Local well-posedness of the Boltzmann equation with polynomially decaying initial data
Document Type
Article
Publication Date
8-1-2020
Abstract
We consider the Cauchy problem for the spatially inhomogeneous non-cutoff Boltzmann equation with polynomially decaying initial data in the velocity variable. We establish short-time existence for any initial data with this decay in a fifth order Sobolev space by working in a mixed L2 and L∞ space that allows to compensate for potential moment generation and obtaining new estimates on the collision operator that are well-adapted to this space. Our results improve the range of parameters for which the Boltzmann equation is well-posed in this decay regime, as well as relax the restrictions on the initial regularity. As an application, we can combine our existence result with the recent conditional regularity estimates of Imbert-Silvestre (arXiv:1909.12729 [math. AP]) to conclude solutions can be continued for as long as the mass, energy, and entropy densities remain under control. This continuation criterion was previously only available in the restricted range of parameters of previous well-posedness results for polynomially decaying initial data.
Publication Source (Journal or Book title)
Kinetic and Related Models
First Page
837
Last Page
867
Recommended Citation
Henderson, C., Snelson, S., & Tarfulea, A. (2020). Local well-posedness of the Boltzmann equation with polynomially decaying initial data. Kinetic and Related Models, 13 (4), 837-867. https://doi.org/10.3934/KRM.2020029