Stabilization of singularly perturbed largescale interconnected discrete-time systems

Studies on discrete-time system analysis and design via singular perturbations and time-scale methods have been developed in recent years. Representative issues and results of modelling, analysis and control have been reviewed by Naidu et al. These studies can be classified into the slow-time-scale

## The stabilization of a class of singularly perturbed linear time-varying systems is considered through the separate stabihzation of two lower dimensional subsystems in two different time-scales. A composite stabilizing controller is synthesized from the separate stabilizing controllers of the t

In this paper, we consider the problem of finite-time H -optimal control of linear, singularly perturbed, discrete-time systems. The problem is addressed from the game theoretic approach. This leads to a singularly perturbed, matrix Riccati difference equation, the solution of which is given in term

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

In this paper, a singular perturbation approach is presented to study discrete systems with stochastic jump parameters. The feedback controller design is decomposed into the design of slow and fast controllers which are combined to form the composite control. The multirate control structure allows t