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Generalized transport equation
Physical Review B, 1974A transport equation for the density operator of the Landau quasiparticle in the presence of a constant magnetic field is derived using the generalized self-consistent field (GSCF) method. An appropriate matrix representation in $\stackrel{\ensuremath{\rightarrow}}{\mathrm{k}}$ space is introduced.
A. R. Vasconcellos, R. Luzzi
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1989
Transport equations in the widest sense describe the transport of physical properties (mass, momentum, energy, heat, magnetism, charge, etc.) in space. Diffusion theory and hydrodynamics use transport equations in this sense. In a more restricted sense they describe transport in phase space, i.e. (p, r)-space.
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Transport equations in the widest sense describe the transport of physical properties (mass, momentum, energy, heat, magnetism, charge, etc.) in space. Diffusion theory and hydrodynamics use transport equations in this sense. In a more restricted sense they describe transport in phase space, i.e. (p, r)-space.
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2011
Cet expose aura pour but de montrer comment a partir de la theorie cinetique des gaz on peut obtenir les equations macroscopiques qui decrivent l'evolution du fluide reel, en l'ocourence d'un gaz rarefie.
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Cet expose aura pour but de montrer comment a partir de la theorie cinetique des gaz on peut obtenir les equations macroscopiques qui decrivent l'evolution du fluide reel, en l'ocourence d'un gaz rarefie.
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1988
The theory of nonlinear electronic transport in semiconductors is mostly based on the Boltzmann transport equation (BET) and “natural” extensions of it. Consequently there exists an enormous amount of original papers and reviews on that subject1. From a general point of view, there is probably no need for reviewing the Boltzmann equation once more. The
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The theory of nonlinear electronic transport in semiconductors is mostly based on the Boltzmann transport equation (BET) and “natural” extensions of it. Consequently there exists an enormous amount of original papers and reviews on that subject1. From a general point of view, there is probably no need for reviewing the Boltzmann equation once more. The
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Intracellular mRNA transport and localized translation
Nature Reviews Molecular Cell Biology, 2021Sulagna Das +2 more
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ShengBTE: A solver of the Boltzmann transport equation for phonons
Computer Physics Communications, 2014Wu Li, Jesús Carrete, Nebil A Katcho
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