A termék adatai:
| ISBN13: | 9781009498982 |
| ISBN10: | 1009498983 |
| Kötéstípus: | Puhakötés |
| Terjedelem: | 666 oldal |
| Méret: | 227x151x31 mm |
| Súly: | 1040 g |
| Nyelv: | angol |
| 700 |
Témakör:
Polygraphs: From Rewriting to Higher Categories
Sorozatcím:
London Mathematical Society Lecture Note Series;
495;
Kiadó: Cambridge University Press
Megjelenés dátuma: 2025. április 3.
Normál ár:
Kiadói listaár:
GBP 90.00
GBP 90.00
Az Ön ára:
40 994 (39 042 Ft + 5% áfa )
Kedvezmény(ek): 10% (kb. 4 555 Ft)
A kedvezmény csak az 'Értesítés a kedvenc témákról' hírlevelünk címzettjeinek rendeléseire érvényes.
Kattintson ide a feliratkozáshoz
Kattintson ide a feliratkozáshoz
Beszerezhetőség:
Még nem jelent meg, de rendelhető. A megjelenéstől számított néhány héten belül megérkezik.
Rövid leírás:
The first book to use the unified approach provided by polygraphs to describe the theory of rewriting.
Hosszú leírás:
This is the first book to revisit the theory of rewriting in the context of strict higher categories, through the unified approach provided by polygraphs, and put it in the context of homotopical algebra. The first half explores the theory of polygraphs in low dimensions and its applications to the computation of the coherence of algebraic structures. Illustrated with algorithmic computations on algebraic structures, the only prerequisite in this section is basic category theory. The theory is introduced step-by-step, with detailed proofs. The second half introduces and studies the general notion of n-polygraph, before addressing the homotopy theory of these polygraphs. It constructs the folk model structure on the category on strict higher categories and exhibits polygraphs as cofibrant objects. This allows the formulation of higher-dimensional generalizations of the coherence results developed in the first half. Graduate students and researchers in mathematics and computer science will find this work invaluable.
Tartalomjegyzék:
Part I. Fundamentals of Rewriting: 1. Abstract rewriting and one-dimensional polygraphs; 2. Two-dimensional polygraphs; 3. Operations on presentations; 4. String rewriting and 2-polygraphs; 5. Tietze transformations and completion; 6. Linear rewriting; Part II. Coherent Presentations: 7. Coherence by convergence; 8. Categories of finite derivation type; 9. Homological syzygies and confluence; Part III. Diagram Rewriting: 10. Three-dimensional polygraphs; 11. Termination of 3-polygraphs; 12. Coherent presentations of 2-categories; 13. Term rewriting systems; Part IV. Polygraphs: 14. Higher categories; 15. Polygraphs; 16. Properties of the category of -----polygraphs; 17. A catalogue of -----polygraphs; 18. Generalized polygraphs; Part V. Homotopy Theory of Polygraphs; 19. Polygraphic resolutions; 20. Towards the folk model structure; 21. The folk model structure; 22. Homology of -----categories; 23. Resolutions by (----, 1)-polygraphs; Appendix A. A catalogue of 2-polygraphs; Appendix B. Examples of coherent presentations of monoids; Appendix C. A catalogue of 3-polygraphs; Appendix D. A syntactic description of free -----categories; Appendix E. Complexes and homology; Appendix F. Homology of categories; Appendix G. Locally presentable categories; Appendix H. Model categories; References; Index of notations; Index of terminology.Part I. Fundamentals of Rewriting: 1. Abstract rewriting and one-dimensional polygraphs; 2. Two-dimensional polygraphs; 3. Operations on presentations; 4. String rewriting and 2-polygraphs; 5. Tietze transformations and completion; 6. Linear rewriting; Part II. Coherent Presentations: 7. Coherence by convergence; 8. Categories of finite derivation type; 9. Homological syzygies and confluence; Part III. Diagram Rewriting: 10. Three-dimensional polygraphs; 11. Termination of 3-polygraphs; 12. Coherent presentations of 2-categories; 13. Term rewriting systems; Part IV. Polygraphs: 14. Higher categories; 15. Polygraphs; 16. Properties of the category of -----polygraphs; 17. A catalogue of -----polygraphs; 18. Generalized polygraphs; Part V. Homotopy Theory of Polygraphs: 19. Polygraphic resolutions; 20. Towards the folk model structure; 21. The folk model structure; 22. Homology of -----categories; 23. Resolutions by (----, 1)-polygraphs; Appendix A. A catalogue of 2-polygraphs; Appendix B. Examples of coherent presentations of monoids; Appendix C. A catalogue of 3-polygraphs; Appendix D. A syntactic description of free -----categories; Appendix E. Complexes and homology; Appendix F. Homology of categories; Appendix G. Locally presentable categories; Appendix H. Model categories; References; Index of notations; Index of terminology.