On the Boltzmann-Fermi-Dirac Equation for Hard Potential: Global Existence and Uniqueness, Gaussian Lower Bound, and Moment Estimates

Abstract

In this paper, we study the global existence and uniqueness, Gaussian lower bound, and moment estimates in the spatially homogeneous Boltzmann equation for Fermi-Dirac particles for hard potential (0≤ γ≤ 2) with angular cutoff b. Our results extend classical results to the Boltzmann-Fermi-Dirac setting. In detail, (1) we show existence, uniqueness, and L12 stability of global-in-time solutions of the Boltzmann-Fermi-Dirac equation. (2) Assuming the solution is not a saturated equilibrium, we prove creation of a Gaussian lower bound for the solution. (3) We prove creation and propagation of L1 polynomial and exponential moments of the solution under additional assumptions on the angular kernel b and 0<γ≤ 2. (4) Finally, we show propagation of L∞ Gaussian and polynomial upper bounds when b is constant and 0<γ≤ 1.

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