The addition and multiplication theorems

Abstract

We discuss the classes , , and of analytic functions that can be realized as the Livsic characteristic functions of a symmetric densely defined operator A with deficiency indices (1,1), the Weyl-Titchmarsh functions associated with the pair ( A, A) where A is a self-adjoint extension of A, and the characteristic function of a maximal dissipative extension A of A, respectively. We show that the class is a convex set, both of the classes and are closed under multiplication and, moreover, ⊂ is a double sided ideal in the sense that · =· ⊂ . The goal of this paper is to obtain these analytic results by providing explicit constructions for the corresponding operator realizations. In particular, we introduce the concept of an operator coupling of two unbounded maximal dissipative operators and establish an analog of the Livsic-Potapov multiplication theorem [14] for the operators associated with the function classes and . We also establish that the modulus of the von Neumann parameter characterizing the domain of A is a multiplicative functional with respect to the operator coupling.