On the dimension of remainders of extensions of normal spaces

Alexandroff one-point compactification is extended to provide paracompact extensions of locally compact Hausdorff spaces with strongly-discrete remainder.

We present two examples of nice normal spaces X having the property that for some fixedpoint free homeomorphism on X its tech-Stone extension has a fixed point. One of the spaces presented here is locally countable, locally compact, separable, normal, countably paracompact and weakly zero-dimensiona

In this paper, we study the extension properties of a bounded linear transformation from a subspace of a Hilbert space into the whole space (e.g., which has a normal extension). Given an n × n normal matrix A and a k × n matrix B, k n, we obtain some sufficient conditions of subnormality for the sub

Let X be a topological space and A its subspace. The following problem posed by Przymusidski in 1983 remains open: for a nondiscrete metric space Y is it true that In this paper first we prove that this problem is affirmative in case of nondiscrete metrizable Y with Y = Y\*, which contains therefor