Read more
Informationen zum Autor Bernd S.W. Schroder , PhD, is Edmondson/Crump Professor in the Program of Mathematics and Statistics at Louisiana Tech University. Dr. Schröder is the author of over thirty refereed journal articles on subjects such as ordered sets, probability theory, graph theory, harmonic analysis, computer science, and education. He earned his PhD in mathematics from Kansas State University in 1992. Klappentext A self-contained introduction to the fundamentals of mathematical analysisMathematical Analysis: A Concise Introduction presents the foundations of analysis and illustrates its role in mathematics. By focusing on the essentials, reinforcing learning through exercises, and featuring a unique "learn by doing" approach, the book develops the reader's proof writing skills and establishes fundamental comprehension of analysis that is essential for further exploration of pure and applied mathematics. This book is directly applicable to areas such as differential equations, probability theory, numerical analysis, differential geometry, and functional analysis.Mathematical Analysis is composed of three parts:?Part One presents the analysis of functions of one variable, including sequences, continuity, differentiation, Riemann integration, series, and the Lebesgue integral. A detailed explanation of proof writing is provided with specific attention devoted to standard proof techniques. To facilitate an efficient transition to more abstract settings, the results for single variable functions are proved using methods that translate to metric spaces.?Part Two explores the more abstract counterparts of the concepts outlined earlier in the text. The reader is introduced to the fundamental spaces of analysis, including Lp spaces, and the book successfully details how appropriate definitions of integration, continuity, and differentiation lead to a powerful and widely applicable foundation for further study of applied mathematics. The interrelation between measure theory, topology, and differentiation is then examined in the proof of the Multidimensional Substitution Formula. Further areas of coverage in this section include manifolds, Stokes' Theorem, Hilbert spaces, the convergence of Fourier series, and Riesz' Representation Theorem.?Part Three provides an overview of the motivations for analysis as well as its applications in various subjects. A special focus on ordinary and partial differential equations presents some theoretical and practical challenges that exist in these areas. Topical coverage includes Navier-Stokes equations and the finite element method.Mathematical Analysis: A Concise Introduction includes an extensive index and over 900 exercises ranging in level of difficulty, from conceptual questions and adaptations of proofs to proofs with and without hints. These opportunities for reinforcement, along with the overall concise and well-organized treatment of analysis, make this book essential for readers in upper-undergraduate or beginning graduate mathematics courses who would like to build a solid foundation in analysis for further work in all analysis-based branches of mathematics. Zusammenfassung A self-contained introduction to the fundamentals of mathematical analysis Mathematical Analysis: A Concise Introduction presents the foundations of analysis and illustrates its role in mathematics. Inhaltsverzeichnis Preface xi Part I: Analysis of Functions of a Single Real Variable 1 The Real Numbers 1 1.1 Field Axioms 1 1.2 Order Axioms 4 1.3 Lowest Upper and Greatest Lower Bounds 8 1.4 Natural Numbers, Integers, and Rational Numbers 11 1.5 Recursion, Induction, Summations, and Products 17 2 Sequences of Real Number V 25 2.1 Limits 25 2.2 Limit Laws 30 2.3 Cauchy Sequences 36 2.4 Bounded Sequences 40 2.5 Infinite Limits 44 3 Con...
List of contents
Preface.
PART I. ANALYSIS OF FUNCTIONS OF A SINGLE REAL VARIABLE.
1. The Real Numbers.
2. Sequences of Real Numbers.
3. Continuous Functions.
4. Differentiable Functions.
5. The Riemann Integral I.
6. Series of Real Numbers I.
7. Some Set Theory.
8. The Riemann Integral II.
9. The Lebesgue Integral.
10. Series of Real Numbers II.
11. Sequences of Functions.
12. Transcendental Functions.
13. Numerical Methods 203.
PART II. ANALYSIS IN ABSTRACT SPACES.
14. Integration on Measure Spaces.
15. The Abstract Venues for Analysis.
16. The Topology of Metric Spaces.
17. Differentiation in Normed Spaces.
18. Measure, Topology and Differentiation.
19. Manifolds and Integral Theorems.
20. Hilbert Spaces.
PART III. APPLIED ANALYSIS.
21. Physics Background.
22. Ordinary Differential Equations.
23. The Finite Element Method.
Conclusion and Outlook.
APPENDICES.
A. Logic.
B. Set Theory.
C. Natural Numbers, Integers and Rational Numbers.
Bibliography.
Index.
Report
"This highly original, interesting and very useful book includes over 900 exercises which are ranging in levels of difficulty, from conceptual questions and adaptations of proofs to proofs with and without hints." ( Mathematical Reviews , 2008h)
