Well/ill-posedness bifurcation for the Boltzmann equation with constant collision kernel
Abstract
We consider the 3D Boltzmann equation with the constant collision kernel. We investigate the well/ill-posedness problem using the methods from nonlinear dispersive PDEs. We construct a family of special solutions, which are neither near equilibrium nor self-similar, to the equation, and prove that the well/ill-posedness threshold in Hs Sobolev space is exactly at regularity s=1, despite the fact that the equation is scale invariant at s=12.
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