Title
Introduction To Hilbert Spaces With Applications,Used
Delivery time: 8-12 business days (International)
This Book Provides The Reader With A Systematic Exposition Of The Basic Ideas And Results Of Hilbert Space Theory And Functional Analysis With Diverse Applications To Differential And Integral Equations. The Hilbert Space Formalism Is Used To Develop The Foundation Of Quantum Mechanics And The Hilbert Space Methods Are Applied To Optimization, Variational, And Control Problems And To Problems In Approximation Theory, Nonlinear Instablity, And Bifurcation. Another Attractive Feature Is A Simple Introduction To The Lebesgue Integral. It Is Intended For Senior Undergraduate And Graduate Courses In Hilbert Space And Functional Analysis With Applications For Students In Mathematics, Physics, And Engineering.N Systematic Exposition Of The Basic Ideas And Results Of Hilbert Space Theory And Functional Analysisn Great Variety Of Applications That Are Not Available In Comparable Booksn Different Approach To The Lebesgue Integral, Which Makes The Theory Easier, More Intuitive, And More Accessible To Undergraduate Students
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We provide a 2-year limited warranty, from the date of purchase for all our products.
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This warranty strictly does not cover damages that arose from negligence, misuse, wear and tear, or not in accordance with product instructions (dropping the product, etc.).
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Frequently Asked Questions
- Q: What is the main focus of 'Introduction to Hilbert Spaces with Applications'? A: The book systematically covers the basic ideas and results of Hilbert space theory and functional analysis, with applications to differential and integral equations, quantum mechanics, optimization, and control problems.
- Q: Who is the author of this book? A: The author of 'Introduction to Hilbert Spaces with Applications' is Lokenath Debnath.
- Q: What is the publication date of this book? A: This book was published on June 11, 1990.
- Q: What is the page count of this book? A: The book contains 508 pages.
- Q: Is this book suitable for beginners? A: While the book provides a systematic exposition, it is intended for senior undergraduate and graduate students, making it more suitable for those with some previous knowledge of mathematics.
- Q: What type of binding does this book have? A: The book is available in hardcover binding.
- Q: What are the key features of this book? A: Key features include a systematic exposition of Hilbert space theory, a variety of applications not found in similar texts, and an intuitive introduction to the Lebesgue integral.
- Q: What topics does this book cover in relation to functional analysis? A: The book covers foundational concepts in functional analysis, including applications to optimization, variational problems, and control theory.
- Q: Is this book useful for engineering students? A: Yes, the book is designed to be useful for students in mathematics, physics, and engineering, particularly those studying Hilbert spaces and functional analysis.
- Q: What is the edition of this book? A: This is the first edition of 'Introduction to Hilbert Spaces with Applications'.