Green's functions for first-order systems of ordinary differential equations without the unique continuation property

Abstract

This paper is a contribution to the spectral theory associated with the differential equation Ju'+qu=wf on the real interval (a,b) when J is a constant, invertible skew-Hermitian matrix and q and w are matrices whose entries are distributions of order zero with q Hermitian and w non-negative. Under these hypotheses it may not be possible to uniquely continue a solution from one point to another, thus blunting the standard tools of spectral theory. Despite this fact we are able to describe symmetric restrictions of the maximal relation associated with Ju'+qu=wf and show the existence of Green's functions for self-adjoint relations even if unique continuation of solutions fails.