Yang–Baxter operator

In the category of left modules over a commutative ring ${\displaystyle k}$ , Yang–Baxter operators are ${\displaystyle k}$ -linear mappings ${\displaystyle R:V\otimes _{k}V\rightarrow V\otimes _{k}V}$ . The operator ${\displaystyle R}$  satisfies the quantum Yang-Baxter equation if

${\displaystyle R_{12}R_{13}R_{23}=R_{23}R_{13}R_{12}}$ 

where

${\displaystyle R_{12}=R\otimes _{k}1}$ ,
${\displaystyle R_{23}=1\otimes _{k}R}$ ,
${\displaystyle R_{13}=(1\otimes _{k}\tau _{V,V})(R\otimes _{k}1)(1\otimes _{k}\tau _{V,V})}$ 

The ${\displaystyle \tau _{U,V}}$  represents the "twist" mapping defined for ${\displaystyle k}$ -modules ${\displaystyle U}$  and ${\displaystyle V}$  by ${\displaystyle \tau _{U,V}(u\otimes v)=v\otimes u}$  for all ${\displaystyle u\in U}$  and ${\displaystyle v\in V}$ .

An important relationship exists between the quantum Yang-Baxter equation and the braid equation. If ${\displaystyle R}$  satisfies the quantum Yang-Baxter equation, then ${\displaystyle B=\tau _{V,V}R}$  satisfies ${\displaystyle B_{12}B_{23}B_{12}=B_{23}B_{12}B_{23}}$ .^[4]

Yang–Baxter operators have applications in statistical mechanics and topology.^[5][6][7]

• Yang–Baxter equation
• Hopf algebra
• Lie bialgebra
• Yangian
• Braid theory
• Quantum groups