CiNii Books - Categorical homotopy theory

Author(s)

- Riehl, Emily

Bibliographic Information

Categorical homotopy theory

Emily Riehl

（New mathematical monographs, 24）

Cambridge University Press, 2014

Available at / 15 libraries

Osaka University, Main Library

12200299639

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Okayama University Library学部

415.7/R016000451695

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Science and Technology Library, Kyushu University

415.7/R 38031212017000111

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Library, Research Institute for Mathematical Sciences, Kyoto University数研

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京都大学理学部数学

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Kobe University Library for Science and Technology

410-8-303//24030201400774

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中央大学図書館理工学部分館数学

514.24/R5500027458272

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東京大学柏図書館数物

M:Riehl8950100837

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東京大学数理科学研究科図書

FU:Riehl:E.8010624263

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Kita-Aobayama Library,Tohoku University図

02140009821

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独立行政法人国立高等専門学校機構香川高等専門学校高松キャンパス図書館

415.7||R381081879

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Kyoto University Library

415.7||R 38

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Nagoya University Library理数理

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Hokkaido University, Library, Graduate School of Science, Faculty of Science and School of Science数学

/R 4442080348786

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琉球大学附属図書館

415.7||RI2014401798,2014401797

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Note

Includes bibliographical references (p. 337-341) and index

Description and Table of Contents

Description

This book develops abstract homotopy theory from the categorical perspective with a particular focus on examples. Part I discusses two competing perspectives by which one typically first encounters homotopy (co)limits: either as derived functors definable when the appropriate diagram categories admit a compatible model structure, or through particular formulae that give the right notion in certain examples. Emily Riehl unifies these seemingly rival perspectives and demonstrates that model structures on diagram categories are irrelevant. Homotopy (co)limits are explained to be a special case of weighted (co)limits, a foundational topic in enriched category theory. In Part II, Riehl further examines this topic, separating categorical arguments from homotopical ones. Part III treats the most ubiquitous axiomatic framework for homotopy theory - Quillen's model categories. Here, Riehl simplifies familiar model categorical lemmas and definitions by focusing on weak factorization systems. Part IV introduces quasi-categories and homotopy coherence.

Table of Contents

Part I. Derived Functors and Homotopy (Co)limits: 1. All concepts are Kan extensions
2. Derived functors via deformations
3. Basic concepts of enriched category theory
4. The unreasonably effective (co)bar construction
5. Homotopy limits and colimits: the theory
6. Homotopy limits and colimits: the practice
Part II. Enriched Homotopy Theory: 7. Weighted limits and colimits
8. Categorical tools for homotopy (co)limit computations
9. Weighted homotopy limits and colimits
10. Derived enrichment
Part III. Model Categories and Weak Factorization Systems: 11. Weak factorization systems in model categories
12. Algebraic perspectives on the small object argument
13. Enriched factorizations and enriched lifting properties
14. A brief tour of Reedy category theory
Part IV. Quasi-Categories: 15. Preliminaries on quasi-categories
16. Simplicial categories and homotopy coherence
17. Isomorphisms in quasi-categories
18. A sampling of 2-categorical aspects of quasi-category theory.

by "Nielsen BookData"