We construct under the Continuum Hypothesis an example of a compact space no finite power of which contains an infinite closed subset that is of finite dimension greater than 0. This is a partial answer to a question of the third author. © 2006 Elsevier B.V. All rights reserved
AbstractThe Menger Property is a classical covering counterpart to σ-compactness. Assuming the Conti...
We characterize exactly the compactness properties of the product of κ copies of the spac...
AbstractWe construct two examples the first of which is a Lindelöf, separable and strongly zero- dim...
We construct under the Continuum Hypothesis an example of a compact space no finite power of which c...
We construct under the Continuum Hypothesis an example of a compact space no finite power of which c...
AbstractWe construct under the Continuum Hypothesis an example of a compact space no finite power of...
We introduce a continuum of dimensions which are 'intermediate' between the familiar Hausdorff and b...
Assuming the continuum hypothesis we give an example of a completely regular space F without any den...
We introduce a family of dimensions, which we call the Φ-intermediate dimensions, that lie between t...
This article surveys the θ-intermediate dimensions that were introduced recently which provide a par...
AbstractP. Roy introduced the space Δ as an example of a metric space satisfying ind X−0, dim X >. I...
AbstractUsing the continuum hypothesis, we give a counterexample for the following problem posed by ...
AbstractWe produce, for each n > 0, a subspace Xn of R2n + 1 which does not embed in R2n and whose s...
Abstract. A continuum is a compact, connected, metric space. It is said that a continuum X is zero-d...
AbstractWe construct a family of Hausdorff spaces such that every finite product of spaces in the fa...
AbstractThe Menger Property is a classical covering counterpart to σ-compactness. Assuming the Conti...
We characterize exactly the compactness properties of the product of κ copies of the spac...
AbstractWe construct two examples the first of which is a Lindelöf, separable and strongly zero- dim...
We construct under the Continuum Hypothesis an example of a compact space no finite power of which c...
We construct under the Continuum Hypothesis an example of a compact space no finite power of which c...
AbstractWe construct under the Continuum Hypothesis an example of a compact space no finite power of...
We introduce a continuum of dimensions which are 'intermediate' between the familiar Hausdorff and b...
Assuming the continuum hypothesis we give an example of a completely regular space F without any den...
We introduce a family of dimensions, which we call the Φ-intermediate dimensions, that lie between t...
This article surveys the θ-intermediate dimensions that were introduced recently which provide a par...
AbstractP. Roy introduced the space Δ as an example of a metric space satisfying ind X−0, dim X >. I...
AbstractUsing the continuum hypothesis, we give a counterexample for the following problem posed by ...
AbstractWe produce, for each n > 0, a subspace Xn of R2n + 1 which does not embed in R2n and whose s...
Abstract. A continuum is a compact, connected, metric space. It is said that a continuum X is zero-d...
AbstractWe construct a family of Hausdorff spaces such that every finite product of spaces in the fa...
AbstractThe Menger Property is a classical covering counterpart to σ-compactness. Assuming the Conti...
We characterize exactly the compactness properties of the product of κ copies of the spac...
AbstractWe construct two examples the first of which is a Lindelöf, separable and strongly zero- dim...