2007
DOI: 10.1007/s11785-007-0022-1
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Ersatz Commutant Lifting with Test Functions

Abstract: This note presents a commutant lifting theorem (CLT) with initial data a finite set of (test) functions and a compatible reproducing kernel k on a set X. This covers the CLT of Ball, Li, Timotin, and Trent [9] for the polydisc, but in general no analyticity is required, rather statements and proofs use the language and techniques of reproducing kernel Hilbert spaces. Uniqueness of the de Branges-Rovnyak construction like found in Agler [1] and Ambrozie, Englis, and Müller [5] and an abstract Beurling Theorem i… Show more

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Cited by 6 publications
(9 citation statements)
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“…Note that Q diag (z) is the special case of this where each d k = 1. One can also see the ideas of [2] as influencing the test-function approach of Dritschel-McCullough and collaborators, originating in [36,37] with followup work in [59,39,50,22].…”
Section: Agler Decomposition and Transfer-function Realization For Ncmentioning
confidence: 99%
“…Note that Q diag (z) is the special case of this where each d k = 1. One can also see the ideas of [2] as influencing the test-function approach of Dritschel-McCullough and collaborators, originating in [36,37] with followup work in [59,39,50,22].…”
Section: Agler Decomposition and Transfer-function Realization For Ncmentioning
confidence: 99%
“…The lurking isometry in turn generates the Ψ-unitary colligation. A good deal of effort is required to show that the resulting transfer function solves the problem and the argument given here is patterned after that in [29], which in turn borrowed from [11,14] and closely related to those in [3].…”
Section: The Factorization and Lurking Isometrymentioning
confidence: 99%
“…Ambrozie and Eschmeier [3] establish a related CLT for the unit ball in C n . In [29] we establish a generalization of these results to the case of a finite collection Ψ together with a distinguished reproducing kernel Hilbert space H 2 (k), unlocking the prior tight connection between the coordinate (test) functions {z 1 , . .…”
Section: Introductionmentioning
confidence: 98%
See 1 more Smart Citation
“…There is yet another generalized theory of Schur class (or, more precisely, Schur-Agler class) and Nevanlinna-Pick interpolation where one defines a Schur class starting from a family of test functions (see [41,43,59] and see also [6,Chapter 13] for an introduction to this approach). It is well appreciated that the Agler theory for the polydisk is an example for this theory (indeed, this is the motivating example); precise specification of what other examples can be covered, such as the higher rank graph algebras of [57] and the Hardy algebras associated with product decompositions along semigroups more general than Z (see [88]), is an ongoing area of investigation [15].…”
Section: Introductionmentioning
confidence: 99%