Control Theory from the Geometric Viewpoint / by Andrei A. Agrachev, Yuri L. Sachkov
(Encyclopaedia of Mathematical Sciences, Control Theory and Optimization II ; 87)
| データ種別 | 電子ブック |
|---|---|
| 出版情報 | Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer , 2004 |
| 本文言語 | 英語 |
| 大きさ | XIV, 412 p : online resource |
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| 内容注記 | 1 Vector Fields and Control Systems on Smooth Manifolds 2 Elements of Chronological Calculus 3 Linear Systems 4 State Linearizability of Nonlinear Systems 5 The Orbit Theorem and its Applications 6 Rotations of the Rigid Body 7 Control of Configurations 8 Attainable Sets 9 Feedback and State Equivalence of Control Systems 10 Optimal Control Problem 11 Elements of Exterior Calculus and Symplectic Geometry 12 Pontryagin Maximum Principle 13 Examples of Optimal Control Problems 14 Hamiltonian Systems with Convex Hamiltonians 15 Linear Time-Optimal Problem 16 Linear-Quadratic Problem 17 Sufficient Optimality Conditions, Hamilton-Jacobi Equation, and Dynamic Programming 18 Hamiltonian Systems for Geometric Optimal Control Problems 19 Examples of Optimal Control Problems on Compact Lie Groups 20 Second Order Optimality Conditions 21 Jacobi Equation 22 Reduction 23 Curvature 24 Rolling Bodies A Appendix A.2 Remainder Term of the Chronological Exponential References List of Figures |
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| 一般注記 | This book presents some facts and methods of the Mathematical Control Theory treated from the geometric point of view. The book is mainly based on graduate courses given by the first coauthor in the years 2000-2001 at the International School for Advanced Studies, Trieste, Italy. Mathematical prerequisites are reduced to standard courses of Analysis and Linear Algebra plus some basic Real and Functional Analysis. No preliminary knowledge of Control Theory or Differential Geometry is required. What this book is about? The classical deterministic physical world is described by smooth dynamical systems: the future in such a system is com pletely determined by the initial conditions. Moreover, the near future changes smoothly with the initial data. If we leave room for "free will" in this fatalistic world, then we come to control systems. We do so by allowing certain param eters of the dynamical system to change freely at every instant of time. That is what we routinely do in real life with our body, car, cooker, as well as with aircraft, technological processes etc. We try to control all these dynamical systems! Smooth dynamical systems are governed by differential equations. In this book we deal only with finite dimensional systems: they are governed by ordi nary differential equations on finite dimensional smooth manifolds. A control system for us is thus a family of ordinary differential equations. The family is parametrized by control parameters |
| 著者標目 | *Agrachev, Andrei A. author Sachkov, Yuri L. author SpringerLink (Online service) |
| 件 名 | LCSH:Mathematics LCSH:System theory FREE:Mathematics FREE:Systems Theory, Control |
| 分 類 | DC23:519 |
| 巻冊次 | ISBN:9783662064047 
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| ISBN | 9783662064047 |
| URL | http://dx.doi.org/10.1007/978-3-662-06404-7 |
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※2021年9月12日以降