Holomorphic operator valued functions generated by passive selfadjoint systems

Abstract

In this paper we study a class R S( M) of operator functions that are holomorphic in the domain C\(-∞,-1] [1,+∞)\ and whose values are contractive operators in a Hilbert space ( M). The functions in R S( M) are Schur functions in the open unit disk D and, in addition, Nevanlinna functions in C+ C-. Such functions can be realized as transfer functions of minimal passive selfadjoint discrete-time systems. We give various characterizations for the class R S( M) and obtain an explicit form for the inner functions from the class R S( M) as well as an inner dilation for any function from R S( M). We also consider various transformations of the class R S( M), construct realizations of their images, and find corresponding fixed points.