Proceedings of the International School of Physics "Enrico Fermi.", Volume 25N. Zanichelli, 1953 - Nuclear physics |
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Page 6
... defined as oV ( 0 ++ q− ) V = Q + V + + q - V- , and p , T etc. defined rela- tive to V , whereupon = + div OV = 0 , ( I.2.4 ) at DV ( 1.2.5 ) Q • Dt + ▽ · p − Q ( E + V × B ) − j × B = 0 , - and ( I.2.6 ) DU Dt - + U div V + p : VV ...
... defined as oV ( 0 ++ q− ) V = Q + V + + q - V- , and p , T etc. defined rela- tive to V , whereupon = + div OV = 0 , ( I.2.4 ) at DV ( 1.2.5 ) Q • Dt + ▽ · p − Q ( E + V × B ) − j × B = 0 , - and ( I.2.6 ) DU Dt - + U div V + p : VV ...
Page 78
... defined by ( 3 ) , BB and eE , respectively . In ( 16 ) , j occurs which is defined by ( 28 ) . In ( 24 ) P , and N occur which are given by ( 25 ) - ( 27 ) and 2лf Fodq dw respectively . σo in eq . ( 28 ) is given by ( 17 ) . These ...
... defined by ( 3 ) , BB and eE , respectively . In ( 16 ) , j occurs which is defined by ( 28 ) . In ( 24 ) P , and N occur which are given by ( 25 ) - ( 27 ) and 2лf Fodq dw respectively . σo in eq . ( 28 ) is given by ( 17 ) . These ...
Page 139
... define an entropy S which is a constant of the motion and which has the property that the lowest state of the energy of the system consistent with this constraint is that defined by the initial distribution fo . In other words , any ...
... define an entropy S which is a constant of the motion and which has the property that the lowest state of the energy of the system consistent with this constraint is that defined by the initial distribution fo . In other words , any ...
Contents
W B THOMPSON Kinetic theory of plasma | 97 |
Topics in microinstabilities | 137 |
carrier mass | 159 |
Copyright | |
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adiabatic invariant amplitude approximation Boltzmann equation boundary conditions boundary layer calculated cathode coefficient collision components consider constant contraction corresponds courbe critère current density d³k d³v Debye length derived differential equations discharge dispersion relation distribution function eigenvalue electric field electrons and ions electrostatic energy principle equations of motion equilibrium exp[i(k finite fluid theory frequency given Hence instability integral interaction ionized k₁ KRUSKAL l'axe magnétique limit Liouville function lowest order magnetic field Maxwell's equations mode nonlinear obtain Ohm's law P₁ parameter particle périodique perturbation Phys plasma oscillations Plasma Physics Poisson's equation potential problem quantities R₁ region Rendiconti S.I.F. satisfied saturation current solution solving stabilité stability temperature thermal tion v₁ values variables vector velocity x₁ zero zero-order Απ