On Quantization, the Generalized Schr\"odinger Equation and Classical Mechanics

Abstract

Using a new state-dependent, λ-deformable, linear functional operator, Qλ, which presents a natural C∞ deformation of quantization, we obtain a uniquely selected non--linear, integro--differential Generalized Schr\"odinger equation. The case Q1 reproduces linear quantum mechanics, whereas Q0 admits an exact dynamic, energetic and measurement theoretic reproduction of classical mechanics. All solutions to the resulting classical wave equation are given and we show that functionally chaotic dynamics exists.