The asymptotic stability of the equilibrium of parametrically perturbed systems

A method of investigating the stability of non-linear systems acted upon by unsteady perturbations is proposed, based on the use of Lyapunov's second method. The sufficient conditions for asymptotic stability of the solutions of non-autonomous systems in critical cases are obtained.

The asymptotic behavior of the solutions of a class of functional-difference equations is studied. The results obtained, which are applied to delay difference equations and summary difference equations, give good estimates and explicit radius of attraction. ~

An upper bound for the singular perturbation parameter is found for the uniform asymptotic stability of singularly perturbed linear time-varying systems.

## Sufficient conditions are obtained lo guarantee the asymptotic stability of a class of non-linear singularly perturbed systems. A procedure for consrructing a Lyapunov function for such a class of systems is given, and a clearly defined domain of attraction of the equilibrium is obtained. A sta