First course in topology : continuity and dimension
Material type:
TextLanguage: English Series: Student mathematical library ; volume 31Publication details: Hyderabad : Universities Press, 2011. Description: xii, 211p. : ill. ; 22 cmISBN: 9780821868935Subject(s): TopologyDDC classification: 515.1 Online resources: Table of Contents | Reviews Summary: How many dimensions does our universe require for a comprehensive physical description? In 1905, Poincaré argued philosophically about the necessity of the three familiar dimensions, while recent research is based on 11 dimensions or even 23 dimensions. The notion of dimension itself presented a basic problem to the pioneers of topology. Cantor asked if dimension was a topological feature of Euclidean space. To answer this question, some important topological ideas were introduced by Brouwer, giving shape to a subject whose development dominated the twentieth century.
The basic notions in topology are varied and a comprehensive grounding in point-set topology, the definition and use of the fundamental group, and the beginnings of homology theory requires considerable time. The goal of this book is a focused introduction through these classical topics, aiming throughout at the classical result of the Invariance of Dimension.
This text is based on the author's course given at Vassar College and is intended for advanced undergraduate students. It is suitable for a semester-long course on topology for students who have studied real analysis and linear algebra. It is also a good choice for a capstone course, senior seminar, or independent study.
| Item type | Current library | Call number | Status | Date due | Barcode |
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NBHM Books
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NISER LIBRARY | 515.1 MCC-F (Browse shelf(Opens below)) | Available | N64 | |
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NBHM Books
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SMS Library | 515.1 MCC-F (Browse shelf(Opens below)) | Available | N419 |
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| 515.1 FLA-K Knots,molecules,and the universe | 515.1 GOO-B Beginning topology | 515.1 JAN-T Topology | 515.1 MCC-F First course in topology : continuity and dimension | 515.1 MUN-T Topology | 515.1 MUN-T Topology | 515.1 MUN-T Topology |
Includes bibliographical references (p. 201-205) and index.
How many dimensions does our universe require for a comprehensive physical description? In 1905, Poincaré argued philosophically about the necessity of the three familiar dimensions, while recent research is based on 11 dimensions or even 23 dimensions. The notion of dimension itself presented a basic problem to the pioneers of topology. Cantor asked if dimension was a topological feature of Euclidean space. To answer this question, some important topological ideas were introduced by Brouwer, giving shape to a subject whose development dominated the twentieth century.
The basic notions in topology are varied and a comprehensive grounding in point-set topology, the definition and use of the fundamental group, and the beginnings of homology theory requires considerable time. The goal of this book is a focused introduction through these classical topics, aiming throughout at the classical result of the Invariance of Dimension.
This text is based on the author's course given at Vassar College and is intended for advanced undergraduate students. It is suitable for a semester-long course on topology for students who have studied real analysis and linear algebra. It is also a good choice for a capstone course, senior seminar, or independent study.
Undergraduate and graduate students interested in topology.
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