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Vector dissipativity theory for discrete-time large-scale nonlinear dynamical systems. (English) Zbl 1140.93310

Summary: In analyzing large-scale systems, it is often desirable to treat the overall system as a collection of interconnected subsystems. Solution properties of the large-scale system are then deduced from the solution properties of the individual subsystems and the nature of the system interconnections. In this paper, we develop an analysis framework for discrete-time large-scale dynamical systems based on vector dissipativity notions. Specifically, using vector storage functions and vector supply rates, dissipativity properties of the discrete-time composite large-scale system are shown to be determined from the dissipativity properties of the subsystems and their interconnections. In particular, extended Kalman-Yakubovich-Popov conditions, in terms of the subsystem dynamics and interconnection constraints, characterizing vector dissipativeness via vector system storage functions are derived. Finally, these results are used to develop feedback interconnection stability results for discrete-time large-scale nonlinear dynamical systems using vector Lyapunov functions.

MSC:

93A15 Large-scale systems
93D30 Lyapunov and storage functions
93C10 Nonlinear systems in control theory
70K20 Stability for nonlinear problems in mechanics
93C55 Discrete-time control/observation systems
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