An accessible introduction to real analysis and its connection
to elementary calculus
Bridging the gap between the development and history of real
analysis, Introduction to Real Analysis: An Educational
Approach presents a comprehensive introduction to real analysis
while also offering a survey of the field. With its balance of
historical background, key calculus methods, and hands-on
applications, this book provides readers with a solid foundation
and fundamental understanding of real analysis.
The book begins with an outline of basic calculus, including a
close examination of problems illustrating links and potential
difficulties. Next, a fluid introduction to real analysis is
presented, guiding readers through the basic topology of real
numbers, limits, integration, and a series of functions in natural
progression. The book moves on to analysis with more rigorous
investigations, and the topology of the line is presented along
with a discussion of limits and continuity that includes unusual
examples in order to direct readers' thinking beyond intuitive
reasoning and on to more complex understanding. The dichotomy of
pointwise and uniform convergence is then addressed and is followed
by differentiation and integration. Riemann-Stieltjes integrals and
the Lebesgue measure are also introduced to broaden the presented
perspective. The book concludes with a collection of advanced
topics that are connected to elementary calculus, such as modeling
with logistic functions, numerical quadrature, Fourier series, and
special functions.
Detailed appendices outline key definitions and theorems in
elementary calculus and also present additional proofs, projects,
and sets in real analysis. Each chapter references historical
sources on real analysis while also providing proof-oriented
exercises and examples that facilitate the development of
computational skills. In addition, an extensive bibliography
provides additional resources on the topic.
Introduction to Real Analysis: An Educational Approach is
an ideal book for upper- undergraduate and graduate-level real
analysis courses in the areas of mathematics and education. It is
also a valuable reference for educators in the field of applied
mathematics.
Autorentext
WILLIAM C. BAULDRY, PhD, is Professor in the Department of Mathematical Sciences at Appalachian State University. Dr. Bauldry has published numerous articles in his areas of interest, which include the pedagogical uses of computer algebra systems and cryptography.
Zusammenfassung
An accessible introduction to real analysis and its connection to elementary calculus
Bridging the gap between the development and history of real analysis, Introduction to Real Analysis: An Educational Approach presents a comprehensive introduction to real analysis while also offering a survey of the field. With its balance of historical background, key calculus methods, and hands-on applications, this book provides readers with a solid foundation and fundamental understanding of real analysis.
The book begins with an outline of basic calculus, including a close examination of problems illustrating links and potential difficulties. Next, a fluid introduction to real analysis is presented, guiding readers through the basic topology of real numbers, limits, integration, and a series of functions in natural progression. The book moves on to analysis with more rigorous investigations, and the topology of the line is presented along with a discussion of limits and continuity that includes unusual examples in order to direct readers' thinking beyond intuitive reasoning and on to more complex understanding. The dichotomy of pointwise and uniform convergence is then addressed and is followed by differentiation and integration. Riemann-Stieltjes integrals and the Lebesgue measure are also introduced to broaden the presented perspective. The book concludes with a collection of advanced topics that are connected to elementary calculus, such as modeling with logistic functions, numerical quadrature, Fourier series, and special functions.
Detailed appendices outline key definitions and theorems in elementary calculus and also present additional proofs, projects, and sets in real analysis. Each chapter references historical sources on real analysis while also providing proof-oriented exercises and examples that facilitate the development of computational skills. In addition, an extensive bibliography provides additional resources on the topic.
Introduction to Real Analysis: An Educational Approach is an ideal book for upper- undergraduate and graduate-level real analysis courses in the areas of mathematics and education. It is also a valuable reference for educators in the field of applied mathematics.
Inhalt
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.