Hereditary normality of γN-spaces

In 1964 K. Morita introduced the concept of P(m)-spaces which characterized the normality of products with any metrizable space of weight < m. Especially, a topological space X is a normal P(No)-space if and only if X x Y is normal for any separable metrizable space Y. Okuyama (1991) introduced a si

We show, in particular, that if X is a zero-dimensional second countable space without isolated points, then each point of the remainder of the space βX is a non-normality point of βX.

We show, in particular, that if X is a locally compact second countable space without isolated points, then each point of the remainder of the space /?X is a nonnormality point of PX.

It is proved that if all Fg-sets in the product X x Y are &normal, then either X is normal and countably paracompact or all countable subsets of Y are closed. If the product X x Y is hereditarily S-normal, then either X is perfectly normal or all countable subsets of Y are closed. Applications to ex

In this paper, we introduce and characterize several types of normality in double fuzzy topological spaces. The effects of some types of functions on these types of normality are introduced.