On the Isomorphism Question for Complete Pick Multiplier Algebras

Matt Kerr; John E. McCarthy; Orr Moshe Shalit

doi:10.1007/s00020-013-2048-2

On the Isomorphism Question for Complete Pick Multiplier Algebras

Matt Kerr, John E. McCarthy, Orr Moshe Shalit

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

11 Scopus citations

Abstract

Every multiplier algebra of an irreducible complete Pick kernel arises as the restriction algebra M_V = {f{pipe}_V: f ∈ M_d}, where d is some integer or ∞, M_d is the multiplier algebra of the Drury-Arveson space H_d², and V is a subvariety of the unit ball. For finite dimensional d it is known that, under mild assumptions, every isomorphism between two such algebras M_V and M_W is induced by a biholomorphism between W and V. In this paper we consider the converse, and obtain positive results in two directions. The first deals with the case where V is the proper image of a finite Riemann surface. The second deals with the case where V is a disjoint union of varieties.

Original language	English
Pages (from-to)	39-53
Number of pages	15
Journal	Integral Equations and Operator Theory
Volume	76
Issue number	1
DOIs	https://doi.org/10.1007/s00020-013-2048-2
State	Published - 1 May 2013

ASJC Scopus subject areas

Analysis
Algebra and Number Theory

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abstract = "Every multiplier algebra of an irreducible complete Pick kernel arises as the restriction algebra MV = {f{pipe}V: f ∈ Md}, where d is some integer or ∞, Md is the multiplier algebra of the Drury-Arveson space Hd2, and V is a subvariety of the unit ball. For finite dimensional d it is known that, under mild assumptions, every isomorphism between two such algebras MV and MW is induced by a biholomorphism between W and V. In this paper we consider the converse, and obtain positive results in two directions. The first deals with the case where V is the proper image of a finite Riemann surface. The second deals with the case where V is a disjoint union of varieties.",

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N2 - Every multiplier algebra of an irreducible complete Pick kernel arises as the restriction algebra MV = {f{pipe}V: f ∈ Md}, where d is some integer or ∞, Md is the multiplier algebra of the Drury-Arveson space Hd2, and V is a subvariety of the unit ball. For finite dimensional d it is known that, under mild assumptions, every isomorphism between two such algebras MV and MW is induced by a biholomorphism between W and V. In this paper we consider the converse, and obtain positive results in two directions. The first deals with the case where V is the proper image of a finite Riemann surface. The second deals with the case where V is a disjoint union of varieties.

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On the Isomorphism Question for Complete Pick Multiplier Algebras

Abstract

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