Abstract Interpolation Problem and Some Applications. II: Coefficient Matrices

  • A. KheifetsEmail author
Part of the Operator Theory: Advances and Applications book series (OT, volume 272)


The main content of this paper is Lectures 5 and 6 that continue lecture notes [20]. Content of Lectures 1–4 of [20] is reviewed for the reader’s convenience in Sections 1–4, respectively. It is shown in Lecture 5 how residual parts of the minimal unitary extensions, that correspond to solutions of the problem, yield some boundary properties of the coefficient matrix-function. These results generalize the classical Nevanlinna–Adamjan–Arov–Kreĭn theorem. Lecture 6 discusses how further properties of the coefficient matrices follow from denseness of certain sets in the associated function model spaces. The structure of the dense set reflects the structure of the problem data.


Isometry minimal unitary extension residual part de Branges–Rovnyak function space dense set coefficient matrix 

Mathematics Subject Classification (2010)

47A20 47A57 30E05 


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Copyright information

© Springer Nature Switzerland AG 2019

Authors and Affiliations

  1. 1.Department of Mathematical SciencesUniversity of Massachusetts LowellLowellUSA

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