A squeeze-like operator approach to position-dependent mass in quantum mechanics
arXiv:1310.5737 · doi:10.1063/1.4890462
Abstract
We provide a squeeze-like transformation that allows one to remove a position dependent mass from the Hamiltonian. Methods to solve the Schrödinger equation may then be applied to find the respective eigenvalues and eigenfunctions. As an example, we consider a position-dependent-mass that leads to the integrable Morse potential and therefore to well-known solutions.