The (D) Property in Banach Spaces
Copyright policy )The (D) Property in Banach Spaces
A Banach space E is said to have (D) property if every bounded linear operator T : F → E* is weakly compact for every Banach space F whose dual does not contain an isomorphic copy of l∞. Studying this property in connection with other geometric properties, we show that every Banach space whose dual has (V∗) property of Pełczyński (and hence every Banach space with (V) property) has (D) property. We show that the space L1(v) of real functions, which are integrable with respect to a measure v with values in a Banach space X, has (D) property. We give some other results concerning Banach spaces with (D) property.
- Erciyes University Turkey
Isomorphic theory (including renorming) of Banach spaces, \((D)\) property, property \((V^{\ast})\), QA1-939, property \((V)\), Mathematics
Isomorphic theory (including renorming) of Banach spaces, \((D)\) property, property \((V^{\ast})\), QA1-939, property \((V)\), Mathematics
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