No.1714
—สŽqŒQ‚ฦ—สŽqƒgƒ|ƒƒW[
Quantum groups and quantum topology
RIMS Œค‹†W‰๏•๑W
 @
2010/04/19`2010/04/20
‘‰ช@ฒ
Akira Masuoka
@
–ฺ@ŽŸ
@
1. Note on the center of generalized quantum groups (Quantum groups and quantum topology)--------------------------------------------1
@@@@‘ๅใ‘ๅŠw๎•๑‰ศŠwŒค‹†‰ศ@@@ŽRช G”V@(Yamane,Hiroyuki)
@
2. DILOGARITHM IDENTITIES IN CONFORMAL FIELD THEORY AND CLUSTER ALGEBRAS (Quantum groups and quantum topology)----------------------26
@@@@–ผŒร‰ฎ‘ๅŠw‘ฝŒณ”—‰ศŠwŒค‹†‰ศ@@@’†ผ ’mŽ๗@(Nakanishi,Tomoki)
@
3. REPRESENTATIONS OF MULTICATEGORIES OF PLANAR DIAGRAMS AND TENSOR CATEGORIES (Quantum groups and quantum topology)----------------32
@@@@–ผŒร‰ฎ‘ๅŠw‘ฝŒณ”—‰ศŠwŒค‹†‰ศ@@@ŽRใ Ž @(YAMAGAMI,Shigeru)
@
4. HOPF ALGEBRAS AND POLYNOMIAL IDENTITIES (Quantum groups and quantum topology)----------------------------------------------------49
@@@@INSTITUT DE RECHERCHE MATHEMATIQUE AVANCEE, CNRS & UNIVERSITE DE STRASBOURG@@@KASSEL,CHRISTIAN
@
5. THE GROTHENDIECK-TEICHMULLER GROUP, THE DOUBLE SHUFFLE GROUP AND THE MOTIVIC GALOIS GROUP (Quantum groups and quantum topology)---63
@@@@–ผŒร‰ฎ‘ๅŠw‘ฝŒณ”—‰ศŠwŒค‹†‰ศ@@@Œรฏ ‰p˜a@(FURUSHO,HIDEKAZU)
@
6. Dynamical braided monoids and dynamical Yang-Baxter maps (Quantum groups and quantum topology)-----------------------------------80
@@@@–kŠC“น‘ๅŠw—Šw•””Šw‰ศ@@@เF์ —zˆ๊@(Shibukawa,Youichi)
@
7. ƒŒƒ“ƒY‹๓Šิ‚ฬƒXƒsƒ“\‘ข‚ษ—R—ˆ‚ต‚ฝReshetikhin-Turaev $SU(2)$ •s•ฯ—ส‚ษ‚ย‚ข‚ฤ (—สŽqŒQ‚ฦ—สŽqƒgƒ|ƒƒW[)-------------------------------90
@@@@‹ž“s‘ๅŠw”—‰๐อŒค‹†Š@@@‰ช่ Œš‘พ@(Okazaki,Kenta)
@
8. QUANTUM $(\mathfrak{sl}_n, \wedge V_n)$ LINK INVARIANT AND MATRIX FACTORIZATIONS (Quantum groups and quantum topology)-----------96
@@@@–ผŒร‰ฎ‘ๅŠw‘ฝŒณ”—‰ศŠwŒค‹†‰ศ@@@•ฤเV ND@(YONEZAWA,YASUYOSHI)
@
9. SOME APPLICATIONS OF THE COLORED ALEXANDER INVARIANT (Quantum groups and quantum topology)--------------------------------------105
@@@@‘ˆ๎“c‘ๅŠw—HŠw•”@@@‘บใ ‡@(MURAKAMI,JUN)
@
10. On the universal $sl_2$ invariant of bottom tangles (Quantum groups and quantum topology)--------------------------------------127
@@@@‹ž“s‘ๅŠw”—‰๐อŒค‹†Š@@@—้–ุ ็ˆ฿@(Suzuki,Sakie)
@
11. Invariants for knotted handlebodies (Quantum groups and quantum topology)------------------------------------------------------149
@@@@’}”g‘ๅŠw”—•จŽฟ‰ศŠwŒค‹†‰ศ@@@ฮˆไ “ึ@(Ishii,Atsushi)
@
12. On the $SO(N)$ and $Sp(N)$ free energy of a closed oriented 3-manifold (Quantum groups and quantum topology)-------------------159
@@@@‹ใB‘ๅŠw”—ŠwŒค‹†‰@@@@‚“c •qŒb@(Takata,Toshie)
@