Hilbert modules over operator algebras /

Hilbert modules over operator algebras /

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Bibliographic Details
Author / Creator:	Muhly, Paul S.
Imprint:	Providence, RI : American Mathematical Society, 1995.
Description:	viii, 53 p. ill. ; 26 cm.
Language:	English
Series:	Memoirs of the American Mathematical Society no. 559
Subject:	Hilbert modules. Operator algebras. Hilbert modules. Operator algebras.
Format:	Print Book
URL for this record:	http://pi.lib.uchicago.edu/1001/cat/bib/2330019

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Other authors / contributors:	Solel, Baruch, 1952-
ISBN:	0821803468
Notes:	"September 1995, volume 117, number 559 (second of 5 numbers)." Includes bibliographical references.

Description
Summary:	This book gives a general systematic analysis of the notions of ``projectivity'' and ``injectivity'' in the context of Hilbert modules over operator algebras. A Hilbert module over an operator algebra $A$ is simply the Hilbert space of a (contractive) representation of $A$ viewed as a module over $A$ in the usual way. In this work, Muhly and Solel introduce various notions of projective Hilbert modules and use them to investigate dilation and commutant lifting problems over certain infinite dimensional analogues of incidence algebras. The authors prove that commutant lifting holds for such an algebra if and only if the pattern indexing the algebra is a ``tree'' in the sense of computer directories.
Item Description:	"September 1995, volume 117, number 559 (second of 5 numbers)."
Physical Description:	viii, 53 p. ill. ; 26 cm.
Bibliography:	Includes bibliographical references.
ISBN:	0821803468