summary:A convergence structure generalizing the order convergence structure on the set of Hausdorff continuous interval functions is defined on the set of minimal usco maps. The properties of the obtained convergence space are investigated and essential links with the pointwise convergence and the order convergence are revealed. The convergence structure can be extended to a uniform convergence structure so that the convergence space is complete. The important issue of the denseness of the subset of all continuous functions is also addressed
In this talk we wish to present ultrafilter characterisations of special classes of continuous maps ...
AbstractLet X be a bounded subset of the real line and let Y be a metric space. In the function spac...
Let X be a bounded subset of the real line and let Y be a metric space. In the function space C(X, Y...
summary:A convergence structure generalizing the order convergence structure on the set of Hausdorff...
This paper brings together three concepts which have not been related so far, namely, the concept of...
summary:We investigate Baire-one functions whose graph is contained in the graph of a usco mapping. ...
The aim of this paper is to set up appropriate uniform convergence spaces in which to reformulate an...
summary:The local coincidence of the Hausdorff topology and the uniform convergence topology on the ...
summary:We prove that any Baire-one usco-bounded function from a metric space to a closed convex sub...
Abstract. The note contains two examples of function spaces Cp(X) endowed with the pointwise topolog...
AbstractIf X and Y are topological spaces and {fn: nϵD} is a net of function on X into Y, we see tha...
The textbook is an alternative to a classical introductory book in point-set topology. The approach,...
This paper studies two topologies on the set of all continuous real-valued functions on a Tychonoff ...
Let X and Y be topological space and F(X,Y) the set of all functions from X into Y. We study various...
A convergence function is a correspondence between the filters on a given set S and the subsets of S...
In this talk we wish to present ultrafilter characterisations of special classes of continuous maps ...
AbstractLet X be a bounded subset of the real line and let Y be a metric space. In the function spac...
Let X be a bounded subset of the real line and let Y be a metric space. In the function space C(X, Y...
summary:A convergence structure generalizing the order convergence structure on the set of Hausdorff...
This paper brings together three concepts which have not been related so far, namely, the concept of...
summary:We investigate Baire-one functions whose graph is contained in the graph of a usco mapping. ...
The aim of this paper is to set up appropriate uniform convergence spaces in which to reformulate an...
summary:The local coincidence of the Hausdorff topology and the uniform convergence topology on the ...
summary:We prove that any Baire-one usco-bounded function from a metric space to a closed convex sub...
Abstract. The note contains two examples of function spaces Cp(X) endowed with the pointwise topolog...
AbstractIf X and Y are topological spaces and {fn: nϵD} is a net of function on X into Y, we see tha...
The textbook is an alternative to a classical introductory book in point-set topology. The approach,...
This paper studies two topologies on the set of all continuous real-valued functions on a Tychonoff ...
Let X and Y be topological space and F(X,Y) the set of all functions from X into Y. We study various...
A convergence function is a correspondence between the filters on a given set S and the subsets of S...
In this talk we wish to present ultrafilter characterisations of special classes of continuous maps ...
AbstractLet X be a bounded subset of the real line and let Y be a metric space. In the function spac...
Let X be a bounded subset of the real line and let Y be a metric space. In the function space C(X, Y...