RIMS Kôkyûroku
No.2099
Intelligence of Low-dimensional Topology
RIMS ‹€“―Œ€‹†iŒφŠJŒ^j
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2018/05/30`2018/06/01
‘ε’΁@’m’‰
Tomotada Ohtsuki
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–ځ@ŽŸ
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1. Minimal coloring numbers of $\mathbb{Z}$-colorable links (Intelligence of Low-dimensional Topology)-------------------------------1
@@@@“ϊ–{‘εŠw•Ά—Šw•””Šw‰Θ / “ϊ–{‘εŠw‘εŠw‰@‘‡Šξ‘b‰ΘŠwŒ€‹†‰Θ@@@ŽsŒ΄ ˆκ—T / Ό“y Œb—@(Ichihara,Kazuhiro / Matsudo,Eri)
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2. A generalization of the Dijkgraaf-Witten invariant (Intelligence of Low-dimensional Topology)------------------------------------13
@@@@‘ˆξ“c‘εŠwŠξŠ²—HŠwŒ€‹†‰Θ@@@–Ψ‘Ί ’Ό‹L@(Kimura,Naoki)
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3. On twists and surgeries generating exotic smooth structures (Intelligence of Low-dimensional Topology)---------------------------30
@@@@‘εγ‘εŠw‘εŠw‰@ξ•ρ‰ΘŠwŒ€‹†‰Θξ•ρŠξ‘b”ŠwκU@@@ˆΐˆδ Oˆκ@(Yasui,Kouichi)
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4. Cluster Dehn twists in cluster modular groups (Intelligence of Low-dimensional Topology)-----------------------------------------36
@@@@“Œ‹ž‘εŠw‘εŠw‰@”—‰ΘŠwŒ€‹†‰Θ@@@Ξ‹΄ “T@(Ishibashi,Tsukasa)
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5. SIMPLIFIED BROKEN LEFSCHETZ FIBRATIONS AND TRISECTIONS OF SMOOTH 4-MANIFOLDS (Intelligence of Low-dimensional Topology)----------42
@@@@‹γB‘εŠwƒ}ƒXEƒtƒHƒAEƒCƒ“ƒ_ƒXƒgƒŠŒ€‹†Š@@@²”Œ C@(Saeki,Osamu)
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6. Turaev surfaces and invariants of knots and links (Intelligence of Low-dimensional Topology)-------------------------------------60
@@@@Department of Mathematics, Louisiana State University@@@Dasbach,Oliver
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7. An alternative proof of the existence of totally real embeddings of 3-manifolds into $\mathbb{C}^{3}$ (Intelligence of Low-dimensional Topology)---68
@@@@‹ž“sŽY‹Ζ‘εŠw—Šw•””—‰ΘŠw‰Θ@@@””’J ’Ό•F@(Kasuya,Naohiko)
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8. An obstruction to trivializing links by $n$-moves (Intelligence of Low-dimensional Topology) ------------------------------------73
@@@@’Γ“cm‘εŠw”ŠwEŒvŽZ‹@‰ΘŠwŒ€‹†Š / ‘ˆξ“c‘εŠw‹³ˆηE‘‡‰ΘŠwŠwp‰@ / ‘ˆξ“c‘εŠw€ŠwŠwp‰@@@@‹{ΰV Ž‘Žq / ˜a“c NΪ / ˆΐŒ΄ W@(Miyazawa,Haruko Aida / Wada,Kodai / Yasuhara,Akira)
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9. Virtual embeddability between surface mapping class groups (Intelligence of Low-dimensional Topology)----------------------------80
@@@@L“‡‘εŠw‘εŠw‰@—ŠwŒ€‹†‰Θ”ŠwκU@@@•ΠŽR ‘ρ–ν@(Katayama,Takuya)
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10. A note on the paper "A knot with destabilized bridge spheres of arbitrarily high bridge number" (Intelligence of Low-dimensional Topology)---89
@@@@“ޗǏ—Žq‘εŠw—Šw•” / “ޗǏ—Žq‘εŠw—Šw•” / ‹ξΰV‘εŠw‘‡‹³ˆηŒ€‹†•” / ‹ž“s‘εŠw—ŠwŒ€‹†‰Θ@@@’£ ›N•P / ¬—Ρ ‹B / ¬‘ς ½ / ‚”φ ˜al@(Jang,Yeonhee / Kobayashi,Tsuyoshi / Ozawa,Makoto / Takao,Kazuto)
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11. Problems on Low-dimensional Topology, 2018 (Intelligence of Low-dimensional Topology)------------------------------------------105
@@@@‹ž“s‘εŠw@@@‘ε’Ξ ’m’‰@(Ohtsuki,T.[ed.])
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