| Ethan D. Bloch - Mathematics - 1997 - 421 pages
The uniqueness of this text in combining geometric topology and differential geometry lies in its unifying thread: the notion of a surface. With numerous illustrations ... | |
| Ethan D. Bloch - Mathematics - 2011 - 358 pages
“Proofs and Fundamentals: A First Course in Abstract Mathematics” 2nd edition is designed as a "transition" course to introduce undergraduates to the writing of rigorous ... | |
| John M. Howie - Mathematics - 2001 - 276 pages
Understanding the concepts and methods of real analysis is an essential skill for every undergraduate mathematics student. Written in an easy-to-read style, Real Analysis is a ... | |
| Michael Spivak - Mathematics - 2006 - 670 pages
Spivak's celebrated Calculus is ideal for mathematics majors seeking an alternative to doorstop textbooks and formidable introductions to real analysis. | |
| Vladimir A. Zorich - Mathematics - 2004 - 574 pages
This softcover edition of a very popular two-volume work presents a thorough first course in analysis, leading from real numbers to such advanced topics as differential forms ... | |
| 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 ... | |
| 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 ... | |
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