Miguel Angel Alonso, George S. Pogosyan, Kurt Bernardo Wolf
Published 2002-05-08Version 1
We propose a Wigner quasiprobability distribution function for Hamiltonian systems in spaces of constant curvature --in this paper on hyperboloids--, which returns the correct marginals and has the covariance of the Shapiro functions under SO(D,1) transformations. To the free systems obeying the Laplace-Beltrami equation on the hyperboloid, we add a conic-oscillator potential in the hyperbolic coordinate. As an example, we analyze the 1-dimensional case on a hyperbola branch, where this conic-oscillator is the Poschl-Teller potential. We present the analytical solutions and plot the computed results. The standard theory of quantum oscillators is regained in the contraction limit to the space of zero curvature.
Comments: 25 pages (included one figure), Latex file
On the family of Wigner functions for N-level quantum system
Toolbox for non-classical state calculations
The anisotropic oscillator on curved spaces: A new exactly solvable model
