Uniform factorization for compact sets of operators

R. Aron; M. Lindström; W. M. Ruess; R. Ryan

doi:10.1090/s0002-9939-99-04619-5

Uniform factorization for compact sets of operators

R. Aron^*
, M. Lindström
, W. M. Ruess
, R. Ryan

^*Korresponderande författare för detta arbete

Matematik

Forskningsoutput: Tidskriftsbidrag › Artikel › Vetenskaplig › Peer review

9 Citeringar (Scopus)

Sammanfattning

We prove a factorization result for relatively compact subsets of compact operators using the Bartle and Graves Selection Theorem, a characterization of relatively compact subsets of tensor products due to Grothendieck, and results of Figiel and Johnson on factorization of compact operators. A further proof, essentially based on the Banach-Dieudonné Theorem, is included. Our methods enable us to give an easier proof of a result of W.H. Graves and W.M. Ruess.

Originalspråk	Engelska
Sidor (från-till)	1119-1125
Antal sidor	7
Tidskrift	Proceedings of the American Mathematical Society
Volym	127
Nummer	4
DOI	https://doi.org/10.1090/s0002-9939-99-04619-5
Status	Publicerad - 1999
MoE-publikationstyp	A1 Tidskriftsartikel-refererad

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title = "Uniform factorization for compact sets of operators",

abstract = "We prove a factorization result for relatively compact subsets of compact operators using the Bartle and Graves Selection Theorem, a characterization of relatively compact subsets of tensor products due to Grothendieck, and results of Figiel and Johnson on factorization of compact operators. A further proof, essentially based on the Banach-Dieudonn{\'e} Theorem, is included. Our methods enable us to give an easier proof of a result of W.H. Graves and W.M. Ruess.",

keywords = "Banach spaces, Banach-Dieudonn{\'e}, Compact factorization, Michael's selection theorem, Tensor products, Theorem",

author = "R. Aron and M. Lindstr{\"o}m and Ruess, \{W. M.\} and R. Ryan",

year = "1999",

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T1 - Uniform factorization for compact sets of operators

AU - Aron, R.

AU - Lindström, M.

AU - Ruess, W. M.

AU - Ryan, R.

PY - 1999

Y1 - 1999

N2 - We prove a factorization result for relatively compact subsets of compact operators using the Bartle and Graves Selection Theorem, a characterization of relatively compact subsets of tensor products due to Grothendieck, and results of Figiel and Johnson on factorization of compact operators. A further proof, essentially based on the Banach-Dieudonné Theorem, is included. Our methods enable us to give an easier proof of a result of W.H. Graves and W.M. Ruess.

AB - We prove a factorization result for relatively compact subsets of compact operators using the Bartle and Graves Selection Theorem, a characterization of relatively compact subsets of tensor products due to Grothendieck, and results of Figiel and Johnson on factorization of compact operators. A further proof, essentially based on the Banach-Dieudonné Theorem, is included. Our methods enable us to give an easier proof of a result of W.H. Graves and W.M. Ruess.

KW - Banach spaces

KW - Banach-Dieudonné

KW - Compact factorization

KW - Michael's selection theorem

KW - Tensor products

KW - Theorem

UR - https://www.scopus.com/pages/publications/22644452053

U2 - 10.1090/s0002-9939-99-04619-5

DO - 10.1090/s0002-9939-99-04619-5

M3 - Article

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VL - 127

SP - 1119

EP - 1125

JO - Proceedings of the American Mathematical Society

JF - Proceedings of the American Mathematical Society

IS - 4

ER -

Uniform factorization for compact sets of operators

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