Add to ORKGIdeal domains have an elementary order theoretic structure: Every element is either compact or maximal. Despite this, we establish that (1) They can model any space currently known to possess a countably based model, and (2) The metric spaces with ideal models are exactly the completely metrizable spaces
AbstractWe show that a metrizable space Y is completely metrizable if there is a continuous surjecti...
Abstract. In this paper we study the metric spaces that are definable in a polynomially bounded o-mi...
We study extensions of Wermer\u27s maximality theorem to several complex variables. We exhibit vario...
AbstractIdeal domains have an elementary order theoretic structure: Every element is either compact ...
AbstractIn this paper we try to improve the current state of understanding concerning models of spac...
AbstractIn this brief study we explicitly match the properties of spaces modelled by domains with th...
AbstractWe prove that a metric space may be realized as the set of maximal elements in a continuous ...
AbstractThe regular spaces which may be realized as the set of maximal elements in an ω-continuous d...
AbstractIn this article we show that each complete metric space is the maximal point space of a cont...
We characterise those topological spaces for which every quotient image is metrizable. This suppleme...
Ideal spaces are a very general class of normed spaces of measurable functions, which includes e.g. ...
AbstractWe show that the T1-spaces are precisely the maximal point spaces of conditionally up-comple...
AbstractA model of a space X is simply a continuous dcpo D and a homeomorphism ∅: X → max D, where m...
In this book the authors for the first time introduce a new type of topological spaces called the se...
Abstract. We show that a metrizable space Y is completely metrizable if there is a continuous surjec...
AbstractWe show that a metrizable space Y is completely metrizable if there is a continuous surjecti...
Abstract. In this paper we study the metric spaces that are definable in a polynomially bounded o-mi...
We study extensions of Wermer\u27s maximality theorem to several complex variables. We exhibit vario...
AbstractIdeal domains have an elementary order theoretic structure: Every element is either compact ...
AbstractIn this paper we try to improve the current state of understanding concerning models of spac...
AbstractIn this brief study we explicitly match the properties of spaces modelled by domains with th...
AbstractWe prove that a metric space may be realized as the set of maximal elements in a continuous ...
AbstractThe regular spaces which may be realized as the set of maximal elements in an ω-continuous d...
AbstractIn this article we show that each complete metric space is the maximal point space of a cont...
We characterise those topological spaces for which every quotient image is metrizable. This suppleme...
Ideal spaces are a very general class of normed spaces of measurable functions, which includes e.g. ...
AbstractWe show that the T1-spaces are precisely the maximal point spaces of conditionally up-comple...
AbstractA model of a space X is simply a continuous dcpo D and a homeomorphism ∅: X → max D, where m...
In this book the authors for the first time introduce a new type of topological spaces called the se...
Abstract. We show that a metrizable space Y is completely metrizable if there is a continuous surjec...
AbstractWe show that a metrizable space Y is completely metrizable if there is a continuous surjecti...
Abstract. In this paper we study the metric spaces that are definable in a polynomially bounded o-mi...
We study extensions of Wermer\u27s maximality theorem to several complex variables. We exhibit vario...