Traveling Waves in the Euler-Heisenberg Electrodynamics

Abstract

We examine the possibility of travelling wave solutions within the nonlinear Euler-Heisenberg electrodynamics. Since this theory resembles in its form the electrodynamics in matter, it is a priori not clear if there exist travelling wave solutions with a new dispersion relation for ω(k) or if the Euler-Heisenberg theory stringently imposes ω=k for any arbitrary ansatz E() and B() with k·r -ω t. We show that the latter scheme applies for the Euler-Heisenberg theory, but point out the possibility of new solutions with ω ≠ k if we go beyond the Euler-Heisenberg theory, allowing strong fields. In case of the Euler-Heisenberg theory the quantum mechanical effect of the travelling wave solutions remains in corrections to the energy density and the Poynting vector.