K-Poincaré group

Template:Unreferenced Template:Use dmy dates In physics and mathematics, the κ-Poincaré group, named after Henri Poincaré, is a quantum group, obtained by deformation of the Poincaré group into a Hopf algebra. It is generated by the elements ${\displaystyle a^{\mu }}$ and ${\displaystyle {{\mathrm{\Lambda }}^{\mu }}_{\nu }}$ with the usual constraint:

${\displaystyle {\eta }^{\rho \sigma }{{\mathrm{\Lambda }}^{\mu }}_{\rho }{{\mathrm{\Lambda }}^{\nu }}_{\sigma }={\eta }^{\mu \nu },}$

where ${\displaystyle {\eta }^{\mu \nu }}$ is the Minkowskian metric:

${\displaystyle {\eta }^{\mu \nu }=\left(\begin{array}{cccc}-1& 0& 0& 0\\ 0& 1& 0& 0\\ 0& 0& 1& 0\\ 0& 0& 0& 1\end{array}\right).}$

The commutation rules reads:

• ${\displaystyle [a_j,a_0]=i\lambda a_j,[a_j,a_k]=0}$
• ${\displaystyle [a^{\mu },{{\mathrm{\Lambda }}^{\rho }}_{\sigma }]=i\lambda \{({{\mathrm{\Lambda }}^{\rho }}_0-{{\delta }^{\rho }}_0){{\mathrm{\Lambda }}^{\mu }}_{\sigma }-({{\mathrm{\Lambda }}^{\alpha }}_{\sigma }{\eta }_{\alpha 0}+{\eta }_{\sigma 0}){\eta }^{\rho \mu }\}}$

In the (1 + 1)-dimensional case the commutation rules between ${\displaystyle a^{\mu }}$ and ${\displaystyle {{\mathrm{\Lambda }}^{\mu }}_{\nu }}$ are particularly simple. The Lorentz generator in this case is:

${\displaystyle {{\mathrm{\Lambda }}^{\mu }}_{\nu }=\left(\begin{array}{cc}\cosh \tau & \sinh \tau \\ \sinh \tau & \cosh \tau \end{array}\right)}$

and the commutation rules reads:

• ${\displaystyle [a_0,\left(\begin{array}{c}\cosh \tau \\ \sinh \tau \end{array}\right)]=i\lambda \sinh \tau \left(\begin{array}{c}\sinh \tau \\ \cosh \tau \end{array}\right)}$
• ${\displaystyle [a_1,\left(\begin{array}{c}\cosh \tau \\ \sinh \tau \end{array}\right)]=i\lambda (1-\cosh \tau )\left(\begin{array}{c}\sinh \tau \\ \cosh \tau \end{array}\right)}$

The coproducts are classical, and encode the group composition law:

• ${\displaystyle \mathrm{\Delta }{a}^{\mu }={{\mathrm{\Lambda }}^{\mu }}_{\nu }\otimes a^{\nu }+a^{\mu }\otimes 1}$
• ${\displaystyle \mathrm{\Delta }{{\mathrm{\Lambda }}^{\mu }}_{\nu }={{\mathrm{\Lambda }}^{\mu }}_{\rho }\otimes {{\mathrm{\Lambda }}^{\rho }}_{\nu }}$

Also the antipodes and the counits are classical, and represent the group inversion law and the map to the identity:

• ${\displaystyle S(a^{\mu })=-{({\mathrm{\Lambda }}^{-1}{)}^{\mu }}_{\nu }{a}^{\nu }}$
• ${\displaystyle S({{\mathrm{\Lambda }}^{\mu }}_{\nu })={({\mathrm{\Lambda }}^{-1}{)}^{\mu }}_{\nu }={{\mathrm{\Lambda }}_{\nu }}^{\mu }}$
• ${\displaystyle \epsilon (a^{\mu })=0}$
• ${\displaystyle \epsilon ({{\mathrm{\Lambda }}^{\mu }}_{\nu })={{\delta }^{\mu }}_{\nu }}$

The κ-Poincaré group is the dual Hopf algebra to the K-Poincaré algebra, and can be interpreted as its “finite” version.

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