Lines Matching refs:U

13 \frac{\partial \rho}{\partial t} + \nabla \cdot \bm{U} &= 0 \\
14 \frac{\partial \bm{U}}{\partial t} + \nabla \cdot \left( \frac{\bm{U} \otimes \bm{U}}{\rho} + P \bm…
15 \frac{\partial E}{\partial t} + \nabla \cdot \left( \frac{(E + P)\bm{U}}{\rho} -\bm{u} \cdot \bm{\s…
20 …q}`eq-ns`, $\rho$ represents the volume mass density, $U$ the momentum density (defined as $\bm{U}…
23 P = \left( {c_p}/{c_v} -1\right) \left( E - {\bm{U}\cdot\bm{U}}/{(2 \rho)} \right) \, ,
40     \bm{U} \equiv \rho \bm{ u }\\
56     \bm{U}\\
57     {(\bm{U} \otimes \bm{U})}/{\rho} + P \bm{I}_3 \\
58     {(E + P)\bm{U}}/{\rho}
218 \diff\bm U \\
219 (\diff\bm U \otimes \bm U + \bm U \otimes \diff\bm U)/\rho - (\bm U \otimes \bm U)/\rho^2 \diff\rho…
220 (E + P)\diff\bm U/\rho + (\diff E + \diff P)\bm U/\rho - (E + P) \bm U/\rho^2 \diff\rho