Quantizations of D=3 Lorentz symmetry

Abstract

Using the isomorphism o(3;C)sl(2;C) we develop a new simple algebraic technique for complete classification of quantum deformations (the classical r-matrices) for real forms o(3) and o(2,1) of the complex Lie algebra o(3;C) in terms of real forms of sl(2;C): su(2), su(1,1) and sl(2;R). We prove that the D=3 Lorentz symmetry o(2,1)su(1,1)sl(2;R) has three different Hopf-algebraic quantum deformations which are expressed in the simplest way by two standard su(1,1) and sl(2;R) q-analogs and by simple Jordanian sl(2;R) twist deformations. These quantizations are presented in terms of the quantum Cartan-Weyl generators for the quantized algebras su(1,1) and sl(2;R) as well as in terms of quantum Cartesian generators for the quantized algebra o(2,1). Finaly, some applications of the deformed D=3 Lorentz symmetry are mentioned.