posted on 2024-06-11, 00:13authored byPéter Hollósy, Péter Jeszenszki, Edit Mátyus
This work is concerned with two-spin-1/2-fermion relativistic
quantum
mechanics, and it is about the construction of one-particle projectors
using an inherently two-particle, “explicitly correlated”
basis representation necessary for good numerical convergence of the
interaction energy. It is demonstrated that a faithful representation
of the one-particle operators, which appear in intermediate but essential
computational steps, can be constructed over a many-particle basis
set by accounting for the full Hilbert space beyond the physically
relevant antisymmetric subspace. Applications of this development
can be foreseen for the computation of quantum-electrodynamics corrections
for a correlated relativistic reference state and high-precision relativistic
computations of medium-to-high-Z helium-like systems,
for which other two-particle projection techniques are unreliable.