On decentralized stabilization of linear large scale systems with symmetric circulant structure

Connective stabilizability of large-scale systems, which are composed of interconnected subsystems, is considered using decentralized feedback. Both analytical and graph-theoretic conditions are derived directly in terms of the interconnection structure, which ensure that stability of the overall cl

The present paper is" concerned with the decentralized stabilization problem jor a class o[large-seale systems with time-varying interconnected matrices and nonlinear uncertainties. A new st{fficien t condition is proposedjor ao'mptoticallv stabilizing the large-scale perturbed systems with a prescr

This paper is concerned with a problem of stabilization and robust control design for interconnected uncertain systems. A new class of uncertain large-scale systems is considered in which interconnections between subsystems as well as uncertainties in each subsystem are described by integral quadrat

A number of large-scale interconnected systems often encountered in practice are composed of subsystems with similar dynamics interconnected in a symmetrical fashion and the synthesis of controllers for such systems must exploit the special structural properties in order to avoid overly conservative