Moyal's Characteristic Function, the Density Matrix and von Neumann's Idempotent

Abstract

In the Wigner-Moyal approach to quantum mechanics, we show that Moyal's starting point, the characteristic function M(τ,θ)=∫ *(x)ei(τ p+θ x)(x)dx, is essentially the primitive idempotent used by von Neumann in his classic paper "Die Eindeutigkeit der Schr\"odingerschen Operatoren". This paper provides the original proof of the Stone-von Neumann equation. Thus the mathematical structure Moyal develops is simply a re-expression of what is at the heart of quantum mechanics and reproduces exactly the results of the quantum formalism. The "distribution function" F(X,P,t) is simply the quantum mechanical density matrix expressed in an ( X,P)-representation, where X and P are the mean co-ordinates of a cell structure in phase space. The whole approach therefore clearly has little to do with classical statistical theories but is a consequence of a non-commutative nature of the theory.