The Equivalence Postulate of Quantum Mechanics

TL;DR

This paper derives a new formulation of quantum mechanics from the Equivalence Principle, leading to a quantum Hamilton-Jacobi equation that explains tunneling and quantization without relying on the Copenhagen interpretation.

Contribution

It introduces a novel quantum Hamilton-Jacobi framework based on the Equivalence Principle, avoiding axiomatic wave-function assumptions and revealing underlying geometric structures.

Findings

Derives the quantum stationary HJ equation from the EP.

Explains tunneling as a consequence of a modified quantum potential.

Shows the L^2 condition follows from geometrical gluing conditions.

Abstract

The Equivalence Principle (EP), stating that all physical systems are connected by a coordinate transformation to the free one with vanishing energy, univocally leads to the Quantum Stationary HJ Equation (QSHJE). Trajectories depend on the Planck length through hidden variables which arise as initial conditions. The formulation has manifest p-q duality, a consequence of the involutive nature of the Legendre transform and of its recently observed relation with second-order linear differential equations. This reflects in an intrinsic psi^D-psi duality between linearly independent solutions of the Schroedinger equation. Unlike Bohm's theory, there is a non-trivial action even for bound states. No use of any axiomatic interpretation of the wave-function is made. Tunnelling is a direct consequence of the quantum potential which differs from the usual one and plays the role of particle's self-energy. The QSHJE is defined only if the ratio psi^D/psi is a local self-homeomorphism of the extended real line. This is an important feature as the L^2 condition, which in the usual formulation is a consequence of the axiomatic interpretation of the wave-function, directly follows as a basic theorem which only uses the geometrical gluing conditions of psi^D/psi at q=\pm\infty as implied by the EP. As a result, the EP itself implies a dynamical equation that does not require any further assumption and reproduces both tunnelling and energy quantization. Several features of the formulation show how the Copenhagen interpretation hides the underlying nature of QM. Finally, the non-stationary higher dimensional quantum HJ equation and the relativistic extension are derived.