K-Poincaré algebra - meaning and definition. What is K-Poincaré algebra
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What (who) is K-Poincaré algebra - definition


K-Poincaré algebra         
DEFORMATION OF THE POINCARÉ ALGEBRA INTO A HOPF ALGEBRA
K-Poincare algebra
In physics and mathematics, the κ-Poincaré algebra, named after Henri Poincaré, is a deformation of the Poincaré algebra into a Hopf algebra. In the bicrossproduct basis, introduced by Majid-Ruegg its commutation rules reads:
Super-Poincaré algebra         
SUPERSYMMETRIC GENERALIZATION OF THE POINCARÉ ALGEBRA
Super-Poincare algebra; Super-Poincaré group; Super Poincare algebra; Super Poincaré algebra
In theoretical physics, a super-Poincaré algebra is an extension of the Poincaré algebra to incorporate supersymmetry, a relation between bosons and fermions. They are examples of supersymmetry algebras (without central charges or internal symmetries), and are Lie superalgebras.
K-Poincaré group         
QUANTUM GROUP OBTAINED BY DEFORMATION OF THE POINCARÉ GROUP INTO A HOPF ALGEBRA
Κ-Poincaré group; K-Poincare group
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.