Abstract
Ermakov systems are pairs of coupled, time-dependent, nonlinear dynamical equations possessing a joint constant of the motion called an Ermakov invariant. The invariant provides a link between the two equations and leads to a superposition law between solutions to the Ermakov pair. Extensive studies of Ermakov systems in classical mechanics have been carried out. Here we present a detailed study of Ermakov systems from a quantum point of view, and prove that the solution to the Schrödinger equation for a general Ermakov system can be reduced to the solution of a time-independent Schrödinger equation involving the Ermakov invariant. We thereby arrive at a quantum-mechanical superposition law analogous to the classical superposition law.
- Received 3 August 1981
DOI:https://doi.org/10.1103/PhysRevA.24.2873
©1981 American Physical Society