Energy concentration and explicit Sommerfeld radiation condition for the electromagnetic Helmholtz equation

Abstract

We study the electromagnetic Helmholtz equation (∇ + ib(x))2u(x) + n(x)u(x) = f(x), x∈ with the magnetic vector potential b(x) and n(x) a variable index of refraction that does not necessarily converge to a constant at infinity, but can have an angular dependency like n(x) n∞(x|x|) as |x|∞. We prove an explicit Sommerfeld radiation condition ∫ | u - in∞1/2x|x|u|2 dx1+|x) < + ∞ for solutions obtained from the limiting absorption principle and we also give a new energy estimate ∫| ∇ωn∞(x|x|)|2|u|21+|x| dx < +∞, which explains the main physical effect of the angular dependence of n at infinity and deduces that the energy concentrates in the directions given by the critical points of the potential.