The Brezis-Nirenberg problem for the curl-curl operator

Abstract

We look for solutions E:3 of the problem \ aligned &∇×(∇× E) +λ E = |E|p-2E && in &× E = 0 && on ∂ aligned . on a bounded Lipschitz domain ⊂R3, where ∇× denotes the curl operator in R3. The equation describes the propagation of the time-harmonic electric field \E(x)eiω t\ in a nonlinear isotropic material with λ=-μ ω2≤ 0, where μ and stand for the permeability and the linear part of the permittivity of the material. The nonlinear term |E|p-2E with p>2 is responsible for the nonlinear polarisation of and the boundary conditions are those for surrounded by a perfect conductor. The problem has a variational structure and we deal with the critical values p, for instance, in convex domains or in domains with C1,1 boundary p=6=2* is the Sobolev critical exponent and we get the quintic nonlinearity in the equation. We show that there exist a cylindrically symmetric ground state solution and a finite number of cylindrically symmetric bound states depending on λ≤ 0. We develop a new critical point theory which allows to solve the problem, and which enables us to treat more general anisotropic media as well as other variational problems.