Extraction of subsequences in Banach spaces.
Jesús M. Fernández Castillo (1992)
Extracta Mathematicae
Similarity:
Displaying similar documents to “Remarks on the weak-polynomial convergence on a Banach space.”
Extraction of subsequences in Banach spaces.
Algebras of real analytic functions; homorphisms and bounding sets.
P. Biström, J. A. Jaramillo, M. Lindström (1993)
Extracta Mathematicae
Similarity:
In this paper weare interested in subsets of a real Banach space on which different classes of functions are bounded.
Drop property equals reflexivity
V. Montesinos (1987)
Studia Mathematica
Similarity:
On the Gelfand-Phillips property in Banach spaces with PRI.
D. P. Sinha, K. K. Arora (1997)
Collectanea Mathematica
Similarity:
Weakly uniformly rotund Banach spaces
Aníbal Moltó, Vicente Montesinos, José Orihuela, Stanimir L. Troyanski (1998)
Commentationes Mathematicae Universitatis Carolinae
Similarity:
The dual space of a WUR Banach space is weakly K-analytic.
Polynomial characterizations of Banach spaces not containing l.
Joaquín M. Gutiérrez (1991)
Extracta Mathematicae
Similarity:
Many properties of Banach spaces can be given in terms of (linear bounded) operators. It is natural to ask if they can also be formulated in terms of polynomial, holomorphic and continuous mappings. In this note we deal with Banach spaces not containing an isomorphic copy of l, the space of absolutely summable sequences of scalars.
An approach to Schreier's space.
Jesús M. Fernández Castillo, Manuel González (1991)
Extracta Mathematicae
Similarity:
In 1930, J. Schreier [10] introduced the notion of admissibility in order to show that the now called weak-Banach-Saks property does not hold in every Banach space. A variation of this idea produced the Schreier's space (see [1],[2]). This is the space obtained by completion of the space of finite sequences with respect to the following norm: ||x||S = sup(A admissible) ∑j ∈ A |xj|, ...