Show simple item record

dc.contributor.advisorTimoney, Richard
dc.contributor.authorMcConnell, David
dc.date.accessioned2017-06-01T15:10:40Z
dc.date.available2017-06-01T15:10:40Z
dc.date.issued2015
dc.identifier.citationDavid McConnell, 'Cₒ(X)-structure in C*-algebras, multiplier algebras and tensor products', [thesis], Trinity College (Dublin, Ireland). School of Mathematics, 2015, pp 169
dc.identifier.otherTHESIS 10508
dc.identifier.urihttp://hdl.handle.net/2262/80336
dc.description.abstractWe begin in Chapter 2 with an introduction to the various notions of a bundle of C*-algebras that have appeared throughout the literature, and clarify the definitions of upper- and lower-semicontinuous C*-bundles not explicitly defined in a formal way elsewhere. The definition of C0(X)-algebra, introduced by Kasparov [38], and its relation to C*-bundles is discussed in this chapter also. The purpose of this chapter is to bring together concepts that we will refer to in subsequent sections and which are described using various notations by different authors. Most of this is implicitly understood elsewhere, though Theorem 2.3.12, relating sub-modules of C0(X)-modules and subbundles of C*-bundles, is a new result.
dc.format1 volume
dc.language.isoen
dc.publisherTrinity College (Dublin, Ireland). School of Mathematics
dc.relation.isversionofhttp://stella.catalogue.tcd.ie/iii/encore/record/C__Rb16099843
dc.subjectMathematics, Ph.D.
dc.subjectPh.D. Trinity College Dublin
dc.titleCₒ(X)-structure in C*-algebras, multiplier algebras and tensor products
dc.typethesis
dc.type.supercollectionthesis_dissertations
dc.type.supercollectionrefereed_publications
dc.type.qualificationlevelDoctoral
dc.type.qualificationnameDoctor of Philosophy (Ph.D.)
dc.rights.ecaccessrightsopenAccess
dc.format.extentpaginationpp 169
dc.description.noteTARA (Trinity’s Access to Research Archive) has a robust takedown policy. Please contact us if you have any concerns: rssadmin@tcd.ie


Files in this item

Thumbnail

This item appears in the following Collection(s)

Show simple item record