Comprehensive and easy-to-understand, this innovative textbook progresses from the essentials of preparatory mathematics to sophiisticated functional analysis. This text has few mathematical prerequisites and provides the fundamental concepts and therorems essential to mathematical analysis and modeling
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Most Helpful Customer Reviews
11 of 11 people found the following review helpful:
5.0 out of 5 stars
Excellent book for engineers seeking to learn mathematics,
By Kumar Vemaganti (kumar@ticam.utexas.edu) (Austin, TX) - See all my reviews
This review is from: Applied Functional Analysis (Computational Mechanics and Applied Mathematics) (Hardcover)
Written by two experts in the area of computational and applied mathematics, this book is ideal for first/second year graduate students in engineering who wish to use concepts from functional analysis in their work. On one hand, the treatment is mathematically precise and yet the authors use their extensive engineering experience to present examples that are highly intuitive. The introduction is greatly self-contained and serves as an appetizer for further chapters. Having worked in matrix methods for a while, I found the chapter on linear algebra especially interesting and informative. It explains the underlying concepts behind results that are generally taken for granted otherwise. The next few chapters consist of material that is, in general, not easy to explain and yet the style of the authors significantly simplifies the flow of the book. The topics covered in these chapters are at a level of abstraction higher than that encountered in engineering mathematics. This is evident, for example in the chapter on Lebesgue Integration. The heavy notation that is used sometimes makes it necessary to pay close attention while reading but this is perhaps a small price to pay for precision. The chapters on Banach and Hilbert spaces should be of special interest to people who wish to study the solution of variational boundary value problems. In all, the book is an excellent text for the beginner and a very useful reference for the advanced user.
4 of 4 people found the following review helpful:
5.0 out of 5 stars
A very good first book on functional analysis.,
By UNPINGCO (Los Angeles, CA) - See all my reviews
This review is from: Applied Functional Analysis (Computational Mechanics and Applied Mathematics) (Hardcover)
A very good first book on functional analysis. The book starts with preliminary set theory, logic, functions, and concepts of abstract algebra and moves on to the big convergence theorems in the Lebesgue integration and onto topological and metric spaces. The book ends with basic theory of Hilbert space. Each section concludes with exercises. The author takes great pains to include a lot of detail in the proofs. I would recommend this book to an advanced undergraduate or beginning graduate student.
6 of 8 people found the following review helpful:
3.0 out of 5 stars
Discussions are a bit convoluted.,
This review is from: Applied Functional Analysis (Computational Mechanics and Applied Mathematics) (Hardcover)
I took Functional Analysis from professor Demkowicz. Actually the course is a misnomer, since you learn very little functional analysis and quite a bit more about set theory, Lebesgue measure theory, and topology (through Ch. 4 in the book). While I feel that the book is very meticulously written, it tries to cover in too much detail everything starting from the most basic laws of logic. The proofs and explanations are concise and clear but for my taste I also appreciate a bit of "plain English" explanation before tackling a proof, so I at least have some idea of what is going on. Only get this book if you want an *extremely* detailed development of basic theory and don't care much about applications.
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First Sentence:
An axiomatic treatment of algebra, as with all mathematics, must begin with certain primitive concepts that are intuitively very simple but that may be impossible to define very precisely. Read the first page Key Phrases - Statistically Improbable Phrases (SIPs): (learn more)
transitive measure, countable type, affine isomorphism, simple isomorphism, arbitrary linear transformation, spectral family, reflexive spaces, admissible displacements, sequential continuity, topological subspace, bilinear functional, transpose operator, isomorphic vector spaces, negation rules, convergence topology, open mapping theorem, limit inferior, sequential compactness, two vector spaces, locally convex topology, two topological spaces, normal operators, applied functional analysis, topological duals, membrane problem Key Phrases - Capitalized Phrases (CAPs): (learn more)
Prove Theorem, Prove Corollary New!
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Front Cover | Table of Contents | First Pages | Index | Back Cover | Surprise Me!
An axiomatic treatment of algebra, as with all mathematics, must begin with certain primitive concepts that are intuitively very simple but that may be impossible to define very precisely. Read the first page Key Phrases - Statistically Improbable Phrases (SIPs): (learn more)
transitive measure, countable type, affine isomorphism, simple isomorphism, arbitrary linear transformation, spectral family, reflexive spaces, admissible displacements, sequential continuity, topological subspace, bilinear functional, transpose operator, isomorphic vector spaces, negation rules, convergence topology, open mapping theorem, limit inferior, sequential compactness, two vector spaces, locally convex topology, two topological spaces, normal operators, applied functional analysis, topological duals, membrane problem Key Phrases - Capitalized Phrases (CAPs): (learn more)
Prove Theorem, Prove Corollary New!
Books on Related Topics | Concordance | Text Stats Browse Sample Pages:
Front Cover | Table of Contents | First Pages | Index | Back Cover | Surprise Me!
Citations (learn more)
This book cites 8
books:
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33
books
cite this book:
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- Applied Functional Analysis (Pure and Applied Mathematics: A Wiley Series of Texts, Monographs and Tracts) by Jean-Pierre Aubin in Back Matter
- Initial Boundary Value Problems in Mathematical Physics by Rolf Leis in Back Matter
- Partial Differential Equations (Applied Mathematical Sciences) (v. 1) by Fritz John in Back Matter
- Sobolev spaces, Volume 65 (Pure and Applied Mathematics) by Author Unknown in Back Matter
- Functional Analysis (Springer Classics in Mathematics) by Kosaku Yosida in Back Matter
See all 8 books this book cites
- The Finite Element Method in Heat Transfer and Fluid Dynamics, Second Edition (Computational Mechanics and Applied Analysis) by J. N. Reddy on page 77, page 243, and Back Matter
- Finite Elements for Analysis and Design: Computational Mathematics and Applications Series by J. E. Akin on page 36, and page 260
- Applied Functional Analysis: Numerical Methods, Wavelet Methods, and Image Processing (Chapman & Hall/CRC Pure and Applied Mathematics) by Abul Hasan Siddiqi on page 83, and page 355
- Finite Element Analysis with Error Estimators: An Introduction to the FEM and Adaptive Error Analysis for Engineering Students by J. E. Akin on page 91, and page 144
- Energy Principles and Variational Methods in Applied Mechanics by J. N. Reddy on page 132, and page 297
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