A Comprehensive Textbook on Metric Spaces/ Surinder Pal Singh Kainth
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TextPublication details: Singapore: Springer Nature, 2023. Description: xvi,344pISBN: 9789819927371DDC classification: 514.2 Summary: This textbook provides a comprehensive course in metric spaces. Presenting a smooth takeoff from basic real analysis to metric spaces, every chapter of the book presents a single concept, which is further unfolded and elaborated through related sections and subsections. Apart from a unique new presentation and being a comprehensive textbook on metric spaces, it contains some special concepts and new proofs of old results, which are not available in any other book on metric spaces. It has individual chapters on homeomorphisms and the Cantor set. This book is almost self-contained and has an abundance of examples, exercises, references and remarks about the history of basic notions and results. Every chapter of this book includes brief hints and solutions to selected exercises. It is targeted to serve as a textbook for advanced undergraduate and beginning graduate students of mathematics.
| Item type | Current library | Call number | Materials specified | Status | Date due | Barcode |
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| Books | TIFR CAM Library | 514.2 KAI (Browse shelf(Opens below)) | Available | M12249 |
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| 514.2 HEN Combinatorial introduction to topology | 514.2 IZE Equivariant degree theory | 514.2 JOS Introduction to general topology | 514.2 KAI A Comprehensive Textbook on Metric Spaces/ | 514.2 KHE Geometry of infinite-dimensional groups | 514.2 KUL Non-Euclidean geometry | 514.2 LEE Seifert fiberings |
This textbook provides a comprehensive course in metric spaces. Presenting a smooth takeoff from basic real analysis to metric spaces, every chapter of the book presents a single concept, which is further unfolded and elaborated through related sections and subsections. Apart from a unique new presentation and being a comprehensive textbook on metric spaces, it contains some special concepts and new proofs of old results, which are not available in any other book on metric spaces. It has individual chapters on homeomorphisms and the Cantor set. This book is almost self-contained and has an abundance of examples, exercises, references and remarks about the history of basic notions and results. Every chapter of this book includes brief hints and solutions to selected exercises. It is targeted to serve as a textbook for advanced undergraduate and beginning graduate students of mathematics.
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