Convex Functional Analysis

Convex Functional Analysis

Author : Andrew J. Kurdila

Publisher : Springer Science & Business Media

Page : 238 pages

File Size : 18,29 MB

Release : 2006-03-30

Category : Science

ISBN : 3764373571

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Book Description

This volume is dedicated to the fundamentals of convex functional analysis. It presents those aspects of functional analysis that are extensively used in various applications to mechanics and control theory. The purpose of the text is essentially two-fold. On the one hand, a bare minimum of the theory required to understand the principles of functional, convex and set-valued analysis is presented. Numerous examples and diagrams provide as intuitive an explanation of the principles as possible. On the other hand, the volume is largely self-contained. Those with a background in graduate mathematics will find a concise summary of all main definitions and theorems.



Convex Functions and Their Applications

Author : Constantin P. Niculescu

Publisher : Springer

Page : 430 pages

File Size : 32,13 MB

Release : 2018-06-08

Category : Mathematics

ISBN : 3319783378

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Book Description

Thorough introduction to an important area of mathematics Contains recent results Includes many exercises



Convex Analysis

Author : Steven G. Krantz

Publisher : CRC Press

Page : 174 pages

File Size : 10,82 MB

Release : 2014-10-20

Category : Mathematics

ISBN : 149870638X

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Book Description

Convexity is an ancient idea going back to Archimedes. Used sporadically in the mathematical literature over the centuries, today it is a flourishing area of research and a mathematical subject in its own right. Convexity is used in optimization theory, functional analysis, complex analysis, and other parts of mathematics.Convex Analysis introduces





Convex Analysis

Author : Ralph Tyrell Rockafellar

Publisher : Princeton University Press

Page : 470 pages

File Size : 13,57 MB

Release : 2015-04-29

Category : Mathematics

ISBN : 1400873177

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Book Description

Available for the first time in paperback, R. Tyrrell Rockafellar's classic study presents readers with a coherent branch of nonlinear mathematical analysis that is especially suited to the study of optimization problems. Rockafellar's theory differs from classical analysis in that differentiability assumptions are replaced by convexity assumptions. The topics treated in this volume include: systems of inequalities, the minimum or maximum of a convex function over a convex set, Lagrange multipliers, minimax theorems and duality, as well as basic results about the structure of convex sets and the continuity and differentiability of convex functions and saddle- functions. This book has firmly established a new and vital area not only for pure mathematics but also for applications to economics and engineering. A sound knowledge of linear algebra and introductory real analysis should provide readers with sufficient background for this book. There is also a guide for the reader who may be using the book as an introduction, indicating which parts are essential and which may be skipped on a first reading.



Convex Analysis in General Vector Spaces

Author : C. Zalinescu

Publisher : World Scientific

Page : 389 pages

File Size : 30,44 MB

Release : 2002

Category : Science

ISBN : 9812380671

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Book Description

The primary aim of this book is to present the conjugate and sub/differential calculus using the method of perturbation functions in order to obtain the most general results in this field. The secondary aim is to provide important applications of this calculus and of the properties of convex functions. Such applications are: the study of well-conditioned convex functions, uniformly convex and uniformly smooth convex functions, best approximation problems, characterizations of convexity, the study of the sets of weak sharp minima, well-behaved functions and the existence of global error bounds for convex inequalities, as well as the study of monotone multifunctions by using convex functions.



Totally Convex Functions for Fixed Points Computation and Infinite Dimensional Optimization

Author : D. Butnariu

Publisher : Springer Science & Business Media

Page : 218 pages

File Size : 31,37 MB

Release : 2012-12-06

Category : Mathematics

ISBN : 9401140669

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Book Description

The aim of this work is to present in a unified approach a series of results concerning totally convex functions on Banach spaces and their applications to building iterative algorithms for computing common fixed points of mea surable families of operators and optimization methods in infinite dimen sional settings. The notion of totally convex function was first studied by Butnariu, Censor and Reich [31] in the context of the space lRR because of its usefulness for establishing convergence of a Bregman projection method for finding common points of infinite families of closed convex sets. In this finite dimensional environment total convexity hardly differs from strict convexity. In fact, a function with closed domain in a finite dimensional Banach space is totally convex if and only if it is strictly convex. The relevancy of total convexity as a strengthened form of strict convexity becomes apparent when the Banach space on which the function is defined is infinite dimensional. In this case, total convexity is a property stronger than strict convexity but weaker than locally uniform convexity (see Section 1.3 below). The study of totally convex functions in infinite dimensional Banach spaces was started in [33] where it was shown that they are useful tools for extrapolating properties commonly known to belong to operators satisfying demanding contractivity requirements to classes of operators which are not even mildly nonexpansive.



Functional Analysis and Applied Optimization in Banach Spaces

Author : Fabio Botelho

Publisher : Springer

Page : 584 pages

File Size : 26,23 MB

Release : 2014-06-12

Category : Mathematics

ISBN : 3319060740

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Book Description

​This book introduces the basic concepts of real and functional analysis. It presents the fundamentals of the calculus of variations, convex analysis, duality, and optimization that are necessary to develop applications to physics and engineering problems. The book includes introductory and advanced concepts in measure and integration, as well as an introduction to Sobolev spaces. The problems presented are nonlinear, with non-convex variational formulation. Notably, the primal global minima may not be attained in some situations, in which cases the solution of the dual problem corresponds to an appropriate weak cluster point of minimizing sequences for the primal one. Indeed, the dual approach more readily facilitates numerical computations for some of the selected models. While intended primarily for applied mathematicians, the text will also be of interest to engineers, physicists, and other researchers in related fields.



Fourier Analysis in Convex Geometry

Author : Alexander Koldobsky

Publisher : American Mathematical Soc.

Page : 178 pages

File Size : 10,20 MB

Release : 2014-11-12

Category : Mathematics

ISBN : 1470419521

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Book Description

The study of the geometry of convex bodies based on information about sections and projections of these bodies has important applications in many areas of mathematics and science. In this book, a new Fourier analysis approach is discussed. The idea is to express certain geometric properties of bodies in terms of Fourier analysis and to use harmonic analysis methods to solve geometric problems. One of the results discussed in the book is Ball's theorem, establishing the exact upper bound for the -dimensional volume of hyperplane sections of the -dimensional unit cube (it is for each ). Another is the Busemann-Petty problem: if and are two convex origin-symmetric -dimensional bodies and the -dimensional volume of each central hyperplane section of is less than the -dimensional volume of the corresponding section of , is it true that the -dimensional volume of is less than the volume of ? (The answer is positive for and negative for .) The book is suitable for graduate students and researchers interested in geometry, harmonic and functional analysis, and probability. Prerequisites for reading this book include basic real, complex, and functional analysis.



Convex Functions, Monotone Operators and Differentiability

Author : Robert R. Phelps

Publisher : Springer

Page : 125 pages

File Size : 14,17 MB

Release : 2013-12-11

Category : Mathematics

ISBN : 3662215691

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Book Description

These notes start with an introduction to the differentiability of convex functions on Banach spaces, leading to the study of Asplund spaces and their intriguing relationship to monotone operators (and more general set-values maps) and Banach spaces with the Radon-Nikodym property. While much of this is classical, some of it is presented using streamlined proofs which were not available until recently. Considerable attention is paid to contemporary results on variational principles and perturbed optimization in Banach spaces, exhibiting their close connections with Asplund spaces. An introductory course in functional analysis is adequate background for reading these notes which can serve as the basis for a seminar of a one-term graduate course. There are numerous excercises, many of which form an integral part of the exposition.