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Principles of Analysis

Hugo D. Junghenn
€109.99
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A01=Hugo D. Junghenn
advanced mathematics study
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Author_Hugo D. Junghenn
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Balanced Neighborhood
Banach Algebra
Banach algebra structures
Category1=Non-Fiction
Category=PBKB
Commutative Banach Algebra
Continuous Linear Functionals
Continuous Linear Mapping
COP=United States
Delivery_Delivery within 10-20 working days
Dominated Convergence Theorem
eq_isMigrated=2
eq_nobargain
Fubini's Theorem
Fubini’s Theorem
Functional analysis
Inversion Theorem
Language_English
locally compact groups
Locally Convex Space
Locally Convex Spaces
Lower Semicontinuous
mathematical proofs
Measurable Functions
Measurable Spaces
Measurable Transformation
metric space theory
Neighborhood Base
Open Neighborhood
PA=Available
Plancherel Theorem
Price_€50 to €100
PS=Active
qualifying exam preparation
Quotient Topology
Real TVS
Relative Topology
Riemann Lebesgue Lemma
Schwartz Function
softlaunch
topological vector spaces
Topologically Isomorphic
TVS
Vector Space

Product details

  • ISBN 9781498773287
  • Weight: 1138g
  • Dimensions: 178 x 254mm
  • Publication Date: 26 Apr 2018
  • Publisher: Taylor & Francis Inc
  • Publication City/Country: US
  • Product Form: Hardback
  • Language: English
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Description

Principles of Analysis: Measure, Integration, Functional Analysis, and Applications prepares readers for advanced courses in analysis, probability, harmonic analysis, and applied mathematics at the doctoral level. The book also helps them prepare for qualifying exams in real analysis. It is designed so that the reader or instructor may select topics suitable to their needs. The author presents the text in a clear and straightforward manner for the readers’ benefit. At the same time, the text is a thorough and rigorous examination of the essentials of measure, integration and functional analysis.

The book includes a wide variety of detailed topics and serves as a valuable reference and as an efficient and streamlined examination of advanced real analysis. The text is divided into four distinct sections: Part I develops the general theory of Lebesgue integration; Part II is organized as a course in functional analysis; Part III discusses various advanced topics, building on material covered in the previous parts; Part IV includes two appendices with proofs of the change of the variable theorem and a joint continuity theorem. Additionally, the theory of metric spaces and of general topological spaces are covered in detail in a preliminary chapter .

Features:

  • Contains direct and concise proofs with attention to detail

  • Features a substantial variety of interesting and nontrivial examples

  • Includes nearly 700 exercises ranging from routine to challenging with hints for the more difficult exercises

  • Provides an eclectic set of special topics and applications

About the Author:

Hugo D. Junghenn is a professor of mathematics at The George Washington University. He has published numerous journal articles and is the author of several books, including Option Valuation: A First Course in Financial Mathematics and A Course in Real Analysis. His research interests include functional analysis, semigroups, and probability.
About Hugo D. Junghenn

Hugo D. Junghenn is a professor of mathematics at The George Washington University. He has published numerous journal articles and is the author of several books, including Option Valuation: A First Course in Financial Mathematics and A Course in Real Analysis. His research interests include functional analysis, semigroups, and probability.

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