4 research outputs found
Boltzmann equations for mixtures of Maxwell gases: exact solutions and power like tails
We consider the Boltzmann equations for mixtures ofMaxwell gases. It is shown
that in certain limiting case the equations admit self-similar solutions that
can be constructed in explicit form. More precisely, the solutions have simple
explicit integral representations. The most interesting solutions have finite
energy and power like tails. This shows that power like tails can appear not
just for granular particles (Maxwell models are far from reality in this case),
but also in the system of particles interacting in accordance with laws of
classical mechanics. In addition, non-existence of positive self-similar
solutions with finite moments of any order is proven for a wide class of
Maxwell models.Comment: 20 page
Stability Analysis of Distributed Order Fractional Differential Equations
We analyze the stability of three classes of distributed order fractional differential equations (DOFDEs) with respect to the nonnegative density function. In this sense, we discover a robust stability condition for these systems based on characteristic function and new inertia concept of a matrix with respect to the density function. Moreover, we check the stability of a distributed order fractional WINDMI system to illustrate the validity of proposed procedure