Self-adjoint extensions of symmetric relations associated with systems of ordinary differential equations with distributional coefficients

Abstract

We study the extension theory for the two-dimensional first-order system Ju' +qu = wf of differential equations on the real interval (a,b) where J is a constant, invertible, skew-hermitian matrix and q and w are matrices whose entries are real distributions of order 0 with q hermitian and w non-negative. Specifically, we characterize the boundary conditions for solutions u in the closure of the minimal relation, as well as describe the properties of quasi-boundary conditions which yield self-adjoint extensions. We then apply these ideas to a popular extension of non-negative minimal relations: the Krein-von Neumann extension. For more context on how the Krein-von Neumann is defined, an appendix shows a construction of the Friedrichs extension from which the Krein-von Neumann is traditionally defined.