On Factorization of Molecular Wavefunctions
Abstract
Recently there has been a renewed interest in the chemical physics literature of factorization of the position representation eigenfunctions \{\} of the molecular Schr\"odinger equation as originally proposed by Hunter in the 1970s. The idea is to represent in the form where is \textit{purely} a function of the nuclear coordinates, while must depend on both electron and nuclear position variables in the problem. This is a generalization of the approximate factorization originally proposed by Born and Oppenheimer, the hope being that an `exact' representation of can be achieved in this form with and interpretable as `electronic' and `nuclear' wavefunctions respectively. We offer a mathematical analysis of these proposals that identifies ambiguities stemming mainly from the singularities in the Coulomb potential energy.
Cite
@article{arxiv.1506.00103,
title = {On Factorization of Molecular Wavefunctions},
author = {Thierry Jecko and Brian T. Sutcliffe and R. Guy Woolley},
journal= {arXiv preprint arXiv:1506.00103},
year = {2015}
}
Comments
Manuscript submitted to Journal of Physics A: Mathematical and Theoretical, May 2015. Accepted for Publication August 24 2015