Sheaf theory through examples / / Daniel Rosiak.
"This book presents copious and sometimes unexpected examples of sheaf theory, a mathematical tool with promising applications in data science and engineering and in efforts to apply category theory more widely"--
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| Place / Publishing House: | Cambridge, Massachusetts : : The MIT Press,, [2022] |
| Year of Publication: | 2022 |
| Edition: | 1st ed. |
| Language: | English |
| Series: | The MIT Press
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| Physical Description: | 1 online resource (642 pages) |
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(CKB)5680000000039150 (MiAaPQ)EBC30166290 (Au-PeEL)EBL30166290 (OCoLC)1333708310 (oapen)https://directory.doabooks.org/handle/20.500.12854/93884 (OCoLC-P)1333708310 (MaCbMITP)12581 (EXLCZ)995680000000039150 |
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Rosiak, Daniel, author. Sheaf theory through examples / Daniel Rosiak. 1st ed. Cambridge, Massachusetts : The MIT Press, [2022] 1 online resource (642 pages) text txt rdacontent computer c rdamedia online resource cr rdacarrier The MIT Press Intro -- Title Page -- Copyright -- Dedication -- Contents -- Acknowledgments -- Introduction -- 1. Categories -- 1.1. Categorical Preliminaries -- 1.2. A Few More Examples -- 1.3. Returning to the Definition and Distinctions of Size -- 1.4. Some New Categories from Old -- 1.5. Aside on "No Objects" -- 2. Prelude to Sheaves: Presheaves -- 2.1. Functors -- 2.2. Natural Transformations -- 2.3. Seeing Structures as Presheaves -- 2.4. The Presheaf Action -- 2.5. Philosophical Pass: The Four Action Perspectives -- 3. Universal Constructions -- 3.1. Limits and Colimits -- 3.2. Philosophical Pass: Universality and Mediation -- 4. Topology: A First Pass at Space -- 4.1. Motivation -- 4.2. A Dialogue Introducing the Key Notions of Topology -- 4.3. Topology and Topological Spaces More Formally -- 4.4. Philosophical Pass: Open Questions -- 5. First Look at Sheaves -- 5.1. Sheaves: The Topological Definition -- 5.2. Examples -- 5.3. Philosophical Pass: Sheaf as Local-Global Passage -- 6. There's a Yoneda Lemma for That -- 6.1. First, Enrichment! -- 6.2. Downsets and Yoneda in the Miniature -- 6.3. Representability Simplified -- 6.4. More on Representability, Fixed Points, and a Paradox -- 6.5. Yoneda in the General -- 6.6. Philosophical Pass: Yoneda and Relationality -- 7. Adjunctions -- 7.1. Adjunctions through Morphology -- 7.2. Adjunctions through Modalities -- 7.3. Some Additional Adjunctions and Final Thoughts -- 7.4. Philosophical Pass: The Idea of Adjointness -- 8. Sheaves Revisited -- 8.1. Three Historically Significant Examples -- 8.2. What Is Not a Sheaf? -- 8.3. Presheaves and Sheaves in Order Theory -- 9. Cellular Sheaf Cohomology through Examples -- 9.1. Simplices and Their Sheaves -- 9.2. Sheaf Cohomology -- 9.3. Philosophical Pass: Sheaf Cohomology -- 9.4. A Glimpse into Cosheaves -- 10. Sheaves on a Site. 10.1. Revisiting Covers: Toward General Sheaves -- 10.2. Grothendieck Toposes -- 10.3. A Few More Examples -- 10.4. Philosophical Pass: The Idea of Toposes -- 11. Elementary Toposes -- 11.1. The Subobject Classifier -- 11.2. Examples of Elementary Toposes -- 11.3. Lawvere-Tierney Topologies and Their Sheaves -- 11.4. Morphisms of Toposes -- 11.5. Toward Cohesive Toposes -- A: Appendix (Revisiting Topology) -- A.1. Conceptual Motivation: Topology as Logic of Finite Observations -- A.2. Explicit Connections to Modal Logic -- A.3. The Idea of All This -- A.4. Why Opens? -- A.5. What Is Topology Really About? -- References -- Index. English "This book presents copious and sometimes unexpected examples of sheaf theory, a mathematical tool with promising applications in data science and engineering and in efforts to apply category theory more widely"-- Provided by publisher. OCLC-licensed vendor bibliographic record. Sheaf theory. MATHEMATICS / Logic MATHEMATICS / Topology MATHEMATICS / Algebra / General 0-262-54215-3 |
