Microscopic model for the Langevin equation: Force-force correlation function
Keywords:
diffusion, Langevin force, correlation function, microscopic theory
Abstract
We look into the particle diffusion in a 1D atomic chain. We consider two different models. In the first one the lattice particles are supposed to move independently. The stochasticity of the motion in this case is achieved due to nonlinear oscillations of the lattice particles. In the second case the linear oscillations of the lattice particles are considered and the stochasticity of doping particle motion stems from the finiteness of phonon spectra. In both cases we derive the stochastic properties of the Langevin force. The found expressions for the correlation function of the Langevin force could be reduced to the white noise only at some limiting values of the lattice and thermostat parameters.
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References
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G. Sesé, E. Guàrdia and J. A. Padró. J. Stat. Phys., 60, 3-4, 501 (1990).
P. Fröbrich, I. I. Gontchar. Phys. Rep., 292, 3-4, 131 (1998).
William T. Coffey, Yu. P. Kalmykov, J. T. Waldron. The Langevin Equation: With Applications to Stochastic Problems in Physics, Chemistry and Electrical Engineering, v. 14, 2nd ed., World Scientific Series in Contemporary Chemical Physics, Singapore, (2004), 678 p.
A. M. Kosevich, A. S. Kovalev. Introduction in nonlinear physical mechanics, Naukova dumka, Kiev, (1989), 320 p.
R. Kubo. Statistical mechanics: an advanced course with problems and solutions, North Holland, (1990), 430 p.
O. V. Usatenko, S. S. Apostolov, Z. A. Mayzelis and S. S. Melnik. Random Finite-Valued Dynamical Systems: Additive Markov Approach, Cambridge Scientific Publishers, Cambridge, (2009), 171 p.
Published
2014-11-19
How to Cite
Pritula, G. M., Shkop, A. V., Tkanov, D. A., & Usatenko, O. V. (2014). Microscopic model for the Langevin equation: Force-force correlation function. Journal of V. N. Karazin Kharkiv National University. Series Physics, 1135(21), 56-60. Retrieved from https://periodicals.karazin.ua/physics/article/view/7871
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