither stronger nor weaker than Lyapunov stability. In this...
In this article we present an ordinary differential equation based technique to study the quadratic ...
The stability of nonlinear systems is analyzed by the direct Lyapunov’s method in terms of Lyapunov ...
This is the first book that deals with practical stability and its development. It presents a system...
Singular systems which are also referred to as descriptor systems, semi-state systems, differential-...
AbstractUsing new and known forms of Lyapunov functionals, this paper proposes new stability criteri...
The strict stability notions were systematically developed and sufficient conditions for such concep...
AbstractIn the first section, stability-like definitions for ordinary differential equations are der...
Abstract. New sufficient conditions of the Lp-stability and the Lp-integral stability in terms of tw...
The concept of practical stability is generalized to nonlinear differential equations with non-insta...
It is proved (necessary and) suficient conditions for Ψ conditional stability of the trivial solutio...
The book investigates stability theory in terms of two different measure, exhibiting the advantage o...
A stability criterion for nonlinear systems is presented and can be viewed as a dual to Lyapunov's s...
The aim of this paper is to apply Lyapunov functions to obtain some necessary and sufficient conditi...
Abstract—This technical note investigates the absolute stability problem for Lur’e singularly pertur...
It is known that practical stability is neither stronger nor weaker than Lyapunov stability. In this...
In this article we present an ordinary differential equation based technique to study the quadratic ...