Quantum mechanics as the limit of a symmetric local theory

In this paper a formulation of classical mechanics is given with the help of linear operators in HILBERT space, which is different from the formalism of v. NEUMANN and KOOPMAN, i.e. the observables are represented by selfadjoint operators instead of real functions. It is shown that classical mechani

The Thomas-Fermi theory for electrons and fixed nuclei in a homogeneous magnetic field is shown to be a limit of quantum mechanics in the following sense: If the nuclear charges and the number of eletrons are multiplied by a, and the magnetic field by a 4/3, then the ground-state energy, divided by

The semi-classical superspace pseudomechanics of Casalbuoni and others is shown to be the classical limit of a scalar superfield theory by a WKB type of approximation. By avoiding second class constraints, the relationship between the mechanics and the field theory is clarified. The spin 89 sector i

The pure state space of Quantum Mechanics is investigated as Hermitian Symmetric Kähler manifold. The classical principles of quantum mechanics (Quantum Superposition Principle, Heisenberg Uncertainty Principle, Quantum Probability Principle) and Spectral Theory of observables are discussed in this