Ultra-Compact accurate wave functions for He-like iso-electronic sequences and variational calculus. IV. Spin-singlet states (1s\,ns) n\,1 S family of the Helium sequence

Abstract

As a continuation of Parts I Part-1:2020, II Part-2:2021, III Part-3:2022, where ultra-compact wave functions were constructed for a few low-lying states of He-like and Li-like sequences, the family of spin-singlet (1s\,ns) type excited states n\,1 S of the He-like sequence is studied with an emphasis on the n=3,4,5: 3\,1 S, 4\,1 S, 5\,1 S states, for nuclear charges Z ≤ 20. Particular attention is given to finding of critical charges Z=ZB at which the ultra-compact wave functions lose their square-integrability. For each 1 S state an ultra-compact, seven-parametric trial function is constructed, which describes the domain of applicability of the non-relativistic Quantum Mechanics of Coulomb Charges (QMCC) for the total energies (4-5 significant digits (s.d.)) and reproduces 3 decimal digits (d.d.) of the spin-singlet states n\,1 S of He-like ions (in the static approximation with point-like, infinitely heavy nuclei) for n=1,2,3,… and any Z ≤ 20\,. All energies are well described by second degree polynomials in Z (the Majorana formula). Critical charges Z=ZB(n), where the ultra-compact trial function for the n1 S, n=1,2,3,… states loses its square-integrability, are estimated: for all studied states ZB(n) increases slowly with n; it seems they lie in the interval ZB(n1 S) 0.90 - 0.95, in particular, with ZB(1)=ZB(2)\,=\,0.904, ZB(3)=ZB(4)\,=\,0.928, ZB(5)\ =\ 0.939.