On realization of the original Weyl-Titchmarsh functions by Shr\"odinger L-systems

Abstract

We study realizations generated by the original Weyl-Titchmarsh functions m∞(z) and mα(z). It is shown that the Herglotz-Nevanlinna functions (-m∞(z)) and (1/m∞(z)) can be realized as the impedance functions of the corresponding Shr\"odinger L-systems sharing the same main dissipative operator. These L-systems are presented explicitly and related to Dirichlet and Neumann boundary problems. Similar results but related to the mixed boundary problems are derived for the Herglotz-Nevanlinna functions (-mα(z)) and (1/mα(z)). We also obtain some additional properties of these realizations in the case when the minimal symmetric Shr\"odinger operator is non-negative. In addition to that we state and prove the uniqueness realization criteria for Shr\"odinger L-systems with equal boun\-dary parameters. A condition for two Shr\"odinger L-systems to share the same main operator is established as well. Examples that illustrate the obtained results are presented in the end of the paper.