Master equation: Difference between revisions

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The master equation describes the exact behavior of the velocity distribution for any time (Ref. 1 Eq. 3-11)

${\displaystyle \partial _{t\rho _{0}}\left(\{{\mathbf {\upsilon } }\},t\right)={\mathcal {D}}_{0}\left(t,\rho _{\{k''\}}\left(\{{\mathbf {\upsilon } }\},0\right)\right)+\int _{0}^{t}G_{00}(t-t')\rho _{0}\left(\{{\upsilon }\},t'\right){\mathrm {d} }t'}$

where the time dependent functional of the initial conditions is given by (Ref. 1 Eq. 3-9)

${\displaystyle {\mathcal {D}}_{0}\left(t,\rho _{\{k''\}}\left(\{{\mathbf {\upsilon } }\},0\right)\right)={\frac {-1}{2\pi }}\oint _{c}\exp(-izt)\sum _{\{k''\}\neq 0}{\mathcal {D}}_{0\{k''\}}^{+}(z)\rho _{\{k''\}}\left(\{{\mathbf {\upsilon } }\},0\right)}$

and the diagonal fragment is given by (Ref. 1 Eq. 3-10)

${\displaystyle G_{00}(\tau )={\frac {1}{2\pi i}}\oint _{c}\exp(-iz\tau )\psi _{00}^{+}(z)~{\mathrm {d} }z}$

References

1. I. Prigogine and P. Résibois "On the kinetics of the approach to equilibrium", Physica 27 pp. 629-646 (1961)