dc.contributor.author
Pedersen, Thomas Vils
dc.identifier
https://ddd.uab.cat/record/1918
dc.identifier
urn:10.5565/PUBLMAT_44100_04
dc.identifier
urn:oai:ddd.uab.cat:1918
dc.identifier
urn:articleid:20144350v44n1p135
dc.identifier
urn:oai:raco.cat:article/37978
dc.identifier
urn:wos_id:000089937000004
dc.description.abstract
We prove that a homogeneous Banach space ß on the unit circle T can be embedded as a closed subspace of a dual space [Xi]*ß contained in the space of bounded Borel measures on T in such a way that the map ß --> [Xi]*ß defines a bijective correspondence between the class of homogeneous Banach spaces on T and the class of prehomogeneous Banach spaces on T. We apply our results to show that the algebra of all continuous functions on T is the only homogeneous Banach algebra on T in which every closed ideal has a bounded approximate identity with a common bound, and that the space of multipliers between two homogeneous Banach spaces is a dual space. Finally, we describe the space [Xi]*ß for some examples of homogeneous Banach spaces ß on T.
dc.format
application/pdf
dc.relation
Publicacions matemàtiques ; V. 44 N. 1 (2000), p. 135-155
dc.rights
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dc.rights
https://rightsstatements.org/vocab/InC/1.0/
dc.title
Homogenous Banach spaces on the unit circle
