Basic quantizations of D=4 Euclidean, Lorentz, Kleinian and quaternionic o(4) symmetries

Abstract

We construct firstly the complete list of five quantum deformations of D=4 complex homogeneous orthogonal Lie algebra o(4;C) o(3;C) o(3;C), describing quantum rotational symmetry of four-dimensional complex space-time, in particular we provide the corresponding universal quantum R-matrices. Further applying four possible reality conditions we obtain all sixteen Hopf-algebraic quantum deformations for the real forms of o(4;C): Euclidean o(4), Lorentz o(3,1), Kleinian o(2,2) and quaternionic o(4). For o(3,1) we only recall well-known results obtained previously by the authors, but for other real Lie algebras (Euclidean, Kleinian, quaternionic) as well as for the complex Lie algebra o(4;C) we present new results.