The characterizations of dense-pseudocompact and dense-connected spaces

Abstract

Assume that P is a topological property of a space X, then we say that X is dense-P if each dense subset of X has the property P. In this paper, we mainly discuss dense subsets of a space X, and we prove that: (1) if X is Tychonoff space, then X is dense-pseudocompact iff the range of each continuous real-valued function f on X is finite, iff X is finite, iff X is hereditarily pseudocompact; (2) X is dense-connected iff U=X for any non-empty open subset U of X; (3) X is dense-ultraconnected iff for point x∈ X, we have \x\=X or \x\ (X\x\) is the unique open neighborhood of x in \x\ (X\x\), iff for any two points x and y in X, we have x∈ \y\ or y∈ \x\. Moreover, we give a characterization of a topological group (resp., paratopological group, quasi-topological group) G such that G is dense-connected.