Global well-posedness of the compressible bipolar Euler-Maxwell system in R3

Abstract

We first construct the global unique solution by assuming that the initial data is small in the H3 norm but its higher order derivatives could be large. If further the initial data belongs to H-s (0 s<3/2) or B2,∞-s (0< s3/2), we obtain the various decay rates of the solution and its higher order derivatives. As an immediate byproduct, the Lp-L2 (1 p 2) type of the decay rates follow without requiring the smallness for Lp norm of initial data. In particular, the decay rate for the difference of densities could reach to (1+t)-13/4 in L2 norm.