Disconnectedness properties of Hyperspaces

Abstract

Let X be a Hausdorff space and let H be one of the hyperspaces CL(X), K(X), F(X) or Fn(X) (n a positive integer) with the Vietoris topology. We study the following disconnectedness properties for H: extremal disconnectedness, being a F-space, P-space or weak P-space and hereditary disconnectedness. Our main result states: if X is Hausdorff and F⊂ X is a closed subset such that (a) both F and X-F are totally disconnected, (b) the quotient X/F is hereditarily disconnected, then K(X) is hereditarily disconnected. We also show an example proving that this result cannot be reversed.