| LDR | | 00000nam u2200205 4500 |
| 001 | | 000000433334 |
| 005 | | 20200225140514 |
| 008 | | 200131s2019 ||||||||||||||||| ||eng d |
| 020 | |
▼a 9781085793858 |
| 035 | |
▼a (MiAaPQ)AAI13884725 |
| 040 | |
▼a MiAaPQ
▼c MiAaPQ
▼d 247004 |
| 082 | 0 |
▼a 510 |
| 100 | 1 |
▼a Chen, Kai-Chieh. |
| 245 | 10 |
▼a Kashaev-Reshetikhin Invariants for SL2(C) at Roots of Unity. |
| 260 | |
▼a [S.l.]:
▼b University of California, Berkeley.,
▼c 2019. |
| 260 | 1 |
▼a Ann Arbor:
▼b ProQuest Dissertations & Theses,
▼c 2019. |
| 300 | |
▼a 77 p. |
| 500 | |
▼a Source: Dissertations Abstracts International, Volume: 81-04, Section: B. |
| 500 | |
▼a Advisor: Reshetikhin, Nicolai. |
| 502 | 1 |
▼a Thesis (Ph.D.)--University of California, Berkeley, 2019. |
| 506 | |
▼a This item must not be sold to any third party vendors. |
| 520 | |
▼a An important milestone of the theory of knot invariants is the Reshetikhin-Turaev functor introduced in [RT]. This construction could generate tangle invariants from quantum groups. Later, Kashaev and Reshetikhin generalizes this construction [KR1] based on the idea of the holonomy braiding, the braiding defined for C-colored diagrams. The purpose of this work is to have some discussion of this construction. There are three parts in this thesis: first the full description of the construction is provided. Then in the second part, some examples computed via Mathematica are shown. And some properties and theorems are given in the end. |
| 590 | |
▼a School code: 0028. |
| 650 | 4 |
▼a Mathematics. |
| 690 | |
▼a 0405 |
| 710 | 20 |
▼a University of California, Berkeley.
▼b Mathematics. |
| 773 | 0 |
▼t Dissertations Abstracts International
▼g 81-04B. |
| 773 | |
▼t Dissertation Abstract International |
| 790 | |
▼a 0028 |
| 791 | |
▼a Ph.D. |
| 792 | |
▼a 2019 |
| 793 | |
▼a English |
| 856 | 40 |
▼u http://www.riss.kr/pdu/ddodLink.do?id=T15491389
▼n KERIS
▼z 이 자료의 원문은 한국교육학술정보원에서 제공합니다. |
| 980 | |
▼a 202002
▼f 2020 |
| 990 | |
▼a ***1816162 |
| 991 | |
▼a E-BOOK |