Add to ORKGA family of extensions for a filter space is defined and its properties, including completeness and total boundedness, are investigated
Following N. Noble, we say that a space is subsequential if it is a subspace of a sequential space. ...
AbstractThis paper is devoted to study a special kind of extensions of dynamical systems which are i...
International audienceCompactoid and compact families generalize both convergent filters and compact...
A family of extensions for a filter space is defined and its properties, including completeness and ...
A family of extensions for a filter space is defined and its properties, including completeness and ...
The well-known completions of T2 Cauchy spaces and T2 filter spaces are extended to the completions ...
The well-known completions of T2 Cauchy spaces and T2 filter spaces are extended to the completions ...
summary:Fréchet, strongly Fréchet, productively Fréchet, weakly bisequential and bisequential filter...
All spaces considered in this paper are assumed to be Hausdorff. If A is a subset of a space X, then...
Sequences are sufficient to describe topological properties in metric spaces or, more generally, top...
In [6] characterizations of continuous maps between uniform spaces in terms of nets and filters are ...
AbstractFollowing N. Noble, we say that a space is subsequential if it is a subspace of a sequential...
The concept of a convergence tower space, or equivalently, a convergence approach space is formulate...
Countably based filter spaces have been suggested in the 1970's as a model for recursion theory on h...
AbstractLet X be a topological space and let F be a filter on N, recall that a sequence (xn)n∈N in X...
Following N. Noble, we say that a space is subsequential if it is a subspace of a sequential space. ...
AbstractThis paper is devoted to study a special kind of extensions of dynamical systems which are i...
International audienceCompactoid and compact families generalize both convergent filters and compact...
A family of extensions for a filter space is defined and its properties, including completeness and ...
A family of extensions for a filter space is defined and its properties, including completeness and ...
The well-known completions of T2 Cauchy spaces and T2 filter spaces are extended to the completions ...
The well-known completions of T2 Cauchy spaces and T2 filter spaces are extended to the completions ...
summary:Fréchet, strongly Fréchet, productively Fréchet, weakly bisequential and bisequential filter...
All spaces considered in this paper are assumed to be Hausdorff. If A is a subset of a space X, then...
Sequences are sufficient to describe topological properties in metric spaces or, more generally, top...
In [6] characterizations of continuous maps between uniform spaces in terms of nets and filters are ...
AbstractFollowing N. Noble, we say that a space is subsequential if it is a subspace of a sequential...
The concept of a convergence tower space, or equivalently, a convergence approach space is formulate...
Countably based filter spaces have been suggested in the 1970's as a model for recursion theory on h...
AbstractLet X be a topological space and let F be a filter on N, recall that a sequence (xn)n∈N in X...
Following N. Noble, we say that a space is subsequential if it is a subspace of a sequential space. ...
AbstractThis paper is devoted to study a special kind of extensions of dynamical systems which are i...
International audienceCompactoid and compact families generalize both convergent filters and compact...