Decay estimates of solutions to the compressible Euler-Maxwell system in R3

Abstract

We study the large time behavior of solutions near a constant equilibrium to the compressible Euler-Maxwell system in 3. We first refine a global existence theorem by assuming that the H3 norm of the initial data is small, but the higher order derivatives can be arbitrarily large. If the initial data belongs to H-s (0 s<3/2) or B2,∞-s (0<s3/2), by a regularity interpolation trick, we obtain the various decay rates of the solution and its higher order derivatives. As an immediate byproduct, the usual Lp--L2 (1 p 2) type of the decay rates follow without requiring that the Lp norm of initial data is small.