Two Time-Scale Feedback Stabilization of Linear Time-Varying Singularly Perturbed Systems

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

The stabilization problem for singularly perturbed, large-scale interconnected, discrete-time systems is considered. A simple extension of the small gain theorem is applied to find suficient conditions which ensure the overall system stability in the presence of interconnected,f&t perturbations.

## We develop an adaptive control technique for the regulation of a class of linear, discrete-time, time-varying system. The only a priori knowledge required is a bound of the varying component of the parameters. The result is concerned with global behaviour.

In this paper, the stability of nonlinear time-varying feedback systems is studied using a "passive operator" technique. The feedback system is assumed to consist of a linear time-invariant operator G(s) in the forward path and a nonlinear time-varying gain function f( • )K(t) in the feedback path.

The bounded-input bounded-output stability of feedback control systems with time-varying gain is studied, and both continuous and sampled-data feedback systems are considered. It is shown that if the total gain deviation from a constant is finite, and if the feedback system with that constant gain i

The bounded-input bounded-output stability, finite time stability and settling time of a single-loop feedback system consisting of a nonlinear time-var@ag gain followed by a linear time-invariant system are investigated via a nonlinear integral inequality. The gain has the form k, + k,(t) + k,(t) g(