Control theory from the geometric viewpoint / Andrei A. Agrachev, Yuri L. Sachkov.
Tipo de material: TextoIdioma: Inglés Series Encyclopaedia of mathematical sciences ; 87. | Control theory and optimization ; 2. | Encyclopaedia of mathematical sciences ; v. 87. | Encyclopaedia of mathematical sciences. Control theory and optimization ; ; 2.Fecha de copyright: Berlin ; New York : Springer, 2004Edición: First EditionDescripción: xiv, 412 pages : illustrations ; 25 cmISBN:- 9783540210191 (acidfree paper)
- 3540210199 (acidfree paper)
- 515.642 23
- QA402.3 .A374 2004
Tipo de ítem | Biblioteca actual | Signatura | Copia número | Estado | Fecha de vencimiento | Código de barras | Reserva de ítems | |
---|---|---|---|---|---|---|---|---|
Colección general | Biblioteca Yachay Tech | 515.642 A2771c 2004 (Navegar estantería(Abre debajo)) | Ej. 1 | Disponible | 005733 |
Includes index.
Includes bibliographical references (pages [399]-406) and index.
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 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 of optimality conditions -- 21 Jacobi equation -- 22 Reduction -- 23 Curvature -- 24 Rolling bodies.
This book presents some facts and methods of Mathematical Control Theory treated from the geometric viewpoint. It is devoted to finite-dimensional deterministic control systems governed by smooth ordinary differential equations. The problems of controllability, state and feedback equivalence, and optimal control are studied. Some of the topics treated by the authors are covered in monographic or textbook literature for the first time while others are presented in a more general and flexible setting than elsewhere. Although being fundamentally written for mathematicians, the authors make an attempt to reach both the practitioner and the theoretician by blending the theory with applications. They maintain a good balance between the mathematical integrity of the text and the conceptual simplicity that might be required by engineers. It can be used as a text for graduate courses and will become most valuable as a reference work for graduate students and researchers.
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