Functional Analysis (Methods of Modern Mathematical Physics)
Author | : | |
Rating | : | 4.24 (939 Votes) |
Asin | : | 0125850506 |
Format Type | : | paperback |
Number of Pages | : | 400 Pages |
Publish Date | : | 2017-07-02 |
Language | : | English |
DESCRIPTION:
ESAB8Amazing Content, Frustrating Form This is an excellent text on functional analysis. I read a few books through the library when learning the subject and really loved the clarity of Reed-Simon the most. Also, the exercises are great.However, the actual book that I received felt almost like photocopy quality and was difficult to read. The whole point of purchasing such an expensive text is to have it in your hands without the strain of staring at a computer screen. Elsevier did a downright crappy job with the new version (not the ol. said Amazing Content, Frustrating Form. This is an excellent text on functional analysis. I read a few books through the library when learning the subject and really loved the clarity of Reed-Simon the most. Also, the exercises are great.However, the actual book that I received felt almost like photocopy quality and was difficult to read. The whole point of purchasing such an expensive text is to have it in your hands without the strain of staring at a computer screen. Elsevier did a downright crappy job with the new version (not the ol. The essential spectrum of tools for physical observables. Pedro L. Ribeiro Books on mathematical methods "for physicists" are often criticized by their superficiality, a sacrifice deemed necessary for achieving completeness. This one is a glaring exception: the first of a set of 4 (!) volumes dealing with the finest tools for dealing with the delicate mathematical questions in quantum theory - namely, functional analysis. Of course, this sounds rather vague, since quantum physics makes use of functional-analytic tools as diverse as distributions, Hilbert, Banach and loca. excellent This is the best functional analysis book for beginners, in my opinion. It is written for people that are interested in functional analysis as a tool for differential equations. What makes it different from other books on this subject are the numerous examples and applications to differential equations. Highly recommended.
This book is the first of a multivolume series devoted to an exposition of functional analysis methods in modern mathematical physics. It describes the fundamental principles of functional analysis and is essentially self-contained, although there are occasional references to later volumes. We have included a few applications when we thought that they would provide motivation for the reader. Later volumes describe various advanced topics in functional analysis and give numerous applications in classical physics, modern physics, and partial differential equations.