Families of quasi-exactly solvable extensions of the quantum oscillator in curved spaces

Abstract

We introduce two new families of quasi-exactly solvable (QES) extensions of the oscillator in a d-dimensional constant-curvature space. For the first three members of each family, we obtain closed-form expressions of the energies and wavefunctions for some allowed values of the potential parameters using the Bethe ansatz method. We prove that the first member of each family has a hidden sl(2,R) symmetry and is connected with a QES equation of the first or second type, respectively. One-dimensional results are also derived from the d-dimensional ones with d 2, thereby getting QES extensions of the Mathews-Lakshmanan nonlinear oscillator.