"R-matrix"의 두 판 사이의 차이

2009년 12월 29일 (화) 16:18 판

R-matrix has entries from Boltzman weights.
From quantum group point of view, R-matrix naturally appears as intertwiners of tensor product of two evaluation modules

For \(R\) matrix on \(V \otimes V\), define \(\bar R=p\circ R\) where \(p\) is the permutation map.

\(\bar R_i=1\otimes \cdots \otimes\bar R \cdots \otimes 1\), \(\bar R_i\) sitting in i and i+1 th slot.

Then YB reduces to

\(\bar R_i\bar R_j =\bar R_j\bar R_i\) whenever \(|i-j| \geq 2 \)

\(\bar R_i\bar R_{i+1}\bar R_i= \bar R_{i+1}\bar R_i \bar R_{i+1}\)

which are the Braid group relations.

2009년 12월 29일 (화) 16:04 판 (원본 보기) http://bomber0.myid.net/ (토론) ← 이전 편집		2009년 12월 29일 (화) 16:18 판 (원본 보기) http://bomber0.myid.net/ (토론) 다음 편집 →
2번째 줄:		2번째 줄:

	* R-matrix has entries from Boltzman weights.		* R-matrix has entries from Boltzman weights.
−	* R-matrix naturally appears as intertwiners of tensor product of two evaluation modules	+	* From quantum group point of view, R-matrix naturally appears as intertwiners of tensor product of two evaluation modules
−
−