"루트 시스템 (root system)과 딘킨 다이어그램 (Dynkin diagram)"의 두 판 사이의 차이

이 항목의 스프링노트 원문주소==

• 루트 시스템 (root system)과 딘킨 다이어그램 (Dynkin diagram)
  

   

개요==

• 루트 시스템은 유한차원 유클리드 벡터공간에서 여러가지 조건들을 만족시키는 벡터들의 모임이다
  
  • non-zero eigenvalues of Cartan subalgebra
    
• 리군과 리대수의 분류, 격자의 분류, 유한반사군과 콕세터군(finite reflection groups and Coxeter groups) 등에서 중요하게 활용
  
• 딘킨 다이어그램은 루트 시스템을 표현하는 그래프이다
  

     

정의==

• E를 내적이 주어진 유클리드 벡터공간이라 하자.
• 다음 조건을 만족시키는 E의 유한인 부분집합 \(\Phi\)를 루트 시스템이라 한다.
  
  •  \(\Phi\)는 E를 스팬(span)하며 \(0 \not \in \Phi\)
  • (reduced) \(\alpha \in \Phi\), \(\lambda \alpha \in \Phi \iff \lambda=\pm 1\)
  • \(\alpha,\beta \in \Phi\)이면   \(\sigma_\alpha(\beta) =\beta-2\frac{(\beta,\alpha)}{(\alpha,\alpha)}\alpha \in \Phi\)
  • \(\langle \beta, \alpha \rangle = 2 \frac{(\beta,\alpha)}{(\alpha,\alpha)} \in \mathbb{Z}\)
• 마지막 조건을 crystallographic 또는 integraliy 조건이라 한다
• a subgroup of \(GL(V)\) is crystallographic if it stabilizes a lattice L in V
  
• e.g. the Weyl group of a Lie algebra stabilizes the root lattice or the weight lattice

   

딘킨 다이어그램 (Dynkin diagram)==

• first draw the simple roots as nodes
• draw \(4(e_i, e_j)^2\)lines for two roots \(e_i, e_j\)
  \(\frac{\pi}{2}\) , \(\frac{\pi}{3}\), \(\frac{\pi}{4}\), \(\frac{\pi}{6}\)
  0,1,2,3 lines
  

     

2차원 루트 시스템의 분류==

• \(A_1\times A_1\), \(A_2\), \(B_2\), \(G_2\)
  

A1 x A1 http://www.wolframalpha.com/input/?i=r%3D1%2Bcos+(4theta) A2 http://www.wolframalpha.com/input/?i=r%3D1%2B+cos+(6theta) B2 http://www.wolframalpha.com/input/?i=r%3D1-+(sqrt2+%2B1)^2+cos+(4theta) G2 http://www.wolframalpha.com/input/?i=r%3D1-(sqrt+3+%2B1)^2cos+(6theta)/2 [1] [/pages/2696052/attachments/2088323 MSP45719773453e5409bcd000043c1iebh17cda58g.gif] [/pages/2696052/attachments/2088321 MSP402197733f5dbe80g5d000056hb767e4digb412.gif] [/pages/2696052/attachments/2088319 MSP132719772cfcfe659i75000064ieda8fh9d30h5e.gif] [/pages/2696052/attachments/2088317 MSP98119772g2ig5gid8he000031i1h30a8gacdi00.gif]      

ADE 의 분류== (0) G cannot contain affine A_n, D_n, E_n (1) G is a tree (contains no cycles = affine A_n) (2) G has \leq 1 branch point (does not contain affine D_5, D_6,D_7, ) (3)  branch point has order \leq 3 (affine D_4)
What are length of legs of G? Leg of length 0 -> G=A_n so assume legs have length \geq 1 (4) Not all legs have length \geq 2 : cannot contain affine E_6 so one leg has length 1 2 legs of length 1 : G  is D_n so can assume 2 other legs have length \geq 2 (5) cannot have 2 legs length \geq 3 because of affine E_7 So G has 1 leg length 1, 1 of length 2, one of length \geq 2 length is \leq 4, as G does not contain affine E_8 So G is E6,E7, E8       일반적인 경우

• how to classify all connected admissible diagrams
  
  • subdiagram is also admissible
  • there are at most (n-1) pairs of nodes
  • no node has more than 3 lines
  • study double lines and triple nodes

     

reflection groups==

• B_n, C_n, BC_n -> same reflection group (Z/nZ).S_n
  
•  
  

     

역사==  

• http://www.google.com/search?hl=en&tbs=tl:1&q=
• 수학사연표
•  

   

메모==

• \(\bullet - \bullet\)
  
• http://demonstrations.wolfram.com/2DRootSystems/
• reflection groups
• lie algebras
• Lie groups
• algebraic groups
• surfaces singularities
• quiver
• Platonic Solids

   

관련된 항목들==    

수학용어번역==

• 단어사전 http://www.google.com/dictionary?langpair=en%7Cko&q=
• 발음사전 http://www.forvo.com/search/
• 대한수학회 수학 학술 용어집
  
  • http://mathnet.kaist.ac.kr/mathnet/math_list.php?mode=list&ftype=eng_term&fstr=
• 남·북한수학용어비교
• 대한수학회 수학용어한글화 게시판

   

사전 형태의 자료==

• http://ko.wikipedia.org/wiki/리대수

• http://en.wikipedia.org/wiki/root_systems
• http://en.wikipedia.org/wiki/Dynkin_diagram
• http://en.wikipedia.org/wiki/Coxeter_number

   

관련논문==

• Two Amusing Dynkin Diagram Graph Classifications Robert A. Proctor, The American Mathematical Monthly, Vol. 100, No. 10 (Dec., 1993), pp. 937-941
• http://www.jstor.org/action/doBasicSearch?Query=
• http://www.ams.org/mathscinet
• http://dx.doi.org/