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Variational Analysis of Regular Mappings [electronic resource] : Theory and Applications / by Alexander D. Ioffe.

By: Ioffe, Alexander D [author.].
Contributor(s): SpringerLink (Online service).
Material type: TextTextSeries: Springer Monographs in Mathematics: Publisher: Cham : Springer International Publishing : Imprint: Springer, 2017Description: XXI, 495 p. 11 illus., 2 illus. in color. online resource.Content type: text Media type: computer Carrier type: online resourceISBN: 9783319642772.Subject(s): Mathematical optimization | Functional analysis | Global analysis | Functional equations | Calculus of Variations and Optimal Control; Optimization | Continuous Optimization | Functional Analysis | Global Analysis and Analysis on Manifolds | Difference and Functional EquationsAdditional physical formats: Printed edition:: No title; Printed edition:: No title; Printed edition:: No titleDDC classification: 515.64 Online resources: Click here to access online
Contents:
1 The Classical Theory -- 2 Metric Theory: Phenomenology -- 3 Metric Theory: The Infinitesimal Viewpoint -- 4 Subdifferentials: A Short Introduction -- 5 Banach Space Theory: Regularity Criteria -- 6 Banach Space Theory: Special Classes of Mappings -- 7 Applications to Analysis and Optimization 1 -- 8 Regularity in Finite-Dimensional Spaces -- 9 Applications to Analysis and Optimization 2.
In: Springer eBooksSummary: This monograph offers the first systematic account of (metric) regularity theory in variational analysis. It presents new developments alongside classical results and demonstrates the power of the theory through applications to various problems in analysis and optimization theory. The origins of metric regularity theory can be traced back to a series of fundamental ideas and results of nonlinear functional analysis and global analysis centered around problems of existence and stability of solutions of nonlinear equations. In variational analysis, regularity theory goes far beyond the classical setting and is also concerned with non-differentiable and multi-valued operators. The present volume explores all basic aspects of the theory, from the most general problems for mappings between metric spaces to those connected with fairly concrete and important classes of operators acting in Banach and finite dimensional spaces. Written by a leading expert in the field, the book covers new and powerful techniques, which have proven to be highly efficient even in classical settings, and outlines the theory’s predominantly quantitative character, leading to a variety of new and unexpected applications. Variational Analysis of Regular Mappings is aimed at graduate students and researchers in nonlinear and functional analysis, especially those working in areas close to optimization and optimal control, and will be suitable to anyone interested in applying new concepts and ideas to operations research, control engineering and numerical analysis.
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Item type Current location Call number Status Date due Barcode Item holds
E-BOOKS E-BOOKS ISI Library, Kolkata
 
Available EB1975
Total holds: 0

1 The Classical Theory -- 2 Metric Theory: Phenomenology -- 3 Metric Theory: The Infinitesimal Viewpoint -- 4 Subdifferentials: A Short Introduction -- 5 Banach Space Theory: Regularity Criteria -- 6 Banach Space Theory: Special Classes of Mappings -- 7 Applications to Analysis and Optimization 1 -- 8 Regularity in Finite-Dimensional Spaces -- 9 Applications to Analysis and Optimization 2.

This monograph offers the first systematic account of (metric) regularity theory in variational analysis. It presents new developments alongside classical results and demonstrates the power of the theory through applications to various problems in analysis and optimization theory. The origins of metric regularity theory can be traced back to a series of fundamental ideas and results of nonlinear functional analysis and global analysis centered around problems of existence and stability of solutions of nonlinear equations. In variational analysis, regularity theory goes far beyond the classical setting and is also concerned with non-differentiable and multi-valued operators. The present volume explores all basic aspects of the theory, from the most general problems for mappings between metric spaces to those connected with fairly concrete and important classes of operators acting in Banach and finite dimensional spaces. Written by a leading expert in the field, the book covers new and powerful techniques, which have proven to be highly efficient even in classical settings, and outlines the theory’s predominantly quantitative character, leading to a variety of new and unexpected applications. Variational Analysis of Regular Mappings is aimed at graduate students and researchers in nonlinear and functional analysis, especially those working in areas close to optimization and optimal control, and will be suitable to anyone interested in applying new concepts and ideas to operations research, control engineering and numerical analysis.

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