%0 Book Section %1 statphys23_0775 %A Colangeli, M. %A Karlin, I.V. %A Kroger, M. %B Abstract Book of the XXIII IUPAP International Conference on Statistical Physics %C Genova, Italy %D 2007 %E Pietronero, Luciano %E Loreto, Vittorio %E Zapperi, Stefano %K boltzmann chapman-enskog equation expansion h-theorem hydrodynamics statphys23 topic-1 %T From hyperbolic regularization to exact hydrodynamics for linear Grad System %U http://st23.statphys23.org/webservices/abstract/preview_pop.php?ID_PAPER=775 %X The derivation of hydrodynamics from a microscopic description is the classical problem of physical kinetics. The Chapman-Enskog method derives the solution from the Boltzmann equation in the form of a series in powers of Knudsen number, where is the ratio between the particle mean free path and the length scale of variations of hydrodynamic fields. However, as first demonstrated by Bobylev for Maxwell’s molecules, even in the simplest case (one-dimensional linear deviation from global equilibrium), the Burnett and the super-Burnett hydrodynamics violate the basic physics behind the Boltzmann equation. Namely, the acoustic contributions at sufficiently short wave-lengths increase with time instead of decaying. Inspired by a recent hyperbolic regularization of Burnett’s hydrodynamic equations, we introduce a method to derive stable equations of linear hydrodynamics to any desired accuracy in Knudsen number, starting from a simple kinetic model – a thirteen Moments Grad System. We show that stability arises as interplay between two basic features of the resulting hydrodynamic equations, i.e. “hyperbolicity” and “dissipativity”.

@incollection{statphys23_0775, abstract = {The derivation of hydrodynamics from a microscopic description is the classical problem of physical kinetics. The Chapman-Enskog method derives the solution from the Boltzmann equation in the form of a series in powers of Knudsen number, where is the ratio between the particle mean free path and the length scale of variations of hydrodynamic fields. However, as first demonstrated by Bobylev for Maxwell’s molecules, even in the simplest case (one-dimensional linear deviation from global equilibrium), the Burnett and the super-Burnett hydrodynamics violate the basic physics behind the Boltzmann equation. Namely, the acoustic contributions at sufficiently short wave-lengths increase with time instead of decaying. Inspired by a recent hyperbolic regularization of Burnett’s hydrodynamic equations, we introduce a method to derive stable equations of linear hydrodynamics to any desired accuracy in Knudsen number, starting from a simple kinetic model – a thirteen Moments Grad System. We show that stability arises as interplay between two basic features of the resulting hydrodynamic equations, i.e. “hyperbolicity” and “dissipativity”.}, added-at = {2007-06-20T10:16:09.000+0200}, address = {Genova, Italy}, author = {Colangeli, M. and Karlin, I.V. and Kroger, M.}, biburl = {https://www.bibsonomy.org/bibtex/23dda2bb12fa29801b783ef8fdd275397/statphys23}, booktitle = {Abstract Book of the XXIII IUPAP International Conference on Statistical Physics}, editor = {Pietronero, Luciano and Loreto, Vittorio and Zapperi, Stefano}, interhash = {70f4e0729b0131713ce84cf3fd07e8bf}, intrahash = {3dda2bb12fa29801b783ef8fdd275397}, keywords = {boltzmann chapman-enskog equation expansion h-theorem hydrodynamics statphys23 topic-1}, month = {9-13 July}, timestamp = {2007-06-20T10:16:29.000+0200}, title = {From hyperbolic regularization to exact hydrodynamics for linear Grad System}, url = {http://st23.statphys23.org/webservices/abstract/preview_pop.php?ID_PAPER=775}, year = 2007 }