On Nonempty Intersection Properties in Metric Spaces

Abstract

The classical Cantor's intersection theorem states that in a complete metric space X, intersection of every decreasing sequence of nonempty closed bounded subsets, with diameter approaches zero, has exactly one point. In this article, we deal with decreasing sequences \Kn\ of nonempty closed bounded subsets of a metric space X, for which the Hausdorff distance H(Kn, Kn+1) tends to 0, as well as for which the excess of Kn over X Kn tends to 0. We achieve nonempty intersection properties in metric spaces. The obtained results also provide partial generalizations of Cantor's theorem.