The global well-posedness and Newtonian limit for the relativistic Boltzmann equation in a periodic box

Abstract

In this paper, we study the Newtonian limit for relativistic Boltzmann equation in a periodic box T3. We first establish the global-in-time mild solutions of relativistic Boltzmann equation with uniform-in-c estimates and time decay rate. Then we rigorously justify the global-in-time Newtonian limits from the relativistic Boltzmann solutions to the solution of Newtonian Boltzmann equation in L1pL∞x. Moreover, if the initial data of Newtonian Boltzmann equation belong to W1,∞(T3×R3), based on a decomposition and L2-L∞ argument, the global-in-time Newtonian limit is proved in L∞x,p. The convergence rates of Newtonian limit are obtained both in L1pL∞x and L∞x,p.