The H2+ molecular ion: low-lying states

Abstract

Matching for a wavefunction the WKB expansion at large distances and Taylor expansion at small distances leads to a compact, few-parametric uniform approximation found in J. Phys. B44, 101002 (2011). The ten low-lying eigenstates of H2+ of the quantum numbers (n,m,,)\, with n=m=0 at =0,1,2, with n=1, m=0 and n=0, m=1 at =0 of both parities are explored for all interproton distances R. For all these states this approximation provides the relative accuracy 10-5 (not less than 5 s.d.) locally, for any real coordinate x in eigenfunctions, when for total energy E(R) it gives 10-11 s.d. for R ∈ [0,50]~a.u. Corrections to the approximation are evaluated in the specially-designed, convergent perturbation theory. Separation constants are found with not less than 8 s.d. The oscillator strength for the electric dipole transitions E1 is calculated with not less than 6~s.d. A dramatic dip in the E1 oscillator strength f1sg-3pu at R Req is observed. The magnetic dipole and electric quadrupole transitions are calculated for the first time with not less than 6~s.d. in oscillator strength. For two lowest states (0,0,0,) (or, equivalently, 1sg and 2pu states) the potential curves are checked and confirmed in the Lagrange mesh method within 12~s.d. Based on them the Energy Gap between 1sg and 2pu potential curves is approximated with modified Pade R e-R [Pade(8/7)](R) with not less than 4-5 figures at R ∈ [0, 40]\,a.u. Sum of potential curves E1sg + E2pu is approximated by Pade 1/R [Pade(5/8)](R) in R ∈ [0, 40]\,a.u. with not less than 3-4 figures.