Stable isomorphism of dual operator spaces


Autoria(s): Eleftherakis, G.; Paulsen, V.I.; Todorov, Ivan
Data(s)

01/01/2010

Resumo

We prove that two dual operator spaces $X$ and $Y$ are stably isomorphic if and only if there exist completely isometric normal representations $phi$ and $psi$ of $X$ and $Y$, respectively, and ternary rings of operators $M_1, M_2$ such that $phi (X)= [M_2^*psi (Y)M_1]^{-w^*}$ and $psi (Y)=[M_2phi (X)M_1^*].$ We prove that this is equivalent to certain canonical dual operator algebras associated with the operator spaces being stably isomorphic. We apply these operator space results to prove that certain dual operator algebras are stably isomorphic if and only if they are isomorphic. We provide examples motivated by CSL algebra theory.

Formato

application/pdf

Identificador

http://pure.qub.ac.uk/portal/en/publications/stable-isomorphism-of-dual-operator-spaces(99406bdb-e669-4965-ab73-b4e8351bc1b2).html

http://pure.qub.ac.uk/ws/files/631984/YJFAN5637%5B1%5D.pdf

http://www.scopus.com/inward/record.url?scp=70350406392&partnerID=8YFLogxK

Idioma(s)

eng

Direitos

info:eu-repo/semantics/restrictedAccess

Fonte

Eleftherakis , G , Paulsen , V I & Todorov , I 2010 , ' Stable isomorphism of dual operator spaces ' Journal of Functional Analysis , vol 258 , no. 1 , pp. 260-278 .

Palavras-Chave #/dk/atira/pure/subjectarea/asjc/2600/2603 #Analysis
Tipo

article