On the Theory of Matrix Valued Functions Belonging to the Smirnov Class

Abstract

A theory of matrix-valued functions from the matricial Smirnov class Nn+( D) is systematically developed. In particular, the maximum principle of V.I.Smirnov, inner-outer factorization, the Smirnov-Beurling characterization of outer functions and an analogue of Frostman's theorem are presented for matrix-valued functions from the Smirnov class Nn+( D). We also consider a family Fλ =F-λ I of functions belonging to the matricial Smirnov class which is indexed by a complex parameter λ. We show that with the exception of a ''very small'' set of such λ the corresponding inner factor in the inner-outer factorization of the function Fλ is a Blaschke-Potapov product. The main goal of this paper is to provide users of analytic matrix-function theory with a standard source for references related to the matricial Smirnov class.