
The Book Is 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 Hahnbanach. The Spaces (p Lp (x,(), C(x)' And Sobolov 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 In Hilbert Spaces. An Introduction To Locally Convex Spaces And Their Duality Theory Provides The Basis For A Comprehensive Treatment Of Fr--eacute--;chet Spaces And Their Duals. In Particular Recent Results On Sequences Spaces, Linear Topological Invariants And Short Exact Sequences Of Fr--eacute--;chet Spaces And The Splitting Of Such Sequences Are Presented. These Results Are Not Contained In Any Other Book In This Field.
This text provides a comprehensive mathematical framework for functional analysis, specifically designed for students of mathematics and physics who possess foundational knowledge in analysis and linear algebra. Authors Dietmar Vogt and Reinhold Meise synthesize core concepts of the field, ranging from metric spaces to advanced spectral theory, while introducing specialized topics such as Fréchet spaces and their duals.
What You Will Find
Scope Limits
Experts recognize this text as a rigorous resource that bridges standard functional analysis with specialized research on Fréchet spaces. Readers frequently note the technical density of the prose, which makes it a suitable reference for advanced graduate-level coursework and independent study.
Page Count:
449
Publication Date:
1997-01-01
Publisher:
Clarendon Press
ISBN-10:
0191590924
ISBN-13:
9780191590924
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