TY - BOOK AU - Bartle, G. Robert TI - A modern theory of integration T2 - Graduate studies in mathematics SN - 9780821852156 AV - QA312 PY - 2001///] CY - Rhode Island PB - American Mathematical Society KW - Mathematics N1 - Part 1. Integration on compact intervals Chapter 1. Gauges and integrals Chapter 2. Some examples Chapter 3. Basic properties of the integral Chapter 4. The fundamental theorems of calculus Chapter 5. The Saks-Henstock lemma Chapter 6. Measurable functions Chapter 7. Absolute integrability Chapter 8. Convergence theorems Chapter 9. Integrability and mean convergence Chapter 10. Measure, measurability, and multipliers Chapter 11. Modes of convergence Chapter 12. Applications to calculus Chapter 13. Substitution theorems Chapter 14. Absolute continuity Part 2. Integration on infinite intervals Chapter 15. Introduction to Part 2 Chapter 16. Infinite intervals Chapter 17. Further re-examination Chapter 18. Measurable sets Chapter 19. Measurable functions Chapter 20. Sequences of functions N2 - This book gives an introduction to integration theory via the "generalized Riemann integral" due to Henstock and Kurzweil. The class of integrable functions coincides with those of Denjoy and Perron and includes all conditionally convergent improper integrals as well as the Lebesgue integrable functions. Using this general integral the author gives a full treatment of the Lebesgue integral on the line. The book is designed for students of mathematics and of the natural sciences and economics. An understanding of elementary real analysis is assumed, but no familiarity with topology or measure theory is needed. The author provides many examples and a large collection of exercises—many with solutions. UR - https://www.ams.org/books/gsm/032/ ER -