Spin one and the Bargmann-Wigner equations

We prove the stability of the Wigner equation f x f y s x y with its < <² Ž .< Ž .:< <² < :< < Ž . approximate solutions defined by the inequality f x f y y x y F x, y which holds on a restricted domain and for a given, suitable function .

We associate with an arbitrary system its Poincare observables. In supposing that its interaction is governed by a Hamiltonian formalism and in imposing Lorentz invariance, we show that the evolution is described by two equations which have the form of the Lorentz equation and the Thomas-Bargmann-Mi

## Abstract A Brillouin‐Wigner perturbation expansion is derived for the generalized eigenvalue equation (__F__~0~ + __F__~1~)Ψ = μ__A__Ψ. The theory is applied through second order to calculate the ground‐state energies of the helium atom and the hydrogen molecular ion. The results are compared wi