Multiple solutions to a nonlinear curl-curl problem in R3

Abstract

We look for ground states and bound states E:R33 to the curl-curl problem ∇×(∇× E)= f(x,E) in R3 which originates from nonlinear Maxwell equations. The energy functional associated with this problem is strongly indefinite due to the infinite dimensional kernel of ∇×(∇× ·). The growth of the nonlinearity f is controlled by an N-function :R [0,∞) such that s 0(s)/s6=s+∞(s)/s6=0. We prove the existence of a ground state, i.e. a least energy nontrivial solution, and the existence of infinitely many geometrically distinct bound states. We improve previous results concerning ground states of curl-curl problems. Multiplicity results for our problem have not been studied so far in R3 and in order to do this we construct a suitable critical point theory. It is applicable to a wide class of strongly indefinite problems, including this one and Schr\"odinger equations.