"Kashaev's volume conjecture"의 두 판 사이의 차이

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(section 'articles' updated)
 
(사용자 2명의 중간 판 3개는 보이지 않습니다)
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* The hyperbolic volume of a knot complement can be calculated using the Jones polynimials of the ca
 
* The hyperbolic volume of a knot complement can be calculated using the Jones polynimials of the ca
* $SU(2)$ connections on $S^3-K$ should be sensitive to the flat $SL_2(C)$ connection defining its hyperbolic structure
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* <math>SU(2)</math> connections on <math>S^3-K</math> should be sensitive to the flat <math>SL_2(C)</math> connection defining its hyperbolic structure
 
* hyperbolic volume is closely related to the Cherm-Simons invariant
 
* hyperbolic volume is closely related to the Cherm-Simons invariant
 
* volume conjecture has its complexified version
 
* volume conjecture has its complexified version
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==examples==
 
==examples==
* $4_1$ figure eight knot
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* <math>4_1</math> figure eight knot
* $5_2$
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* <math>5_2</math>
* $6_1$
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* <math>6_1</math>
  
  
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==history==
 
==history==
* 1995 Kashaev constructed knot invariants $\langle K \rangle_N$
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* 1995 Kashaev constructed knot invariants <math>\langle K \rangle_N</math>
 
* 1997 Kashaev proposed that the asymptotic behaviour of the 1995 invariant involves the volume of the hyperbolic 3-manifold
 
* 1997 Kashaev proposed that the asymptotic behaviour of the 1995 invariant involves the volume of the hyperbolic 3-manifold
* 2001 '''[MM01]''' Murakami-Murakami found that $\langle K \rangle_N$ can be obtained from evaluating the colored Jones polynomial at the $N$-th root of unity
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* 2001 '''[MM01]''' Murakami-Murakami found that <math>\langle K \rangle_N</math> can be obtained from evaluating the colored Jones polynomial at the <math>N</math>-th root of unity
  
 
==related items==
 
==related items==
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==expositions==
 
==expositions==
* Hikami, Kazuhiro. 2003. “Volume Conjecture and Asymptotic Expansion of $q$-Series.” Experimental Mathematics 12 (3): 319–337. http://projecteuclid.org/euclid.em/1087329235
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* Hikami, Kazuhiro. 2003. “Volume Conjecture and Asymptotic Expansion of <math>q</math>-Series.” Experimental Mathematics 12 (3): 319–337. http://projecteuclid.org/euclid.em/1087329235
 
* [http://www.youtube.com/watch?v=KszBLLJKccQ Introduction to the Volume Conjecture, Part I], by Hitoshi Murakami  
 
* [http://www.youtube.com/watch?v=KszBLLJKccQ Introduction to the Volume Conjecture, Part I], by Hitoshi Murakami  
 
** video
 
** video
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==articles==
 
==articles==
 
* Alexander Kolpakov, Jun Murakami, Combinatorial decompositions, Kirillov-Reshetikhin invariants and the Volume Conjecture for hyperbolic polyhedra, http://arxiv.org/abs/1603.02380v1
 
* Alexander Kolpakov, Jun Murakami, Combinatorial decompositions, Kirillov-Reshetikhin invariants and the Volume Conjecture for hyperbolic polyhedra, http://arxiv.org/abs/1603.02380v1
* Chen, Qingtao, Kefeng Liu, and Shengmao Zhu. “Volume Conjecture for $SU(n)$-Invariants.” arXiv:1511.00658 [hep-Th, Physics:math-Ph], November 2, 2015. http://arxiv.org/abs/1511.00658.
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* Chen, Qingtao, Kefeng Liu, and Shengmao Zhu. “Volume Conjecture for <math>SU(n)</math>-Invariants.” arXiv:1511.00658 [hep-Th, Physics:math-Ph], November 2, 2015. http://arxiv.org/abs/1511.00658.
 
* Fernandez-Lopez, Manuel, and Eduardo Garcia-Rio. “On Gradient Ricci Solitons with Constant Scalar Curvature.” arXiv:1409.3359 [math], September 11, 2014. http://arxiv.org/abs/1409.3359.
 
* Fernandez-Lopez, Manuel, and Eduardo Garcia-Rio. “On Gradient Ricci Solitons with Constant Scalar Curvature.” arXiv:1409.3359 [math], September 11, 2014. http://arxiv.org/abs/1409.3359.
 
* Murakami, Jun. 2014. “From Colored Jones Invariants to Logarithmic Invariants.” arXiv:1406.1287 [math], June. http://arxiv.org/abs/1406.1287.
 
* Murakami, Jun. 2014. “From Colored Jones Invariants to Logarithmic Invariants.” arXiv:1406.1287 [math], June. http://arxiv.org/abs/1406.1287.
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[[분류:TQFT]]
 
[[분류:TQFT]]
 
[[분류:Knot theory]]
 
[[분류:Knot theory]]
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[[분류:migrate]]
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==메타데이터==
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===위키데이터===
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* ID :  [https://www.wikidata.org/wiki/Q7940887 Q7940887]
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===Spacy 패턴 목록===
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* [{'LOWER': 'volume'}, {'LEMMA': 'conjecture'}]

2021년 2월 17일 (수) 03:04 기준 최신판

introduction

  • The hyperbolic volume of a knot complement can be calculated using the Jones polynimials of the ca
  • \(SU(2)\) connections on \(S^3-K\) should be sensitive to the flat \(SL_2(C)\) connection defining its hyperbolic structure
  • hyperbolic volume is closely related to the Cherm-Simons invariant
  • volume conjecture has its complexified version


Kashaev invariant

  • invariant of a link using the R-matrix
  • calculate the limit of the Kashaev invariant
  • related with the colored Jones polynomial

optimistic limit

  • volume conjecture
  • idea of the optimistic limit


examples

  • \(4_1\) figure eight knot
  • \(5_2\)
  • \(6_1\)


known examples

  • figure eight knot
  • Borromean ring
  • torus knots
  • whitehead chains
  • all links of zero volume
  • twist knows is (almost) done


history

  • 1995 Kashaev constructed knot invariants \(\langle K \rangle_N\)
  • 1997 Kashaev proposed that the asymptotic behaviour of the 1995 invariant involves the volume of the hyperbolic 3-manifold
  • 2001 [MM01] Murakami-Murakami found that \(\langle K \rangle_N\) can be obtained from evaluating the colored Jones polynomial at the \(N\)-th root of unity

related items


computational resource


encyclopedia


expositions


articles

links

메타데이터

위키데이터

Spacy 패턴 목록

  • [{'LOWER': 'volume'}, {'LEMMA': 'conjecture'}]
원본 주소 "https://wiki.mathnt.net/index.php?title=Kashaev%27s_volume_conjecture&oldid=51900"