The original Weyl-Titchmarsh functions and sectorial Shr\"odinger L-systems

Abstract

In this paper we study the L-system realizations generated by the original Weyl-Titchmarsh functions mα(z) in the case when the minimal symmetric Shr\"o\-dinger operator in L2[,+∞) is non-negative. We realize functions (-mα(z)) as impe\-dance functions of Shr\"odinger L-systems and derive necessary and sufficient conditions for (-mα(z)) to fall into sectorial classes Sβ1,β2 of Stieltjes functions. Moreover, it is shown that the knowledge of the value m∞(-0) and parameter α allows us to describe the geometric structure of the L-system that realizes (-mα(z)). Conditions when the main and state space operators of the L-system realizing (-mα(z)) have the same or not angle of sectoriality are presented in terms of the parameter α. Example that illustrates the obtained results is presented in the end of the paper.