Ebook Info
- Published: 1997
- Number of pages: 448 pages
- Format: PDF
- File Size: 16.53 MB
- Authors: Reinhold Meise
Description
This book was written for students of mathematics and physics who have a basic knowledge of analysis and linear algebra. It can be used as a textbook for courses and/or seminars in functional analysis. Starting from metric spaces, it proceeds quickly to the central results of the field, including the theorem of Hahn-Banach. The spaces (p Lp (X,(), C(X)’ and Sebolov spaces are introduced. A chapter on spectral theory contains the Riesz theory of compact operators, basic facts on Banach and C-algebras, and the spectral representation for bounded normal and unbounded self-adjoint operators for Hilbert spaces. A discussion of locally convex spaces and their duality theory provides the basis for a comprehensive treatment of Frechet spaces and their duals.
User’s Reviews
Editorial Reviews: Review The book can be warmly recommended to graduate students of mathematics and physics and also everybody interested in functional analysis. About the Author Reinhard Meise is at Heinrich Heine University, Dusseldorf. Dietmar Vogt is at Beigische University, Wouppeitat.
Reviews from Amazon users which were colected at the time this book was published on the website:
⭐
Keywords
Free Download Introduction to Functional Analysis (Oxford Graduate Texts in Mathematics, 2) 1st Edition in PDF format
Introduction to Functional Analysis (Oxford Graduate Texts in Mathematics, 2) 1st Edition PDF Free Download
Download Introduction to Functional Analysis (Oxford Graduate Texts in Mathematics, 2) 1st Edition 1997 PDF Free
Introduction to Functional Analysis (Oxford Graduate Texts in Mathematics, 2) 1st Edition 1997 PDF Free Download
Download Introduction to Functional Analysis (Oxford Graduate Texts in Mathematics, 2) 1st Edition PDF
Free Download Ebook Introduction to Functional Analysis (Oxford Graduate Texts in Mathematics, 2) 1st Edition