A stochastic derivation of the Sivashinsky equation for the self-turbulent motion of a free particle

Foundations of Physics 10 (9):731-742 (1980)
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Abstract

Within the framework of the Kershaw approach and of a hypothesis on spatial stochasticity, the relativistic equations of Lehr and Park, Guerra and Ruggiero, and Vigier for stochastic Nelson mechanics are obtained. In our model there is another set of equations of the hydrodynamical type for the drift velocityv i(x j,t) and stochastic velocityu i(x j,t) of a particle. Taking into account quadratic terms in l, the universal length, we obtain from these equations the Sivashinsky equations forv i(x j,t) in the caseu i →0. In the limit l →0, these equations acquire the Newtonian form

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10.1007/bf00708419

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Can stochastic physics be a complete theory of nature?Steven M. Moore - 1979 - Foundations of Physics 9 (3-4):237-259.
Self-turbulence in the motion of a free particle.G. Sivashinsky - 1978 - Foundations of Physics 8 (9-10):735-744.

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