Produktbild: Introduction to Real Analysis

Introduction to Real Analysis An Educational Approach

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Beschreibung

Produktdetails

Einband

Gebundene Ausgabe

Erscheinungsdatum

01.07.2009

Verlag

Wiley

Seitenzahl

280

Maße (L/B/H)

24/16,1/2 cm

Gewicht

589 g

Sprache

Englisch

ISBN

978-0-470-37136-7

Beschreibung

Produktdetails

Einband

Gebundene Ausgabe

Erscheinungsdatum

01.07.2009

Verlag

Wiley

Seitenzahl

280

Maße (L/B/H)

24/16,1/2 cm

Gewicht

589 g

Sprache

Englisch

ISBN

978-0-470-37136-7

Herstelleradresse

Libri GmbH
Europaallee 1
36244 Bad Hersfeld
DE

Email: gpsr@libri.de

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Die Leseprobe wird geladen.
  • Produktbild: Introduction to Real Analysis
  • Preface.

    Acknowledgments.

    1 Elementary Calculus.

    1.1 Preliminary Concepts.

    1.2 Limits and Continuity.

    1.3 Differentiation.

    1.4 Integration.

    1.5 Sequences and Series of Constants.

    1.6 Power Series and Taylor Series.

    Summary.

    Exercises.

    Interlude: Fermat, Descartes, and theTangent Problem.

    2 Introduction to Real Analysis.

    2.1 Basic Topology of the Real Numbers.

    2.2 Limits and Continuity.

    2.3 Differentiation.

    2.4 Riemann and Riemann-Stieltjes Integration.

    2.5 Sequences, Series, and Convergence Tests.

    2.6 Pointwise and Uniform Convergence.

    Summary.

    Exercises.

    Interlude: Euler and the "Basel Problem".

    3 A Brief Introduction to Lebesgue Theory.

    3.1 Lebesgue Measure and Measurable Sets.

    3.2 The Lebesgue Integral.

    3.3 Measure, Integral, and Convergence.

    3.4 Littlewood's Three Principles.

    Summary.

    Exercises.

    Interlude: The Set of Rational Numbers isVery Large andVery Small.

    4 Special Topics.

    4.1 Modeling with Logistic Functions-Numerical Derivatives.

    4.2 Numerical Quadrature.

    4.3 Fourier Series.

    4.4 Special Functions-The Gamma Function.

    4.5 Calculus Without Limits: Differential Algebra.

    Summary.

    Exercises.

    Appendix A: Definitions and Theorems of Elementary Real Analysis.

    A.1 Limits.

    A.2 Continuity.

    A.3 The Derivative.

    A.4 Riemann Integration.

    A.5 Riemann-Stieltjes Integration.

    A.6 Sequences and Series of Constants.

    A.7 Sequences and Series of Functions.

    Appendix B: A Very Brief Calculus Chronology.

    Appendix C: Projects in Real Analysis.

    C.1 Historical Writing Projects.

    C.2 Induction Proofs: Summations, Inequalities, and Divisibility.

    C.3 Series Rearrangements.

    C.4 Newton and the Binomial Theorem.

    C.5 Symmetric Sums of Logarithms.

    C.6 Logical Equivalence: Completeness of the Real Numbers.

    C.7 Vitali's Nonmeasurable Set.

    C.8 Sources for Real Analysis Projects.

    C.9 Sources for Projects for Calculus Students.

    Bibliography.

    Index.