The Existence of Solutions of a Space-Uniform Boltzmann Equation ()
ABSTRACT
Boltzmann equation is an equation which is related to the three variables of x, v, t. In this paper, we mainly study the space-uniform Boltzmann equation which unknown function F is not related to the position variable x. We mainly use the contraction mapping theorem to find the existence of the solution, so our mainly work is to prove the self-mapping, i.e. to prove its uniformly bounded, and then to prove the contraction mapping. There we can get the range of ||B(θ)||L1(L∞), next we can figure out the range of M and T from the conditions what we know. Finally, from these conditions, we can find the existence of the solution.
Share and Cite:
Ye, Z. and Li, R. (2020) The Existence of Solutions of a Space-Uniform Boltzmann Equation.
Journal of Applied Mathematics and Physics,
8, 294-300. doi:
10.4236/jamp.2020.82023.
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