Quantum, Stochastic, and Classical Dynamics Within A Single Geometric Framework

Abstract

Nelson's stochastic mechanics links quantum mechanics to an underlying Brownian motion with the identification = mσ. Ghose's interpolating equation introduces a continuous parameter λ that suppresses the quantum potential Q[] and yields a smooth transition between quantum (λ=0) and classical (λ=1) regimes. In this short note, we show that the Koopman--von Neumann (KvN) Hilbert-space formulation of classical mechanics emerges naturally as the λ 1 limit of this stochastic σ--λ hierarchy. The KvN phase-space amplitude provides an operator representation of the classical Liouville equation, while the λ parameter acts as a projection flow from the complex projective Hilbert manifold CPn to its classical quotient CP*/U(1), implementing phase superselection. This unified picture links quantum, stochastic, and classical dynamics within a single continuous framework.

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