Braid group

수학노트
imported>Pythagoras0님의 2014년 4월 3일 (목) 18:28 판
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review of symmetric groups

  • 원소의 개수가 n인 집합의 전단사함수들의 모임
  • \(n!\) 개의 원소가 존재함
  • 대칭군의 부분군은 치환군(permutation group)이라 불림



presentation of symmetric groups

  • \(S_n\)
  • generators \(\sigma_1, \ldots, \sigma_{n-1}\)
  • relations
    • \({\sigma_i}^2 = 1\)
    • \(\sigma_i\sigma_j = \sigma_j\sigma_i \mbox{ if } j \neq i\pm 1\)
    • \(\sigma_i\sigma_{i+1}\sigma_i = \sigma_{i+1}\sigma_i\sigma_{i+1}\)


presentation of braid groups

  • \(B_n\)
  • generators \(\sigma_1,...,\sigma_{n-1}\)
  • relations (known as the braid or Artin relations):
    • \(\sigma_i\sigma_j =\sigma_j \sigma_i\) whenever \(|i-j| \geq 2 \)
    • \(\sigma_i\sigma_{i+1}\sigma_i = \sigma_{i+1}\sigma_i \sigma_{i+1}\) for \(i = 1,..., n-2\)
  • Yang-Baxter equation (YBE)
  • For a solution of the YBE $\bar{R}$, we can construct a representation $\rho$ of the braid group by

$$ \rho : B_n \to \rm{Aut}(V^{\otimes n}) $$ where $\rho(\sigma_i)=\bar{R}_i$


Markov moves

  • braid group version of Reidemeister moves


computational resource



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