Convex analysis and beyond. Volume I, Basic theory / Boris S. Mordukhovich, Nguyen Mau Nam.
2022
QA639.5
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Title
Convex analysis and beyond. Volume I, Basic theory / Boris S. Mordukhovich, Nguyen Mau Nam.
ISBN
9783030947859 (electronic bk.)
3030947858 (electronic bk.)
9783030947842 (print)
303094784X
3030947858 (electronic bk.)
9783030947842 (print)
303094784X
Published
Cham, Switzerland : Springer, 2022.
Language
English
Description
1 online resource (1 volume) : illustrations (black and white, and color).
Item Number
10.1007/978-3-030-94785-9 doi
Call Number
QA639.5
Dewey Decimal Classification
516/.08
Summary
This book presents a unified theory of convex functions, sets, and set-valued mappings in topological vector spaces with its specifications to locally convex, Banach and finite-dimensional settings. These developments and expositions are based on the powerful geometric approach of variational analysis, which resides on set extremality with its characterizations and specifications in the presence of convexity. Using this approach, the text consolidates the device of fundamental facts of generalized differential calculus to obtain novel results for convex sets, functions, and set-valued mappings in finite and infinite dimensions. It also explores topics beyond convexity using the fundamental machinery of convex analysis to develop nonconvex generalized differentiation and its applications. The text utilizes an adaptable framework designed with researchers as well as multiple levels of students in mind. It includes many exercises and figures suited to graduate classes in mathematical sciences that are also accessible to advanced students in economics, engineering, and other applications. In addition, it includes chapters on convex analysis and optimization in finite-dimensional spaces that will be useful to upper undergraduate students, whereas the work as a whole provides an ample resource to mathematicians and applied scientists, particularly experts in convex and variational analysis, optimization, and their applications.
Bibliography, etc. Note
Includes bibliographical references and index.
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Description based on print version record.
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Series
Springer series in operations research.
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Table of Contents
Fundamentals
Basic theory of convexity
Convex generalized differentiation
Enhanced calculus and fenchel duality
Variational techniques and further subgradient study
Miscellaneous topics on convexity
Convexified Lipschitzian analysis
List of Figures
Glossary of Notation and Acronyms
Subject Index.
Basic theory of convexity
Convex generalized differentiation
Enhanced calculus and fenchel duality
Variational techniques and further subgradient study
Miscellaneous topics on convexity
Convexified Lipschitzian analysis
List of Figures
Glossary of Notation and Acronyms
Subject Index.