Introduction To The Analysis Of Normed Linear Spaces

Introduction to the Analysis of Normed Linear Spaces

Author : J. R. Giles

Publisher : Cambridge University Press

Page : 298 pages

File Size : 33,82 MB

Release : 2000-03-13

Category : Mathematics

ISBN : 9780521653756

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Book Description

This is a basic course in functional analysis for senior undergraduate and beginning postgraduate students. The reader need only be familiarity with elementary real and complex analysis, linear algebra and have studied a course in the analysis of metric spaces; knowledge of integration theory or general topology is not required. The text concerns the structural properties of normed linear spaces in general, especially associated with dual spaces and continuous linear operators on normed linear spaces. The implications of the general theory are illustrated with a great variety of example spaces.



Calculus on Normed Vector Spaces

Author : Rodney Coleman

Publisher : Springer Science & Business Media

Page : 255 pages

File Size : 46,76 MB

Release : 2012-07-25

Category : Mathematics

ISBN : 1461438942

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Book Description

This book serves as an introduction to calculus on normed vector spaces at a higher undergraduate or beginning graduate level. The prerequisites include basic calculus and linear algebra, as well as a certain mathematical maturity. All the important topology and functional analysis topics are introduced where necessary. In its attempt to show how calculus on normed vector spaces extends the basic calculus of functions of several variables, this book is one of the few textbooks to bridge the gap between the available elementary texts and high level texts. The inclusion of many non-trivial applications of the theory and interesting exercises provides motivation for the reader.



Classical Analysis on Normed Spaces

Author : Tsoy-Wo Ma

Publisher : World Scientific

Page : 378 pages

File Size : 40,47 MB

Release : 1995

Category : Mathematics

ISBN : 9789810221379

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Book Description

This book provides an elementary introduction to the classical analysis on normed spaces, paying special attention to nonlinear topics such as fixed points, calculus and ordinary differential equations. It is aimed at beginners who want to get through the basic material as soon as possible and then move on to do their own research immediately. It assumes only general knowledge in finite-dimensional linear algebra, simple calculus and elementary complex analysis. Since the treatment is self-contained with sufficient details, even an undergraduate with mathematical maturity should have no problem working through it alone. Various chapters can be integrated into parts of a Master degree program by course work organized by any regional university. Restricted to finite-dimensional spaces rather than normed spaces, selected chapters can be used for a course in advanced calculus. Engineers and physicists may find this book a handy reference in classical analysis.



Introduction to the Analysis of Metric Spaces

Author : John R. Giles

Publisher : Cambridge University Press

Page : 276 pages

File Size : 20,92 MB

Release : 1987-09-03

Category : Mathematics

ISBN : 9780521359283

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Book Description

This is an introduction to the analysis of metric and normed linear spaces for undergraduate students in mathematics. Assuming a basic knowledge of real analysis and linear algebra, the student is exposed to the axiomatic method in analysis and is shown its power in exploiting the structure of fundamental analysis, which underlies a variety of applications. An example is the link between normed linear spaces and linear algebra; finite dimensional spaces are discussed early. The treatment progresses from the concrete to the abstract: thus metric spaces are studied in some detail before general topology is begun, though topological properties of metric spaces are explored in the book. Graded exercises are provided at the end of each section; in each set the earlier exercises are designed to assist in the detection of the structural properties in concrete examples while the later ones are more conceptually sophisticated.



Linear Functional Analysis

Author : Bryan Rynne

Publisher : Springer Science & Business Media

Page : 276 pages

File Size : 13,38 MB

Release : 2013-03-14

Category : Mathematics

ISBN : 1447136551

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Book Description

This book provides an introduction to the ideas and methods of linear func tional analysis at a level appropriate to the final year of an undergraduate course at a British university. The prerequisites for reading it are a standard undergraduate knowledge of linear algebra and real analysis (including the the ory of metric spaces). Part of the development of functional analysis can be traced to attempts to find a suitable framework in which to discuss differential and integral equa tions. Often, the appropriate setting turned out to be a vector space of real or complex-valued functions defined on some set. In general, such a vector space is infinite-dimensional. This leads to difficulties in that, although many of the elementary properties of finite-dimensional vector spaces hold in infinite dimensional vector spaces, many others do not. For example, in general infinite dimensional vector spaces there is no framework in which to make sense of an alytic concepts such as convergence and continuity. Nevertheless, on the spaces of most interest to us there is often a norm (which extends the idea of the length of a vector to a somewhat more abstract setting). Since a norm on a vector space gives rise to a metric on the space, it is now possible to do analysis in the space. As real or complex-valued functions are often called functionals, the term functional analysis came to be used for this topic. We now briefly outline the contents of the book.



