Conservative L-systems and the Livsic function

Abstract

We study the connection between the Livsic class of functions s(z) that are the characteristic functions of densely defined symmetric operators A with deficiency indices (1, 1), the characteristic functions S(z) (the M\"obius transform of s(z)) of a maximal dissipative extension T of A (determined by the von Neumann parameter of the extension relative to an appropriate basis in the deficiency subspaces) and the transfer functions W(z) of a conservative L-system with the main operator T. It is shown that under a natural hypothesis S(z) and W(z) are reciprocal to each other. In particular, when =0, W(z)=1S(z)=-1s(z). It is established that the impedance function of a conservative L-system with the main operator T coincides with the function from the Donoghue class if and only if the von Neumann parameter vanishes (=0). Moreover, we introduce the generalized Donoghue class and obtain the criteria for an impedance function to belong to this class. All results are illustrated by a number of examples.