Modeling of CollisionsGauthier-Villars, 1998 - 222 من الصفحات |
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الصفحة 8
... distribution function : nα = 1 3 / - – U. ) 2ƒ。d3v . - fad3va · [ faď3va , nalla = = [ vafad3va , nata = { ma ( va . | ( 1-1 ) This is of course the kinetic temperature , defined from the mean kinetic energy . It has not its ...
... distribution function : nα = 1 3 / - – U. ) 2ƒ。d3v . - fad3va · [ faď3va , nalla = = [ vafad3va , nata = { ma ( va . | ( 1-1 ) This is of course the kinetic temperature , defined from the mean kinetic energy . It has not its ...
الصفحة 29
... distribution function perturbation is not negligible , but the Maxwellian estimate for v can be shown to remain correct , because it doesn't depend on the details of the distribution of the heavies . We exclude these impurities cases ...
... distribution function perturbation is not negligible , but the Maxwellian estimate for v can be shown to remain correct , because it doesn't depend on the details of the distribution of the heavies . We exclude these impurities cases ...
الصفحة 42
... function in the proper frame Rs of a distribution of heavier particles ẞ , since the Galilean transformation formula ... distribution functions , that is those which are considered as infinitely heavy or infinitely light ( sections 2.4 ...
... function in the proper frame Rs of a distribution of heavier particles ẞ , since the Galilean transformation formula ... distribution functions , that is those which are considered as infinitely heavy or infinitely light ( sections 2.4 ...
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appear approximation assumed atomic average Boltzmann Equation calculation chapter charge classical close collision frequencies collision terms collisional computed conservation consider correct Coulomb logarithms coupled defined density depend developed diffusion distribution function effect electrons energy equal equilibrium estimate existence expressions finally fluid flux formula frame given gives heat heavy hydrodynamic integrals interaction ion species ionic kinetic light limit linear mass Maxwellian mean mean velocity momentum multi-fluid neutral Note numerical obtained operator parameter particle particular perturbation perturbation equations Phys physics plasma pressure problem properties quantities quantum quantum mechanical reduced reference relations relative satisfies scalar single solution solved temperature tensor theory thermal transport coefficients transport equations vector αβ Μα