Add to ORKGMonotone normality in finite and infinite topological products is investigated. As shown in (Heath et al., 1973), the countable (Tychonoff) power of a space is monotonically normal if and only if the space is stratifiable. It is shown that if the square of a space is monotonically normal, then all finite powers are monotonically normal and hereditarily paracompact. For certain special cases, it is observed that a space has all finite powers monotonically normal if and only if it linearly stratifiable. Nonetheless, a monotonically normal topological group is constructed, all of whose finite powers are monotonically normal, but which is not linearly stratifiable. The group is constructed using special filters and nonstandard topologies on inf...
Monotone normality is usually defined in the class of T_1 spaces. In this paper we study it under th...
AbstractThe purpose of this paper is to study which quasi-metrizable spaces are monotonically normal...
In this paper monotone versions of some results on normality and on property (a) are investigated
AbstractAccording to Mack a space is countably paracompact if and only if its product with [0,1] is ...
According to Mack a space is countably paracompact if and only if its product with [0, 1] is δ-norma...
AbstractIn this paper it is proved that a topological space is necessarily paracompact if it is mono...
AbstractThe article surveys recent developments on monotone normality in the context of classical th...
AbstractLet S be the class of all spaces, each of which is homeomorphic to a stationary subset of a ...
AbstractWe give examples to show that a k-and-ℵ space need not be normal and that, under MA+¬CH, a k...
AbstractThe behavior of the property of weak normality with respect to topological products is exami...
AbstractRecently, it has been proved that orthocompactness implies normality for the products of a m...
AbstractA space X is acyclic monotonically normal if it has a monotonically normal operator M〈·,·〉 s...
ABSTRACT. It is known that the product °1ðX of °1 with an M1-space may be nonnormal. In this paper w...
AbstractIn this paper it is proved that a topological space is necessarily paracompact if it is mono...
AbstractWe give examples to show that a k-and-ℵ space need not be normal and that, under MA+¬CH, a k...
Monotone normality is usually defined in the class of T_1 spaces. In this paper we study it under th...
AbstractThe purpose of this paper is to study which quasi-metrizable spaces are monotonically normal...
In this paper monotone versions of some results on normality and on property (a) are investigated
AbstractAccording to Mack a space is countably paracompact if and only if its product with [0,1] is ...
According to Mack a space is countably paracompact if and only if its product with [0, 1] is δ-norma...
AbstractIn this paper it is proved that a topological space is necessarily paracompact if it is mono...
AbstractThe article surveys recent developments on monotone normality in the context of classical th...
AbstractLet S be the class of all spaces, each of which is homeomorphic to a stationary subset of a ...
AbstractWe give examples to show that a k-and-ℵ space need not be normal and that, under MA+¬CH, a k...
AbstractThe behavior of the property of weak normality with respect to topological products is exami...
AbstractRecently, it has been proved that orthocompactness implies normality for the products of a m...
AbstractA space X is acyclic monotonically normal if it has a monotonically normal operator M〈·,·〉 s...
ABSTRACT. It is known that the product °1ðX of °1 with an M1-space may be nonnormal. In this paper w...
AbstractIn this paper it is proved that a topological space is necessarily paracompact if it is mono...
AbstractWe give examples to show that a k-and-ℵ space need not be normal and that, under MA+¬CH, a k...
Monotone normality is usually defined in the class of T_1 spaces. In this paper we study it under th...
AbstractThe purpose of this paper is to study which quasi-metrizable spaces are monotonically normal...
In this paper monotone versions of some results on normality and on property (a) are investigated