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We show that as soon as $c_{0}$ embeds complementably into the space of all weakly compact operators from $X$ to $Y$ , then it must live either in $X^{*}$ or in $Y$ .

On complemented copies of c₀(ω₁) in C(Kⁿ) spaces

Leandro Candido, Piotr Koszmider (2016)

Studia Mathematica

Given a compact Hausdorff space K we consider the Banach space of real continuous functions C(Kⁿ) or equivalently the n-fold injective tensor product $\otimes ̂_{ε}^{n} C (K)$ or the Banach space of vector valued continuous functions C(K,C(K,C(K...,C(K)...). We address the question of the existence of complemented copies of c₀(ω₁) in $\otimes ̂_{ε}^{n} C (K)$ under the hypothesis that C(K) contains such a copy. This is related to the results of E. Saab and P. Saab that $X \otimes ̂_{ε} Y$ contains a complemented copy of c₀ if one of the infinite-dimensional Banach...

On complemented subspaces of rearrangement invariant function spaces.

Yves Raynaud (1993)

Collectanea Mathematica

A necessary and sufficient condition is given for a rearrangement invariant function space to contain a complemented isomorphic copy of l1(l2).

On copies of $c_{0}$ in the bounded linear operator space

Juan Carlos Ferrando, J. M. Amigó (2000)

Czechoslovak Mathematical Journal

In this note we study some properties concerning certain copies of the classic Banach space $c_{0}$ in the Banach space $ℒ (X, Y)$ of all bounded linear operators between a normed space $X$ and a Banach space $Y$ equipped with the norm of the uniform convergence of operators.

On copies of c0 in some function spaces.

J.C. Ferrando (2009)

RACSAM

On decompositions of Banach spaces into a sum of operator ranges

V. Fonf, V. Shevchik (1999)

Studia Mathematica

It is proved that a separable Banach space X admits a representation $X = X_{1} + X_{2}$ as a sum (not necessarily direct) of two infinite-codimensional closed subspaces $X_{1}$ and $X_{2}$ if and only if it admits a representation $X = A_{1} (Y_{1}) + A_{2} (Y_{2})$ as a sum (not necessarily direct) of two infinite-codimensional operator ranges. Suppose that a separable Banach space X admits a representation as above. Then it admits a representation $X = T_{1} (Z_{1}) + T_{2} (Z_{2})$ such that neither of the operator ranges $T_{1} (Z_{1})$ , $T_{2} (Z_{2})$ contains an infinite-dimensional closed subspace if and only...

On embedding l1 as a complemented subspace of Orlicz vector valued function spaces.

Fernando Bombal Gordón (1988)

Revista Matemática de la Universidad Complutense de Madrid

Several conditions are given under which l1 embeds as a complemented subspace of a Banach space E if it embeds as a complemented subspace of an Orlicz space of E-valued functions. Previous results in Pisier (1978) and Bombal (1987) are extended in this way.

On embeddings of C₀(K) spaces into C₀(L,X) spaces

Leandro Candido (2016)

Studia Mathematica

For a locally compact Hausdorff space K and a Banach space X let C₀(K, X) denote the space of all continuous functions f:K → X which vanish at infinity, equipped with the supremum norm. If X is the scalar field, we denote C₀(K, X) simply by C₀(K). We prove that for locally compact Hausdorff spaces K and L and for a Banach space X containing no copy of c₀, if there is an isomorphic embedding of C₀(K) into C₀(L,X), then either K is finite or |K| ≤ |L|. As a consequence, if there is an isomorphic embedding...

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Obstacles to bounded recovery.

On a direct decomposition of the space $ℒ_{p} (Ω)$ .

On a semigroup of modular functions with involution.

On Banach Spaces with the Gelfand-Philips Property.

On Banach spaces X such that L(Lp,X) = K(Lp,X).

On bases, compactness and weak convergence in the Banach space $A_{p}$

On basic Hahn-Banach extensions

On Compactness in L...(..., X) in the Weak Topology and in the Topology ...(L...(..., X), L...(..., X')).

On complemented copies of $c_{0}$ in spaces of operators, II

On complemented copies of c₀(ω₁) in C(Kⁿ) spaces

On complemented subspaces of rearrangement invariant function spaces.

On copies of $c_{0}$ in the bounded linear operator space

On copies of c0 in some function spaces.

On decompositions of Banach spaces into a sum of operator ranges

On embedding l1 as a complemented subspace of Orlicz vector valued function spaces.

On embeddings of C₀(K) spaces into C₀(L,X) spaces

On essentially incomparable Banach spaces.

On inclusion relations between Lorentz sequence spaces and inequalities of Lewis type.

On Incomparability of Banach Spaces.

On incomparability of Banach spaces.

Currently displaying 1 – 20 of 70