Unitary Interpolants and Factorization Indices of Matrix Functions

We construct a meromorphic matrix function with given spectral data in the form of null and pole functions, coupling matrix, and left annihilator at every point in the domain of definition of the function. Based on these results, descriptions are given of minimal divisibility of meromorphic matrix f

## Abstract A generalization to __N__×__N__ of the 2×2 Daniele–Khrapkov class of matrix‐valued functions is proposed. This class retains some of the features of the 2×2 Daniele–Khrapkov class, in particular, the presence of certain square‐root functions in its definition. Functions of this class ap

## Abstract We construct an algorithm that allows us to determine an effective canonical factorization of some non‐rational matrix‐valued functions. For those matrix‐valued functions whose entries can be represented through a innerouter factorization (when the outer function is rational) it is show

## Abstract This paper deals with what we call modified singular integral operators. When dealing with (pure) singular integral operators on the unit circle with coefficients belonging to a decomposing algebra of continuous functions it is known that a factorization of the symbol induces a factoriz