Controllability of Composite Dynamical Systems
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Beschreibung
This book addresses the controllability problems of composite linear dynamic systems and systems with multipoint intermediate conditions. It investigates the motion of controlled composite systems and constructs an explicit form of the motion for controlled composite linear systems. Particular attention is devoted to the necessary and sufficient conditions for complete controllability and observability of composite linear systems, which, in the stationary case, are comparable in completeness to the Kalman conditions. The qualitative properties of controllability and observability of composite systems, as well as of the controllability of composite systems using a dynamic controller, are explored. Constructive methods are proposed for solving control problems of composite systems, systems with non-separated multipoint intermediate conditions, and systems with constraints on the values of different parts of the phase vector coordinates at intermediate times. Explicit solutions to control problems, optimal control, and stabilization are constructed as applications to specific problems in composite systems and dynamic systems with multipoint intermediate conditions. The mathematical models of these systems are described by both ordinary differential equations and partial differential equations.
The volume is intended for a broad range of specialists in applied mathematics and theoretical mechanics working in control and observation theory, mathematical modeling, systems analysis, and their applications, as well as for graduate and undergraduate students specializing in these fields.
This book addresses the controllability problems of composite linear dynamic systems and systems with multipoint intermediate conditions. It investigates the motion of controlled composite systems and constructs an explicit form of the motion for controlled composite linear systems. Particular attention is devoted to the necessary and sufficient conditions for complete controllability and observability of composite linear systems, which, in the stationary case, are comparable in completeness to the Kalman conditions. The qualitative properties of controllability and observability of composite systems, as well as of the controllability of composite systems using a dynamic controller, are explored. Constructive methods are proposed for solving control problems of composite systems, systems with non-separated multipoint intermediate conditions, and systems with constraints on the values of different parts of the phase vector coordinates at intermediate times. Explicit solutions to control problems, optimal control, and stabilization are constructed as applications to specific problems in composite systems and dynamic systems with multipoint intermediate conditions. The mathematical models of these systems are described by both ordinary differential equations and partial differential equations.
The volume is intended for a broad range of specialists in applied mathematics and theoretical mechanics working in control and observation theory, mathematical modeling, systems analysis, and their applications, as well as for graduate and undergraduate students specializing in these fields.
Investigates controllability and observability conditions for composite linear dynamic systems Constructs explicit motion solutions for controlled composite systems with multipoint conditions Offers constructive methods for solving optimal control and stabilization in composite systems
Autor*in
Vanya R. Barseghyan
Themen in »Controllability of Composite Dynamical Systems«
Composite linear dynamic systems step-by-step changing system controllability of linear systems multipoint intermediate conditions observability of linear systems Dynamic controller Ordinary differential equations Partial differential equations Mathematical modeling Theoretical mechanics and system dynamics Control of ODE systems Control of PDE systems Applied mathematics in control