An H-theorem for the linearized Grad 13 moment equations leads to regularizing constitutive equations for higher fluxes and to a complete set of boundary conditions. Solutions for Couette and Poiseuille flows show good agreement to DSMC simulations. The Knudsen minimum for the relative mass flow rate is reproduced. for LaTeX users @article{HStruchtrup2007-99, author = {H. Struchtrup and M. Torrilhon}, title = {H-theorem, regularization, and boundary conditions for linearized 13 moment equations}, journal = {Phys. Rev. Lett.}, volume = {99}, pages = {014502}, year = {2007} }
\bibitem{HStruchtrup2007-99} H. Struchtrup, M. Torrilhon, H-theorem, regularization, and boundary conditions for linearized 13 moment equations, Phys. Rev. Lett. {\bf 99} (2007) 014502.HStruchtrup2007-99 H. Struchtrup, M. Torrilhon H-theorem, regularization, and boundary conditions for linearized 13 moment equations Phys. Rev. Lett.,99,2007,014502 |