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On the Nevanlinna problem: Characterization of all Schur–Agler class solutions affiliated with a given kernel

Bhattacharyya, T and Biswas, A and Chandel, VS (2020) On the Nevanlinna problem: Characterization of all Schur–Agler class solutions affiliated with a given kernel. In: Studia Mathematica, 255 (1). pp. 83-107.

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Official URL: https://doi.org/10.4064/sm190505-8-10

Abstract

Given a domain Ω in Cm, and finite sets of points z1, . . ., zn ∈ Ω and w1, . . ., wn ∈ D (the open unit disc in the complex_ plane), the Pick interpolation problem asks when there is a holomorphic function f : Ω → D such that f(zi) = wi, 1 ≤ i ≤ n. Pick gave a condition on the data {zi, wi : 1 ≤ i ≤ n} for such an interpolant to exist if Ω = D. Nevanlinna characterized all possible functions f that interpolate the data. We generalize Nevanlinna’s result to a domain Ω in Cm admitting holomorphic test functions when the function f comes from the Schur–Agler class and is affiliated with a certain completely positive kernel. The success of the theory lies in characterizing the Schur–Agler class interpolating functions for three domains—the bidisc, the symmetrized bidisc and the annulus—which are affiliated to given kernels.

Item Type: Journal Article
Publication: Studia Mathematica
Publisher: Institute of Mathematics. Polish Academy of Sciences
Additional Information: The copyright for this article belongs to the Authors.
Keywords: Colligation; Nevanlinna problem; Schur–Agler class; Several complex variables; Test function
Department/Centre: Division of Physical & Mathematical Sciences > Mathematics
Date Deposited: 23 Jan 2023 11:54
Last Modified: 23 Jan 2023 11:54
URI: https://eprints.iisc.ac.in/id/eprint/79285

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