Analytic structure of solutions to multiconfiguration equations

Abstract

We study the regularity at the positions of the (fixed) nuclei of solutions to (non-relativistic) multiconfiguration equations (including Hartree--Fock) of Coulomb systems. We prove the following: Let phi1,...,phiM be any solution to the rank--M multiconfiguration equations for a molecule with L fixed nuclei at R1,...,RL in R3. Then, for any j in 1,...,M and k in 1,...,L, there exists a neighbourhood Uj,k in R3 of Rk, and functions phi(1)j,k, phi(2)j,k, real analytic in Uj,k, such that phij(x) = phi(1)j,k(x) + |x - Rk| phi(2)j,k(x), x in Uj,k A similar result holds for the corresponding electron density. The proof uses the Kustaanheimo--Stiefel transformation, as applied earlier by the authors to the study of the eigenfunctions of the Schr"odinger operator of atoms and molecules near two-particle coalescence points.