Matrix-valued Aleksandrov--Clark measures and Carath\'eodory angular derivatives

Abstract

This paper deals with families of matrix-valued Aleksandrov--Clark measures \μα\α∈U(n), corresponding to purely contractive n× n matrix functions b on the unit disc of the complex plane. We do not make other apriori assumptions on b. In particular, b may be non-inner and/or non-extreme. The study of such families is mainly motivated from applications to unitary finite rank perturbation theory. A description of the absolutely continuous parts of μα is a rather straightforward generalization of the well-known results for the scalar case (n=1). The results and proofs for the singular parts of matrix-valued μα are more complicated than in the scalar case, and constitute the main focus of this paper. We discuss matrix-valued Aronszajn--Donoghue theory concerning the singular parts of the Clark measures, as well as Carath\'eodory angular derivatives of matrix-valued functions and their connections with atoms of μα. These results are far from being straightforward extensions from the scalar case: new phenomena specific to the matrix-valued case appear here. New ideas, including the notion of directionality, are required in statements and proofs.