Remarks on the connection between the additive separation of the Hamilton-Jacobi equation and the multiplicative separation of the Schrodinger equation. I. The completeness and Robertson conditions

The fundamental elements of the variable separation theory are revisited, including the Eisenhart and Robertson theorems, Kalnins-Miller theory, and the intrinsic characterization of the separation of the Hamilton-Jacobi equation, in a unitary and geometrical perspective. The general notion of complete integrability of first-order normal systems of PDEs leads in a natural way to completeness conditions for separated solutions of the Schrodinger equation and to the Robertson condition. Two general types of multiplicative separation for the Schrodinger equation are defined and analyzed: they are called "free" and "reduced" separation, respectively. In the free separation the coordinates are necessarily orthogonal, while the reduced separation may occur in nonorthogonal coordinates, but only in the presence of symmetries (Killing vectors). (C) 2002 American Institute of Physics.