On certain topological properties of completions of functional spaces with respect to Hausdorff uniformity (Q1179660)

The space of mappings \(X\to Y\) is embedded in \(\exp(X\times Y)\) by associating to each function its graph. This enables one to apply on the space of functions certain concepts, which are connected with the ``exponent'', that is done in the paper under review. Here is considered the case of the compact space \(X\) and \(Y\) being either the interval or the two-point space. Described are the completions of the spaces of continuous functions, and estimates of their topological properties are given, too.