Quasi-exactly solvable potentials in Wigner-Dunkl quantum mechanics

Abstract

It is shown that the Dunkl harmonic oscillator on the line can be generalized to a quasi-exactly solvable one, which is an anharmonic oscillator with n+1 known eigenstates for any n∈ . It is also proved that the Hamiltonian of the latter can also be rewritten in a simpler way in terms of an extended Dunkl derivative. Furthermore, the Dunkl isotropic oscillator and Dunkl Coulomb potentials in the plane are generalized to quasi-exactly solvable ones. In the former case, potentials with n+1 known eigenstates are obtained, whereas, in the latter, sets of n+1 potentials associated with a given energy are derived.