Deformation theory of algebras and their diagrams (Record no. 1644)
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| 000 -LEADER | |
|---|---|
| fixed length control field | 01566nam a2200217Ia 4500 |
| 003 - CONTROL NUMBER IDENTIFIER | |
| control field | OSt |
| 005 - DATE AND TIME OF LATEST TRANSACTION | |
| control field | 20240923165702.0 |
| 008 - FIXED-LENGTH DATA ELEMENTS--GENERAL INFORMATION | |
| fixed length control field | 180205s9999 xx 000 0 und d |
| 020 ## - INTERNATIONAL STANDARD BOOK NUMBER | |
| International Standard Book Number | 978-0-8218-8979-4 |
| 040 ## - CATALOGING SOURCE | |
| Original cataloging agency | ICTS-TIFR |
| 050 ## - LIBRARY OF CONGRESS CALL NUMBER | |
| Classification number | QA169 |
| 100 ## - MAIN ENTRY--PERSONAL NAME | |
| Personal name | Martin Markl |
| 245 ## - TITLE STATEMENT | |
| Title | Deformation theory of algebras and their diagrams |
| 260 ## - PUBLICATION, DISTRIBUTION, ETC. | |
| Name of publisher, distributor, etc. | American Mathematical Society, |
| Date of publication, distribution, etc. | [c2012] |
| Place of publication, distribution, etc. | Rhode Island: |
| 300 ## - Physical Description | |
| Pages: | 129 p. |
| 490 ## - SERIES STATEMENT | |
| Series statement | CBMS Regional Conference Series in Mathematics |
| Volume/sequential designation | Volume 116 |
| 505 ## - FORMATTED CONTENTS NOTE | |
| Formatted contents note | Chapter 1. Basic notions<br/>Chapter 2. Deformations and cohomology<br/>Chapter 3. Finer structures of cohomology<br/>Chapter 4. The gauge group<br/>Chapter 5. The simplicial Maurer-Cartan space<br/>Chapter 6. Strongly homotopy Lie algebras<br/>Chapter 7. Homotopy invariance and quantization<br/>Chapter 8. Brief introduction to operads<br/>Chapter 9. L∞-algebras governing deformations<br/>Chapter 10. Examples<br/> |
| 520 ## - SUMMARY, ETC. | |
| Summary, etc. | This book brings together both the classical and current aspects of deformation theory. The presentation is mostly self-contained, assuming only basic knowledge of commutative algebra, homological algebra and category theory. In the interest of readability, some technically complicated proofs have been omitted when a suitable reference was available. The relation between the uniform continuity of algebraic maps and topologized tensor products is explained in detail, however, as this subject does not seem to be commonly known and the literature is scarce. ---summary provided by publisher |
| 650 ## - SUBJECT ADDED ENTRY--TOPICAL TERM | |
| Topical term or geographic name entry element | Mathematics |
| 942 ## - ADDED ENTRY ELEMENTS (KOHA) | |
| Source of classification or shelving scheme | |
| Koha item type | Book |
| Withdrawn status | Lost status | Damaged status | Not for loan | Collection code | Home library | Shelving location | Date acquired | Full call number | Accession No. | Koha item type |
|---|---|---|---|---|---|---|---|---|---|---|
| ICTS | Rack No 4 | 01/18/2018 | QA169 | 00904 | Book |