langevin equation मीनिंग इन हिंदी

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It is based on the Generalized Langevin Equation ( GLE ).
On small timescales, inertial effects are prevalent in the Langevin equation.
In physics, however, stochastic integrals occur as the solutions of Langevin equations.
However, the Langevin equation is more general.
On long timescales, the mathematical Brownian motion is well described by a Langevin equation.
In those cases, the Langevin equation, which looks at particle acceleration, must be used.
The equipartition theorem can be used to derive the Brownian motion of a particle from the Langevin equation.
The " Langevin equation " describes advection, diffusion, and other phenomena in an explicitly stochastic way.
In 1991, he derived, with Bedeaux, the Langevin equation for a Brownian particle using only causality and time reversal invariance.
In the white noise setting described so far, the quantum Langevin equation for an arbitrary system operator a takes a simpler form: