# From interpretation of the three classical mechanics actions to the wave function in quantum mechanics

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From interpretation of the three classical mechanics actions to the wave function in quantum mechanics**

First, we show that there exists in classical mechanics three actions corresponding to different boundary conditions: two well-known actions, the Euler-Lagrange classical action S cl(x,t;x 0), which links the initial position x 0 and its position x at time t, the Hamilton-Jacobi action S(x,t), which links a family of particles of initial action S 0(x) to their various positions x at time t, and a new action, the deterministic action S(x,t;x 0,v 0), which links a particle in initial position x 0 and initial velocity v 0 to its position x at time t. We study, in the semi-classical approximation, the convergence of the quantum density and the quantum action, solutions to the Madelung equations, when the Planck constant h tends to 0. We find two different solutions which depend on the initial density. In the first case, where the initial quantum density is a classical density, the quantum density and the quantum action converge to a classical action and a classical density which satisfy the statistical Hamilton-Jacobi equations. These are the equations of a set of classical particles whose initial positions are known only by the initial density. In the second case where initial density converges to a Dirac density, the density converges to the Dirac function and the quantum action converges to a deterministic action. Therefore we introduce into classical mechanics non-discerned particles, which satisfy the statistical Hamilton-Jacobi-equations and explain the Gibbs paradox, and discerned particles, which satisfy the deterministic Hamilton-Jacobi equations. Finally, we propose an interpretation of the Schrodinger wave function that depends on the initial conditions (preparation). This double interpretation seems to be the interpretation of Louis de Broglies -double solution- idea.

Author: **Michel Gondran; Alexandre Gondran**

Source: https://archive.org/