Grothendieck spaces and duals of injective tensor products

P. Domański; M. Lindström

doi:10.1112/blms/28.6.617

Grothendieck spaces and duals of injective tensor products

P. Domański
, M. Lindström

Matematiikka

Tutkimustuotos: Lehtiartikkeli › Artikkeli › Tieteellinen › vertaisarvioitu

6 Sitaatiot (Scopus)

Abstrakti

Let E and F be Fréchet spaces. We prove that if E is reflexive, then the strong bidual (E ⊗̂εF)″b is a topological subspace of Lb(E′b, F″b). We also prove that if, moreover, E is Montel and F has the Grothendieck property, then E ⊗̂εF has the Grothendieck property whenever either E or F″b has the approximation property. A similar result is obtained for the property of containing no complemented copy of c0.

Alkuperäiskieli	Ruotsi
Sivut	617-626
Sivumäärä	10
Julkaisu	Bulletin of the London Mathematical Society
Vuosikerta	28
Numero	6
DOI - pysyväislinkit	https://doi.org/10.1112/blms/28.6.617
Tila	Julkaistu - 1996
OKM-julkaisutyyppi	A1 Julkaistu artikkeli, soviteltu

Pääsy asiakirjaan

10.1112/blms/28.6.617

Muut tiedostot ja linkit

https://www.mendeley.com/catalogue/f4457c28-dbd4-386c-bb89-e006001556f3/

Viittausmuodot

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abstract = "Let E and F be Fr{\'e}chet spaces. We prove that if E is reflexive, then the strong bidual (E {\^⊗}εF)″b is a topological subspace of Lb(E′b, F″b). We also prove that if, moreover, E is Montel and F has the Grothendieck property, then E {\^⊗}εF has the Grothendieck property whenever either E or F″b has the approximation property. A similar result is obtained for the property of containing no complemented copy of c0.",

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AU - Lindström, M.

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AB - Let E and F be Fréchet spaces. We prove that if E is reflexive, then the strong bidual (E ⊗̂εF)″b is a topological subspace of Lb(E′b, F″b). We also prove that if, moreover, E is Montel and F has the Grothendieck property, then E ⊗̂εF has the Grothendieck property whenever either E or F″b has the approximation property. A similar result is obtained for the property of containing no complemented copy of c0.

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