Large |k| behavior of complex geometric optics solutions to d-bar problems

Abstract

Complex geometric optics solutions to a system of d-bar equations appearing in the context of electrical impedance tomography and the scattering theory of the integrable Davey-Stewartson II equations are studied for large values of the spectral parameter k. For potentials \( q∈ · -2 Hs(C) \) for some s ∈]1,2], it is shown that the solution converges as the geometric series in 1/|k|s-1. For potentials q being the characteristic function of a strictly convex open set with smooth boundary, this still holds with s=3/2 i.e., with 1/|k| instead of 1/|k|s-1. The leading order controbutions are computed explicitly. Numerical simulations show the applicability of the asymptotic formulae for the example of the characteristic function of the disk.