Approximate solutions of the Liouville equation. III. Variational principles and projection operators

## Abstract A temperature correction to the Thomas–Fermi (TF) model of a neutral compressed atom has been given by Marshak and Bethe. The aim of the present work is to point out that, by formulating a variational principle, one may obtain approximate analytical solutions of the temperature‐perturbe

## Abstract A general variational principle for transition and density matrices is proposed. The principle is closely related to Rowe's variational treatment of the equations‐of‐motion method. It permits the simultaneous construction of coupled approximations for two eigenstates, and it is a straig

## Abstract In the present work the total energy of a Ne atom at __T__ = 0 K is calculated as a function of a spherical container radius. The calculation is based on the Thomas–Fermi (TF) equation, which is solved approximately by an equivalent variational principle. The effect of an approximate ex

We consider the operator equation SX -~)~t i U, XV, = Y where { U, }. { t~ } are some commutative sets of operators but in general { U, } need not commute with { 1,)}. Particular cases of this equation are the Syivester and Ljaptmov equations. We give a new representation and an approximation of the