| Saul Stahl - Mathematics - 1999 - 269 pages
A provocative look at the tools and history of real analysis This new work from award-winning author Saul Stahl offers a real treat for students of analysis. Combining ... | |
| N. L. Carothers - Mathematics - 2000 - 401 pages
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 ... | |
| Stephen Abbott - Mathematics - 2002 - 260 pages
This elementary presentation exposes readers to both the process of rigor and the rewards inherent in taking an axiomatic approach to the study of functions of a real variable ... | |
| C.H.Jr. Edwards - Mathematics - 1994 - 368 pages
This is a lucid account of the highlights in the historical development of the calculus from ancient to modern times - from the beginnings of geometry in antiquity to the ... | |
| Patrick Fitzpatrick - Mathematics - 1996 - 228 pages
Real Analysis is a shorter version of the author's Advanced Calculus text, and contains just the first nine chapters from the longer text. It provides a rigorous treatment of ... | |
| Peter Walker - Mathematics - 2004 - 287 pages
Examples and Theorems in Analysis takes a unique and very practical approach to mathematical analysis. It makes the subject more accessible by giving the examples equal status ... | |
| Herbert S. Gaskill, P. P. Narayanaswami - Mathematics - 1998 - 501 pages
Comprehensive in coverage, this book explores the principles of logic, the axioms for the real numbers, limits of sequences, limits of functions, differentiation and ... | |
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