Reconstruction formula for differential systems with a singularity

Abstract

Our studies concern some aspects of scattering theory of the singular differential systems y'-x-1Ay-q(x)y= By, \ x>0 with n× n matrices A,B, q(x), x∈(0,∞), where A,B are constant and is a spectral parameter. We concentrate on the important special case when q(·) is smooth and q(0)=0 and derive a formula that express such q(·) in the form of some special contour integral, where the kernel can be written in terms of the Weyl - type solutions of the considered differential system. Formulas of such a type play an important role in constructive solution of inverse scattering problems: use of such formulas, where the terms in their right-hand sides are previously found from the so-called main equation, provides a final step of the solution procedure. In order to obtain the above-mentioned reconstruction formula we establish first the asymptotical expansions for the Weyl - type solutions as ∞ with o(-1) rate remainder estimate.