On inverse scattering for the two-dimensional nonlinear Klein-Gordon equation

Abstract

The inverse scattering problem for the two-dimensional nonlinear Klein-Gordon equation utt- u + u = N(u) is studied. We assume that the unknown nonlinearity N of the equation satisfies N∈ C∞(R;R), N(k)(y)=O(|y|\ 3-k,0 \) (y 0) and N(k)(y)=O(ec y2) (|y| ∞) for any k=0,1,2,·s. Here, c is a positive constant. We establish a reconstraction formula of N(k)(0) (k=3,4,5,·s) by the knowledge of the scattering operator for the equation. As an application, we also give an expression for higher order G\ateaux differentials of the scattering operator at 0.