In this paper we present a method to obtain Banach spaces of universal and
almost-universal disposition with respect to a given class $\mathfrak M$ of
normed spaces. The method produces, among other, the Gurari\u{\i} space
$\mathcal G$ (the only separable Banach space of almost-universal disposition
with respect to the class $\mathfrak F$ of finite dimensional spaces), or the
Kubis space $\mathcal K$ (under {\sf CH}, the only Banach space with the
density character the continuum which is of universal disposition with respect
to the class $\mathfrak S$ of separable spaces). We moreover show that
$\mathcal K$ is not isomorphic to a subspace of any $C(K)$-space -- which
provides a partial answer to the injective space problem-- and that --under
{\sf CH}-- it is isomorphic to an ultrapower of the Gurari\u{\i} space.
We study further properties of spaces of universal disposition: separable
injectivity, partially automorphic character and uniqueness properties
Abstract. In this paper we deal with two weaker forms of injectivity which turn out to have a rich structure behind: separable injectivity and universal separable injectivity. We show several structural and stability properties of these classes of Banach spaces. We provide natural examples of (universally) separably injective spaces, including L∞ ultraproducts built over countably incomplete ultrafilters, in spite of the fact that these ultraproducts are never injective. We obtain two fundamental characterizations of universally separably injective spaces: a) A Banach space E is universally separably injective if and only if every separable subspace is contained in a copy of ℓ∞ inside E. b) A Banach space E is universally separably injective if and only if for every separable space S one has Ext(ℓ∞/S, E) = 0. The final Section of the paper focuses on special properties of 1-separably injective spaces. Lindenstrauss obtained in the middle sixties a result that can be understood as a proof that, under the continuum hypothesis, 1-separably injective spaces are 1-universally separably injective; he left open the question in ZFC. We construct a consistent example of a Banach space of type C(K) which is 1-separably injective but not 1-universally separably injective.
The free Banach lattice over a Banach space is introduced and analyzed. This generalizes the concept of free Banach lattice over a set of generators, and allows us to study the Nakano property and the density character of non-degenerate intervals on these spaces, answering some recent questions of B. de Pagter and A.W. Wickstead. Moreover, an example of a Banach lattice which is weakly compactly generated as a lattice but not as a Banach space is exhibited, thus answering a question of J. Diestel.
We study a higher-dimensional version of the standard notion of a gap formed by a finite sequence of ideals of the quotient algebra P(ω)/f in. We examine different types of such objects found in P(ω)/f in both from the combinatorial and the descriptive set-theoretic side.
Abstract. We introduce the class of slicely countably determined Banach spaces which contains in particular all spaces with the Radon-Nikodým property and all spaces without copies of 1 . We present many examples and several properties of this class. We give some applications to Banach spaces with the Daugavet and the alternative Daugavet properties, lush spaces and Banach spaces with numerical index 1. In particular, we show that the dual of a real infinite-dimensional Banach space with the alternative Daugavet property contains 1 and that operators which do not fix copies of 1 on a space with the alternative Daugavet property satisfy the alternative Daugavet equation.
We construct a continuous image of a Radon-Nikodým compact space which is not Radon-Nikodým compact, solving the problem posed in the 80ties by Isaac Namioka.
Under the assumption that c is a regular cardinal, we prove the existence and uniqueness of a Boolean algebra B of size c defined by sharing the main structural properties that P(ω)/f in has under CH and in the ℵ 2 -Cohen model. We prove a similar result in the category of Banach spaces.
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