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| 020 | _a0070990115 | ||
| 037 | _cTextual | ||
| 040 |
_aCSL _beng _cCSL |
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| 041 | _aeng | ||
| 084 |
_aB316 M1 TB _qCSL |
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| 100 |
_aLipschutz, Seymour _9861772 |
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| 245 | 0 | _aSchaum's outline of theory and problem of general topology | |
| 260 |
_aSingagore, _bMcGraw Hill Book Company: _c1965. |
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| 300 |
_a239p. _b: ill. |
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| 490 | _aShaum's outline series | ||
| 500 | _aAppendix 225-234p.; Index 235-239p. | ||
| 520 | _aNow an essential part of the mathematical background for both graduate and undergraduate students, general topology, or point set topology, is explained here clearly and concisely. Definitions, principles and theorems are illustrated and reinforced with hundreds of problems with detailed solutions. Hundreds of additional problems with answers help students guage their mastery as they progress. An appendix provides quick access to the basic principles of real numbers, making this a handy reference, too. Table of Content: Sets and Relations Functions Cardinality, Order Topology of the Line and Plane Topological Spaces Definitions Bases and Subbases Continuity and Topological Equivalence Metric and Normed Spaces Countability Separation Axioms Compactness Product Spaces Connectedness Complete Metric Spaces Function Spaces Appendix Properties of the Real Numbers | ||
| 650 |
_aMetric _9861773 |
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| 650 |
_aSets _9861774 |
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| 700 |
_aLipschutz, Seymour _9861772 |
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_hB316 M1 TB _cTB _2CC _n0 |
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_c17522 _d17522 |
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