2-summing operators on \(C([0, 1], l_p\)) with values in \(l_{1}\)
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Publication:841203
DOI10.1007/s12044-009-0022-3zbMath1181.47018OpenAlexW2018675130MaRDI QIDQ841203
Publication date: 14 September 2009
Published in: Proceedings of the Indian Academy of Sciences. Mathematical Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s12044-009-0022-3
Related Items (3)
Operator-valued operators that are associated to vector-valued operators ⋮ Absolutely \((r,q)\)-summing operators on vector-valued function spaces ⋮ Remarks on multiple summing operators on \(C(\Omega)\)-spaces
Cites Work
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- Examples of summing, integral and nuclear operators on the space \(C([0,1,X)\) with values in \(C_{0}\)]
- \((r,p)\)-absolutely summing operators on the space \(C(T,X)\) and applications.
- 2-absolutely summing operators on the space \(C(T,X)\)
- Measures with bounded variation with respect to a normed ideal of operators and applications
- Linear bounded transformation on the space of continuous functions
- Integral Operators on Spaces of Continuous Vector-Valued Functions
- p-Summing operators on injective tensor products of spaces
- Diagonal mappings between sequence spaces
- Linear Operators and Vector Measures
- Diagonal Nuclear Operators on l p Spaces
- On representation of linear operators on $C_0(T,{\bf X})$
- Absolutely Summing and Dominated Operators on Spaces of Vector-Valued Continuous Functions
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