AbstractWe construct a path-connected homogeneous compactum with cellularity c that is not homeomorphic to any product of dyadic compacta and first countable compacta. We also prove some closure properties for classes of spaces defined by various connectifiability conditions. One application is that every infinite product of infinite topological sums of Ti spaces has a Ti pathwise connectification, where i∈{1,2,3,3.5}
AbstractFor every compact metrizable space X there is a metrizable compactification μ(X) of ω whose ...
[EN] Disconnectedness in topological space is analyzed to obtain Hausdorff connectifications of that...
AbstractWe show (in ZFC) that if X is a compact homogeneous Hausdorff space then |X|⩽2t(X), where t(...
AbstractWe construct a path-connected homogeneous compactum with cellularity c that is not homeomorp...
Abstract. We construct a path-connected homogenous compactum with cel-lularity c that is not homeomo...
A new category of connective spaces is defined, which includes topological spaces and simple graphs,...
AbstractA Hausdorff space X is called (countably) connectifiable if there exists a connected Hausdor...
summary:A space is called connectifiable if it can be densely embedded in a connected Hausdorff spac...
AbstractWe answer a question of Alas, Tkačenko, Tkachuk, and Wilson by constructing a metrizable spa...
AbstractA connected Hausdorff space Y is called a connectification of a space X if X can be densely ...
Families of connected spaces Adam Bartoš Abstract We deal with two completely different kinds of con...
AbstractWithin the class of Tychonoff spaces, and within the class of topological groups, most of th...
AbstractThis paper is devoted to the problem of finding those T1-spaces (Hausdorff spaces) which are...
AbstractIt is well known that no infinite homogeneous space is both compact and extremally disconnec...
AbstractA new method of constructing connected countable Hausdorff spaces is described which enables...
AbstractFor every compact metrizable space X there is a metrizable compactification μ(X) of ω whose ...
[EN] Disconnectedness in topological space is analyzed to obtain Hausdorff connectifications of that...
AbstractWe show (in ZFC) that if X is a compact homogeneous Hausdorff space then |X|⩽2t(X), where t(...
AbstractWe construct a path-connected homogeneous compactum with cellularity c that is not homeomorp...
Abstract. We construct a path-connected homogenous compactum with cel-lularity c that is not homeomo...
A new category of connective spaces is defined, which includes topological spaces and simple graphs,...
AbstractA Hausdorff space X is called (countably) connectifiable if there exists a connected Hausdor...
summary:A space is called connectifiable if it can be densely embedded in a connected Hausdorff spac...
AbstractWe answer a question of Alas, Tkačenko, Tkachuk, and Wilson by constructing a metrizable spa...
AbstractA connected Hausdorff space Y is called a connectification of a space X if X can be densely ...
Families of connected spaces Adam Bartoš Abstract We deal with two completely different kinds of con...
AbstractWithin the class of Tychonoff spaces, and within the class of topological groups, most of th...
AbstractThis paper is devoted to the problem of finding those T1-spaces (Hausdorff spaces) which are...
AbstractIt is well known that no infinite homogeneous space is both compact and extremally disconnec...
AbstractA new method of constructing connected countable Hausdorff spaces is described which enables...
AbstractFor every compact metrizable space X there is a metrizable compactification μ(X) of ω whose ...
[EN] Disconnectedness in topological space is analyzed to obtain Hausdorff connectifications of that...
AbstractWe show (in ZFC) that if X is a compact homogeneous Hausdorff space then |X|⩽2t(X), where t(...
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