The Boltzmann equation and corresponding extremal problems
Mathematical Physics
2011-06-17 v1 Analysis of PDEs
math.MP
Abstract
We start with some global Maxwellian function , which is a stationary solution (with the constant total density ) of the Boltzmann equation, and we denote the number of the corresponding space variables by . The notion of distance between the global Maxwellian function and an arbitrary solution (with the same total density at the fixed moment ) of the Boltzmann equation is introduced. In this way we essentially generalize the important Kullback-Leibler distance, which was used before. An extremal problem to find a solution of the Boltzmann equation, such that is minimal in the class of solutions with the fixed values of energy and of moments, is solved.
Cite
@article{arxiv.1106.3254,
title = {The Boltzmann equation and corresponding extremal problems},
author = {Lev Sakhnovich},
journal= {arXiv preprint arXiv:1106.3254},
year = {2011}
}