The calculus of variations and functional analysis : with optimal control and applications in mechanics /

This is a book for those who want to understand the main ideas in the theory of optimal problems. It provides a good introduction to classical topics (under the heading of "the calculus of variations") and more modern topics (under the heading of "optimal control"). It employs th...

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Detalles Bibliográficos
Clasificación:Libro Electrónico
Autor principal: Lebedev, L. P.
Otros Autores: Cloud, Michael J.
Formato: Electrónico eBook
Idioma:Inglés
Publicado: Singapore ; River Edge, N.J. : World Scientific, ©2003.
Colección:Series on stability, vibration, and control of systems. v. 12.
Temas:
Functional analysis.
Mechanics.
Analyse fonctionnelle.
Mécanique.
mechanics (physics)
MATHEMATICS > Calculus.
MATHEMATICS > Mathematical Analysis.
Functional analysis
Mechanics
Acceso en línea:Texto completo

MARC

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100 1 |a Lebedev, L. P. 
245 1 4 |a The calculus of variations and functional analysis :  |b with optimal control and applications in mechanics /  |c Leonid P. Lebedev, Michael J. Cloud. 
260 |a Singapore ;  |a River Edge, N.J. :  |b World Scientific,  |c ©2003. 
300 |a 1 online resource (xiii, 420 pages) :  |b illustrations. 
336 |a text  |b txt  |2 rdacontent 
337 |a computer  |b c  |2 rdamedia 
338 |a online resource  |b cr  |2 rdacarrier 
490 1 |a Series on stability, vibration, and control of systems. Series A ;  |v v. 12 
504 |a Includes bibliographical references (pages 415-416) and index. 
588 0 |a Print version record. 
505 0 |a 1. Basic calculus of variations. 1.1. Introduction. 1.2. Euler's equation for the simplest problem. 1.3. Some properties of extremals of the simplest functional. 1.4. Ritz's method. 1.5. Natural boundary conditions. 1.6. Some extensions to more general functionals. 1.7. Functionals depending on functions in many variables. 1.8. A functional with integrand depending on partial derivatives of higher order. 1.9. The first variation. 1.10. Isoperimetric problems. 1.11. General form of the first variation. 1.12. Movable ends of extremals. 1.13. Weierstrass-Erdmann conditions and related problems. 1.14. Sufficient conditions for minimum. 1.15. Exercises -- 2. Elements of optimal control theory. 2.1. A variational problem as a problem of optimal control. 2.2. General problem of optimal control. 2.3. Simplest problem of optimal control. 2.4. Fundamental solution of a linear ordinary differential equation. 2.5. The simplest problem, continued. 2.6. Pontryagin's maximum principle for the simplest problem. 2.7. Some mathematical preliminaries. 2.8. General terminal control problem. 2.9. Pontryagin's maximum principle for the terminal optimal problem. 2.10. Generalization of the terminal control problem. 2.11. Small variations of control function for terminal control problem. 2.12. A discrete version of small variations of control function for generalized terminal control problem. 2.13. Optimal time control problems. 2.14. Final remarks on control problems. 2.15. Exercises. 
505 8 |a 3. Functional analysis. 3.1. A normed space as a metric space. 3.2. Dimension of a linear space and separability. 3.3. Cauchy sequences and Banach spaces. 3.4. The completion theorem. 3.5. Contraction mapping principle. 3.6. L[symbol] spaces and the Lebesgue integral. 3.7. Sobolev spaces. 3.8. Compactness. 3.9. Inner product spaces, Hilbert spaces. 3.10. Some energy spaces in mechanics. 3.11. Operators and functionals. 3.12. Some approximation theory. 3.13. Orthogonal decomposition of a Hilbert space and the Riesz representation theorem. 3.14. Basis, Gram-Schmidt procedure, Fourier series in Hilbert space. 3.15. Weak convergence. 3.16. Adjoint and self-adjoint operators. 3.17. Compact operators. 3.18. Closed operators. 3.19. Introduction to spectral concepts. 3.20. The Fredholm theory in Hilbert spaces. 3.21. Exercises -- 4. Some applications in mechanics. 4.1. Some problems of mechanics from the viewpoint of the calculus of variations; the virtual work principle. 4.2. Equilibrium problem for a clamped membrane and its generalized solution. 4.3. Equilibrium of a free membrane. 4.4. Some other problems of equilibrium of linear mechanics. 4.5. The Ritz and Bubnov-Galerkin methods. 4.6. The Hamilton-Ostrogradskij principle and the generalized setup of dynamical problems of classical mechanics. 4.7. Generalized setup of dynamic problems for a membrane. 4.8. Other dynamic problems of linear mechanics. 4.9. The Fourier method. 4.10. An eigenfrequency boundary value problem arising in linear mechanics. 4.11. The spectral theorem. 4.12. The Fourier method, continued. 4.13. Equilibrium of a von Kármán plate. 4.14. A unilateral problem. 4.15. Exercises. 
520 |a This is a book for those who want to understand the main ideas in the theory of optimal problems. It provides a good introduction to classical topics (under the heading of "the calculus of variations") and more modern topics (under the heading of "optimal control"). It employs the language and terminology of functional analysis to discuss and justify the setup of problems that are of great importance in applications. The book is concise and self-contained, and should be suitable for readers with a standard undergraduate background in engineering mathematics 
590 |a ProQuest Ebook Central  |b Ebook Central Academic Complete 
650 0 |a Functional analysis. 
650 0 |a Mechanics. 
650 6 |a Analyse fonctionnelle. 
650 6 |a Mécanique. 
650 7 |a mechanics (physics)  |2 aat 
650 7 |a MATHEMATICS  |x Calculus.  |2 bisacsh 
650 7 |a MATHEMATICS  |x Mathematical Analysis.  |2 bisacsh 
650 7 |a Functional analysis  |2 fast 
650 7 |a Mechanics  |2 fast 
700 1 |a Cloud, Michael J. 
758 |i has work:  |a The calculus of variations and functional analysis (Text)  |1 https://id.oclc.org/worldcat/entity/E39PCGQ7T3MK76DgtC43DdHpyd  |4 https://id.oclc.org/worldcat/ontology/hasWork 
776 0 8 |i Print version:  |a Cloud, Michael J.  |t Calculus of Variations and Functional Analysis : With Optimal Control and Applications in Mechanics.  |d Singapore : World Scientific Publishing Company, ©2003  |z 9789812385819 
830 0 |a Series on stability, vibration, and control of systems.  |n Series A ;  |v v. 12. 
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