| Elements of Abstract Analysis 2002 Edition Contributor(s): O'Searcoid, Mícheál (Author) |
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ISBN: 185233424X ISBN-13: 9781852334246 Publisher: Springer OUR PRICE: $36.09 Product Type: Paperback Published: November 2001 Annotation: While there are many books on functional analysis, Elements of Abstract Analysis takes a very different approach. Unlike other books, it provides a comprehensive overview of the elementary concepts of analysis while preparing students to cross the threshold of functional analysis. The book is written specifically for final-year undergraduate students who should already be familiar with most of the mathematical structures discussed - for example, rings, linear spaces, and metric spaces - and with many of the principal analytical concepts - convergence, connectedness, continuity, compactness and completeness. It reviews the concepts at a slightly greater level of abstraction and enables students to understand their place within the broad framework of set-based mathematics. Carefully crafted, clearly written and precise, and with numerous exercises and examples, Elements of Abstract Analysis is a rigorous, self-contained introduction to functional analysis that will also serve as a text on abstract mathematics. |
| Additional Information |
| BISAC Categories: - Mathematics | Calculus - Mathematics | Probability & Statistics - General - Mathematics | Mathematical Analysis |
| Dewey: 515.7 |
| LCCN: 2001042665 |
| Series: Springer Undergraduate Mathematics |
| Physical Information: 0.76" H x 6.7" W x 9.16" (1.11 lbs) 300 pages |
| Descriptions, Reviews, Etc. |
| Publisher Description: In nature's infinite book ofsecrecy A little I can read. Antony and Cleopatra, l. ii. This is a book about a few elementary concepts of analysis and the mathe- matical structures which enfold them. It is more concerned with the interplay amongst these concepts than with their many applications. The book is self-contained; in the first chapter, after acknowledging the fundamental role ofmathematical logic, wepresent seven axioms of Set Theory; everything else is developed from these axioms. It would therefore be true, if misleading, to say that the reader requires no prior knowledge of mathematics. In reality, the reader we have in mind has that level of sophistication achieved in about three years of undergraduate study of mathematics and is already well acquainted with most of the structures discussed-rings, linear spaces, metric spaces, and soon-and with many ofthe principal analytical concepts- convergence, connectedness, continuity, compactness and completeness. Indeed, it is only after gaining familiarity with these concepts and their applications that it is possible to appreciate their place within a broad framework of set- based mathematics and to consolidate an understanding of them in such a framework. To aid in these pursuits, wepresent our reader with things familiar and things new side by side in most parts of the book-and we sometimes adopt an unusual perspective. That this is not an analysis textbook is clear from its many omissions. |