A breather construction for a semilinear curl-curl wave equation with radially symmetric coefficients

Abstract

We consider the semilinear curl-curl wave equation s(x) ∂t2 U +∇×∇× U + q(x) U V(x) |U|p-1 U = 0 for (x,t)∈ R3×R. For any p>1 we prove the existence of time-periodic spatially localized real-valued solutions (breathers) both for the + and the - case under slightly different hypotheses. Our solutions are classical solutions that are radially symmetric in space and decay exponentially to 0 as |x| ∞. Our method is based on the fact that gradient fields of radially symmetric functions are annihilated by the curl-curl operator. Consequently, the semilinear wave equation is reduced to an ODE with r=|x| as a parameter. This ODE can be efficiently analyzed in phase space. As a side effect of our analysis, we obtain not only one but a full continuum of phase-shifted breathers U(x,t+a(x)), where U is a particular breather and a:R3 an arbitrary radially symmetric C2-function.