Analysis in Euclidean Space

Author : Kenneth Hoffman

Publisher : Courier Dover Publications

Page : 449 pages

File Size : 32,85 MB

Release : 2019-07-17

Category : Mathematics

ISBN : 0486833658

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Book Description

Developed for an introductory course in mathematical analysis at MIT, this text focuses on concepts, principles, and methods. Its introductions to real and complex analysis are closely formulated, and they constitute a natural introduction to complex function theory. Starting with an overview of the real number system, the text presents results for subsets and functions related to Euclidean space of n dimensions. It offers a rigorous review of the fundamentals of calculus, emphasizing power series expansions and introducing the theory of complex-analytic functions. Subsequent chapters cover sequences of functions, normed linear spaces, and the Lebesgue interval. They discuss most of the basic properties of integral and measure, including a brief look at orthogonal expansions. A chapter on differentiable mappings addresses implicit and inverse function theorems and the change of variable theorem. Exercises appear throughout the book, and extensive supplementary material includes a Bibliography, List of Symbols, Index, and an Appendix with background in elementary set theory.



Spaces: An Introduction to Real Analysis

Author : Tom L. Lindstrøm

Publisher : American Mathematical Soc.

Page : 384 pages

File Size : 49,62 MB

Release : 2017-11-28

Category : Mathematics

ISBN : 1470440628

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Book Description

Spaces is a modern introduction to real analysis at the advanced undergraduate level. It is forward-looking in the sense that it first and foremost aims to provide students with the concepts and techniques they need in order to follow more advanced courses in mathematical analysis and neighboring fields. The only prerequisites are a solid understanding of calculus and linear algebra. Two introductory chapters will help students with the transition from computation-based calculus to theory-based analysis. The main topics covered are metric spaces, spaces of continuous functions, normed spaces, differentiation in normed spaces, measure and integration theory, and Fourier series. Although some of the topics are more advanced than what is usually found in books of this level, care is taken to present the material in a way that is suitable for the intended audience: concepts are carefully introduced and motivated, and proofs are presented in full detail. Applications to differential equations and Fourier analysis are used to illustrate the power of the theory, and exercises of all levels from routine to real challenges help students develop their skills and understanding. The text has been tested in classes at the University of Oslo over a number of years.



From Vector Spaces to Function Spaces

Author : Yutaka Yamamoto

Publisher : SIAM

Page : 270 pages

File Size : 19,83 MB

Release : 2012-10-31

Category : Mathematics

ISBN : 1611972302

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Book Description

A guide to analytic methods in applied mathematics from the perspective of functional analysis, suitable for scientists, engineers and students.



An Introduction to Banach Space Theory

Author : Robert E. Megginson

Publisher : Springer Science & Business Media

Page : 613 pages

File Size : 21,68 MB

Release : 2012-12-06

Category : Mathematics

ISBN : 1461206030

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Book Description

Preparing students for further study of both the classical works and current research, this is an accessible text for students who have had a course in real and complex analysis and understand the basic properties of L p spaces. It is sprinkled liberally with examples, historical notes, citations, and original sources, and over 450 exercises provide practice in the use of the results developed in the text through supplementary examples and counterexamples.



Normed Linear Spaces

Author : Mahlon Marsh Day

Publisher : Springer

Page : 145 pages

File Size : 20,99 MB

Release : 2013-06-29

Category : Mathematics

ISBN : 366225249X

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Book Description

This book contains a compressed introduction to the study of normed linear spaces and to that part of the theory of linear topological spaces without which the main discussion could not well proceed. Definitions of many terms which are required in passing can be found in the alphabetical index, page 134. Symbols which are used throughout all, or a significant part, of this book are indexed on page 132. Each reference to the bibliography, page 124, is made by means of the author's name, supplemented when necessary by a number in square brackets. The bibliography does not completely cover the available literature, even the most recent; each paper in it is the subject of a specific reference at some point in the text. The writer takes this opportunity to express thanks to the University of Illinois, the National Science Foundation, and the University of Washington, each of which has contributed in some degree to the cultural, financial, or physical support of the writer, and to Mr. R. R. PHELPS, who eradicated many of the errors with which the manuscript was infested.