Quasitriangular structure and twisting of the 2+1 bicrossproduct model

Abstract

We show that the bicrossproduct model C[SU2*]\!\! U(su2) quantum Poincare group in 2+1 dimensions acting on the quantum spacetime [xi,t]=λ xi is related by a Drinfeld and module-algebra twist to the quantum double U(su2) C[SU2] acting on the quantum spacetime [xμ,x]=λεμx. We obtain this twist by taking a scaling limit as q 1 of the q-deformed version of the above where it corresponds to a previous theory of q-deformed Wick rotation from q-Euclidean to q-Minkowski space. We also recover the twist result at the Lie bialgebra level.