Chavanis Pierre-Henri, Sire Clément
Laboratoire de Physique Théorique (UMR 5152 du CNRS), Université Paul Sabatier, 118, route de Narbonne, 31062 Toulouse Cedex 4, France.
Phys Rev E Stat Nonlin Soft Matter Phys. 2006 Jun;73(6 Pt 2):066104. doi: 10.1103/PhysRevE.73.066104. Epub 2006 Jun 1.
We propose a general kinetic and hydrodynamic description of self-gravitating Brownian particles in d dimensions. We go beyond the usual approximations by considering inertial effects and finite-N effects while previous works use a mean-field approximation valid in a proper thermodynamic limit (N --> +infinity) and consider an overdamped regime (xi --> +infinity). We recover known models in some particular cases of our general description. We derive the expression of the virial theorem for self-gravitating Brownian particles and study the linear dynamical stability of isolated clusters of particles and uniform systems by using techniques introduced in astrophysics. We investigate the influence of the equation of state, of the dimension of space, and of the friction coefficient on the dynamical stability of the system. We obtain the exact expression of the critical temperature Tc for a multicomponents self-gravitating Brownian gas in d = 2. We also consider the limit of weak frictions, xi --> 0, and derive the orbit-averaged Kramers equation.
我们提出了一个关于d维自引力布朗粒子的一般动力学和流体动力学描述。我们超越了通常的近似,考虑了惯性效应和有限N效应,而之前的工作使用的是在适当热力学极限(N→+∞)下有效的平均场近似,并考虑了过阻尼 regime(ξ→+∞)。在我们的一般描述的某些特定情况下,我们恢复了已知模型。我们推导了自引力布朗粒子的维里定理的表达式,并通过使用天体物理学中引入的技术研究了孤立粒子团和均匀系统的线性动力学稳定性。我们研究了状态方程、空间维度和摩擦系数对系统动力学稳定性的影响。我们得到了d = 2时多组分自引力布朗气体的临界温度Tc的精确表达式。我们还考虑了弱摩擦极限,ξ→0,并推导了轨道平均的克莱默斯方程。
