论文信息 - Quantum mechanics as the quadratic Taylor approximation of classical mechanics: The finite-dimensional case

Quantum mechanics as the quadratic Taylor approximation of classical mechanics: The finite-dimensional case

We show that in contrast to a rather common opinion, quantum mechanics can be represented as an approximation of classical statistical mechanics. We consider an approximation based on the ordinary Taylor expansion of physical variables. The quantum contribution is given by the second-order term. To escape technical difficulties related to the infinite dimensionality of the phase space for quantum mechanics, we consider finite-dimensional quantum mechanics. On one hand, this is a simple example with high pedagogical value. On the other hand, quantum information operates in a finite-dimensional state space. Therefore, our investigation can be considered a construction of a classical statistical model for quantum information.

A. Khrennikov | A. Yu. Khrennikov

[1] Andrei Khrennikov,et al. Contextual Quantization and the Principle of Complementarity of Probabilities , 2005, Open Syst. Inf. Dyn..

[2] Semiquantum versus semiclassical mechanics for simple nonlinear systems (10 pages) , 2005, quant-ph/0511227.

[3] Complex numbers and symmetries in quantum mechanics, and a nonlinear superposition principle for Wigner functions , 2005, quant-ph/0504102.

[4] Andrei Khrennikov. Quantum theory: Reconsideration of foundations , 2003 .

[5] Andrei Khrennikov,et al. A pre-quantum classical statistical model with infinite-dimensional phase space , 2005, quant-ph/0505228.

[6] J. Neumann. Mathematical Foundations of Quantum Mechanics , 1955 .

[7] Andrei Khrennikov,et al. Foundations of Probability and Physics , 2002 .

[8] V. I. Man'ko,et al. Classical Mechanics Is not the ħ, → 0 Limit of Quantum Mechanics , 2004 .

[9] V. I. Man'ko,et al. Classical formulation of quantum mechanics , 1996 .