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Geometrical Methods in Variational Problems de N. A. Bobylov

Geometrical Methods in Variational Problems

Autor N. A. Bobylov, S. V. Emel'yanov, S. Korovin
en Limba Engleză Hardback – 31 iul 1999

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Specificații

ISBN-13: 9780792357803
ISBN-10: 0792357809
Pagini: 564
Ilustrații: XVI, 543 p.
Dimensiuni: 160 x 241 x 35 mm
Greutate: 1 kg
Ediția:1999
Editura: Springer
Locul publicării:Dordrecht, Netherlands

Public țintă

Research

Cuprins

1 Preliminaries.- 1.1 Metric and Normed Spaces.- 1.2 Compactness.- 1.3 Linear Functional and Dual Spaces.- 1.4 Linear Operators.- 1.5 Nonlinear Operators and Functionals.- 1.6 Contraction Mapping Principle, Implicit Function Theorem, and Differential Equations on a Banach Space.- 2 Minimization of Nonlinear Functionals.- 2.1 Extrema of Smooth Functionals.- 2.2 Extremum of Lipschitzian and Convex Functionals.- 2.3 Weierstass Theorems.- 2.4 Monotonicity.- 2.5 Variational Principles.- 2.6 Additional Remarks.- 3 Homotopic Methods in Variational Problems.- 3.1 Deformations of Functionals on Hilbert Spaces.- 3.2 Deformations of Functionals on Banach Spaces.- 3.3 Global Deformations of Functionals.- 3.4 Deformation of Problems of the Calculus of Variations.- 3.5 Deformations of Lipschitzian Functions.- 3.6 Global Deformations of Lipschitzian Functions.- 3.7 Deformations of Mathematical Programming Problems.- 3.8 Deformations of Lipschitzian Functionals.- 3.9 Additional Remarks.- 4 Topological Characteristics of Extremals of Variational Problems.- 4.1 Smooth Manifolds and Differential Forms.- 4.2 Degree of Mapping.- 4.3 Rotation of Vector Fields in Finite-Dimensional Spaces.- 4.4 Vector Fields in Infinite-Dimensional Spaces.- 4.5 Computation of the Topological Index.- 4.6 Topological Index of Zero of an Isolated Minimum.- 4.7 Euler Characteristic and the Topological Index of an Isolated Critical Set.- 4.8 Topological Index of Extremals of Problems of the Calculus of Variations.- 4.9 Topological Index of Optimal Controls.- 4.10 Topological Characteristic s of Critical Points of Nonsmooth Functionals.- 4.11 Additional Remarks.- 5 Applications.- 5.1 Existence Theorems.- 5.2 Bounds of the Number of Solutions to Variational Problems.- 5.3 Applications of the Homotopic Method.- 5.4 Study of Degenerate Extremals.- 5.5 Morse Lemmas.- 5.6 Well-Posedness of Variational Problems. Ulam Problem.- 5.7 Gradient Procedures.- 5.8 Bifurcation of Extremals of Variational Problems.- 5.9 Eigenvalues of Potential Operators.- 5.10 Additional Remarks.- Bibliographical Comments.- References.

Recenzii

"... the book is a valuable contribution to the literature. It is well-written, self-contained and it has an extensive bibliography, especially with regard to the literature in the Russian language."
(Mathematical Reviews, 2001a)