Travelling waves for Maxwell's equations in nonlinear and symmetric media
Abstract
We look for travelling wave fields E(x,y,z,t)= U(x,y) (kz+ω t)+ U(x,y)(kz+ω t), (x,y,z)∈R3,\, t∈R, satisfying Maxwell's equations in a nonlinear and cylindrically symmetric medium. We obtain a sequence of solutions with diverging energy that is different from that obtained by McLeod, Stuart, and Troy. In addition, we consider a more general nonlinearity, controlled by an N-function.
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