Real analysis

This is a course in real analysis directed at advanced undergraduates and beginning graduate students in mathematics and related fields. Presupposing only a modest background in real analysis or advanced calculus, the book offers something to specialists and non-specialists. The course consists of three major topics: metric and normed linear spaces, function spaces, and Lebesgue measure and integration on the line. In an informal style, the author gives motivation and overview of new ideas, while supplying full details and proofs. He includes historical commentary, recommends articles for specialists and non-specialists, and provides exercises and suggestions for further study. This text for a first graduate course in real analysis was written to accommodate the heterogeneous audiences found at the masters level: students interested in pure and applied mathematics, statistics, education, engineering, and economics.

• Preface
• Part I. Metric Spaces: 1. Calculus review
• 2. Countable and uncountable sets
• 3. Metrics and norms
• 4. Open sets and closed sets
• 5. Continuity
• 6. Connected sets
• 7. Completeness
• 8. Compactness
• 9. Category
• Part II. Function Spaces: 10. Sequences of functions
• 11. The space of continuous functions
• 12. The Stone-Weierstrass theorem
• 13. Functions of bounded variation
• 14. The Riemann-Stieltjes integral
• 15. Fourier series
• Part III. Lebesgue Measure and Integration: 16. Lebesgue measure
• 17. Measurable functions
• 18. The Lebesgue integral
• 19. Additional topics
• 20. Differentiation
• References
• Index.