| language |
English |
| format |
eBook |
| author |
Rosiak, Daniel, |
| spellingShingle |
Rosiak, Daniel, Sheaf theory through examples / The MIT Press Intro -- Title Page -- Copyright -- Dedication -- Contents -- Acknowledgments -- Introduction -- 1. Categories -- 1.1. Categorical Preliminaries -- 1.2. A Few More Examples -- 1.3. Returning to the Definition and Distinctions of Size -- 1.4. Some New Categories from Old -- 1.5. Aside on "No Objects" -- 2. Prelude to Sheaves: Presheaves -- 2.1. Functors -- 2.2. Natural Transformations -- 2.3. Seeing Structures as Presheaves -- 2.4. The Presheaf Action -- 2.5. Philosophical Pass: The Four Action Perspectives -- 3. Universal Constructions -- 3.1. Limits and Colimits -- 3.2. Philosophical Pass: Universality and Mediation -- 4. Topology: A First Pass at Space -- 4.1. Motivation -- 4.2. A Dialogue Introducing the Key Notions of Topology -- 4.3. Topology and Topological Spaces More Formally -- 4.4. Philosophical Pass: Open Questions -- 5. First Look at Sheaves -- 5.1. Sheaves: The Topological Definition -- 5.2. Examples -- 5.3. Philosophical Pass: Sheaf as Local-Global Passage -- 6. There's a Yoneda Lemma for That -- 6.1. First, Enrichment! -- 6.2. Downsets and Yoneda in the Miniature -- 6.3. Representability Simplified -- 6.4. More on Representability, Fixed Points, and a Paradox -- 6.5. Yoneda in the General -- 6.6. Philosophical Pass: Yoneda and Relationality -- 7. Adjunctions -- 7.1. Adjunctions through Morphology -- 7.2. Adjunctions through Modalities -- 7.3. Some Additional Adjunctions and Final Thoughts -- 7.4. Philosophical Pass: The Idea of Adjointness -- 8. Sheaves Revisited -- 8.1. Three Historically Significant Examples -- 8.2. What Is Not a Sheaf? -- 8.3. Presheaves and Sheaves in Order Theory -- 9. Cellular Sheaf Cohomology through Examples -- 9.1. Simplices and Their Sheaves -- 9.2. Sheaf Cohomology -- 9.3. Philosophical Pass: Sheaf Cohomology -- 9.4. A Glimpse into Cosheaves -- 10. Sheaves on a Site. 10.1. Revisiting Covers: Toward General Sheaves -- 10.2. Grothendieck Toposes -- 10.3. A Few More Examples -- 10.4. Philosophical Pass: The Idea of Toposes -- 11. Elementary Toposes -- 11.1. The Subobject Classifier -- 11.2. Examples of Elementary Toposes -- 11.3. Lawvere-Tierney Topologies and Their Sheaves -- 11.4. Morphisms of Toposes -- 11.5. Toward Cohesive Toposes -- A: Appendix (Revisiting Topology) -- A.1. Conceptual Motivation: Topology as Logic of Finite Observations -- A.2. Explicit Connections to Modal Logic -- A.3. The Idea of All This -- A.4. Why Opens? -- A.5. What Is Topology Really About? -- References -- Index. |
| author_facet |
Rosiak, Daniel, |
| author_variant |
d r dr |
| author_role |
VerfasserIn |
| author_sort |
Rosiak, Daniel, |
| title |
Sheaf theory through examples / |
| title_full |
Sheaf theory through examples / Daniel Rosiak. |
| title_fullStr |
Sheaf theory through examples / Daniel Rosiak. |
| title_full_unstemmed |
Sheaf theory through examples / Daniel Rosiak. |
| title_auth |
Sheaf theory through examples / |
| title_new |
Sheaf theory through examples / |
| title_sort |
sheaf theory through examples / |
| series |
The MIT Press |
| series2 |
The MIT Press |
| publisher |
The MIT Press, |
| publishDate |
2022 |
| physical |
