Inverse scattering at fixed energy on surfaces with Euclidean ends

Abstract

On a fixed Riemann surface (M0,g0) with N Euclidean ends and genus g, we show that, under a topological condition, the scattering matrix SV() at frequency > 0 for the operator +V determines the potential V if V∈ C1,α(M0) e-γ d(·,z0)jL∞(M0) for all γ>0 and for some j∈\1,2\, where d(z,z0) denotes the distance from z to a fixed point z0∈ M0. The topological condition is given by N≥(2g+1,2) for j=1 and by N≥ g+1 if j=2. In 2 this implies that the operator SV() determines any C1,α potential V such that V(z)=O(e-γ|z|2) for all γ>0.