Weakly Measurable Seminorms and Sufficient Topologies

In this article, we introduce the notion of weakly measurable cardinal, a new large cardinal concept obtained by weakening the familiar concept of a measurable cardinal. Specifically, a cardinal κ is weakly measurable if for any collection A containing at most κ + many subsets of κ, there exists a n

The behavior of the properly of weak normality with respect to topological products is examined versus normality. The lbllowiag generalization of TamanG's theorem is proved: if X x Z~X is weakly normal then X is paracompact. Some ve~ions of Kat6tov's theorem are obtained. In particular, it is proved

In this paper we investigate the notions of weakly developable and weakly k-developable space. We give a metrization theorem for weakly developable spaces, and characterize them by means of some generalized metric notions introduced in the paper which are weaker than those of w∆space or space having