Quantum deformations of D=4 Euclidean, Lorentz, Kleinian and quaternionic o(4) symmetries in unified o(4;C) setting -- Addendum

Abstract

In our previous paper we obtained a full classification of nonequivalent quasitriangular quantum deformations for the complex D=4 Euclidean Lie symmetry o(4;C). The result was presented in the form of a list consisting of three three-parameter, one two-parameter and one one-parameter nonisomorphic classical r-matrices which provide 'directions' of the nonequivalent quantizations of o(4;C). Applying reality conditions to the complex o(4;C) r-matrices we obtained the nonisomorphic classical r-matrices for all possible real forms of o(4;C): Euclidean o(4), Lorentz o(3,1), Kleinian o(2,2) and quaternionic o(4) Lie algebras. In the case of o(4) and o(3,1) real symmetries these r-matrices give the full classifications of the inequivalent quasitriangular quantum deformations, however for o(2,2) and o(4) the classifications are not full. In this paper we complete these classifications by adding three new three-parameter o(2,2)-real r-matrices and one new three-parameter o(4)-real r-matrix. All nonisomorphic classical r-matrices for all real forms of o(4;C) are presented in the explicite form what is convenient for providing the quantizations. We will mention also some applications of our results to the deformations of space-time symmetries and string σ-models.