Comments on noncommutative quantum mechanical systems associated with Lie algebras

Abstract

We consider quantum mechanics on the noncommutative spaces characterized by the commutation relations [xa, xb] \ =\ iθ fabc xc\,, where fabc are the structure constants of a Lie algebra. We note that this problem can be reformulated as an ordinary quantum problem in a commuting momentum space. The coordinates are then represented as linear differential operators xa = -i Da = -iEab (p)\, ∂ /∂ pb . Generically, the matrix Eab(p) represents a certain infinite series over the deformation parameter θ: Eab = δab + …. The deformed Hamiltonian, H = - 12 Da2\,, describes the motion along the corresponding group manifolds with the characteristic size of order θ-1. Their metrics are also expressed into certain infinite series in θ, with Eab having the meaning of vielbeins. For the algebras su(2) and u(N), it has been possible to represent the operators xa in a simple finite form. A byproduct of our study are new nonstandard formulas for the metrics on all the spheres Sn, on the corresponding projective spaces RPn and on U(2).