Pseudocompact topological groups and their properties

We investigate, when a topological group G is pseudocompact at infinity, that is, when bG \ G is pseudocompact, for each compactification bG of G. It is established that if G is a non-discrete topological group such that every compact subspace of G is scattered, then G is metrizable if and only if i

We prove some basic properties of p-bounded subsets (p ∈ ω \* ) in terms of z-ultrafilters and families of continuous functions. We analyze the relations between p-pseudocompactness with other pseudocompact like-properties as p-compactness and α-pseudocompactness where α is a cardinal number. We giv

We prove that if X is a Tychonoff topological space, Y a subspace of X, and every bounded continuous pseudometric on Y can be extended to a continuous pseudometric on X, then the free topological group F M (Y ) coincides with the topological subgroup of F M (X) generated by Y . For this purpose, a n

A semitopological group (topological group) is a group endowed with a topology for which multiplication is separately continuous (multiplication is jointly continuous and inversion is continuous). In this paper we give some topological conditions on a semitopological group that imply that it is a to