1 online resource (642 pages) |
| edition |
1st ed. |
| contents |
Intro -- Title Page -- Copyright -- Dedication -- Contents -- Acknowledgments -- Introduction -- 1. Categories -- 1.1. Categorical Preliminaries -- 1.2. A Few More Examples -- 1.3. Returning to the Definition and Distinctions of Size -- 1.4. Some New Categories from Old -- 1.5. Aside on "No Objects" -- 2. Prelude to Sheaves: Presheaves -- 2.1. Functors -- 2.2. Natural Transformations -- 2.3. Seeing Structures as Presheaves -- 2.4. The Presheaf Action -- 2.5. Philosophical Pass: The Four Action Perspectives -- 3. Universal Constructions -- 3.1. Limits and Colimits -- 3.2. Philosophical Pass: Universality and Mediation -- 4. Topology: A First Pass at Space -- 4.1. Motivation -- 4.2. A Dialogue Introducing the Key Notions of Topology -- 4.3. Topology and Topological Spaces More Formally -- 4.4. Philosophical Pass: Open Questions -- 5. First Look at Sheaves -- 5.1. Sheaves: The Topological Definition -- 5.2. Examples -- 5.3. Philosophical Pass: Sheaf as Local-Global Passage -- 6. There's a Yoneda Lemma for That -- 6.1. First, Enrichment! -- 6.2. Downsets and Yoneda in the Miniature -- 6.3. Representability Simplified -- 6.4. More on Representability, Fixed Points, and a Paradox -- 6.5. Yoneda in the General -- 6.6. Philosophical Pass: Yoneda and Relationality -- 7. Adjunctions -- 7.1. Adjunctions through Morphology -- 7.2. Adjunctions through Modalities -- 7.3. Some Additional Adjunctions and Final Thoughts -- 7.4. Philosophical Pass: The Idea of Adjointness -- 8. Sheaves Revisited -- 8.1. Three Historically Significant Examples -- 8.2. What Is Not a Sheaf? -- 8.3. Presheaves and Sheaves in Order Theory -- 9. Cellular Sheaf Cohomology through Examples -- 9.1. Simplices and Their Sheaves -- 9.2. Sheaf Cohomology -- 9.3. Philosophical Pass: Sheaf Cohomology -- 9.4. A Glimpse into Cosheaves -- 10. Sheaves on a Site. 10.1. Revisiting Covers: Toward General Sheaves -- 10.2. Grothendieck Toposes -- 10.3. A Few More Examples -- 10.4. Philosophical Pass: The Idea of Toposes -- 11. Elementary Toposes -- 11.1. The Subobject Classifier -- 11.2. Examples of Elementary Toposes -- 11.3. Lawvere-Tierney Topologies and Their Sheaves -- 11.4. Morphisms of Toposes -- 11.5. Toward Cohesive Toposes -- A: Appendix (Revisiting Topology) -- A.1. Conceptual Motivation: Topology as Logic of Finite Observations -- A.2. Explicit Connections to Modal Logic -- A.3. The Idea of All This -- A.4. Why Opens? -- A.5. What Is Topology Really About? -- References -- Index. |
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0-262-36237-6 0-262-37042-5 0-262-54215-3 |
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Q - Science |
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QA - Mathematics |
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QA612 |
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QA 3612.36 R67 42022EB |
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Not Illustrated |
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500 - Science |
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510 - Mathematics |
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514 - Topology |
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514/.224 |
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3514 3224 |
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514/.224 |
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514/.224 |
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1333708310 |
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Sheaf theory through examples / |
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