Curvature-dependent formalism, Schr\"odinger equation and energy levels for the harmonic oscillator on three-dimensional spherical and hyperbolic spaces

Abstract

A nonlinear model representing the quantum harmonic oscillator on the three-dimensional spherical and hyperbolic spaces, S3 (>0) and Hk3 (<0), is studied. The curvature is considered as a parameter and then the radial Schr\"odinger equation becomes a -dependent Gauss hypergeometric equation that can be considered as a -deformation of the confluent hypergeometric equation that appears in the Euclidean case. The energy spectrum and the wavefunctions are exactly obtained in both the three-dimensional sphere S3 (>0) and the hyperbolic space Hk3 (<0). A comparative study between the spherical and the hyperbolic quantum results is presented.