Hyperspaces of countable compacta

Abstract

Hyperspaces H(X) of all countable compact subsets of a metric space X and An(X) of infinite compact subsets which have at most n (n∈ N), or finitely many (n=ω) or countably many (n=ω+1) accumulation points are studied. By descriptive set-theoretical methods, we fully characterize them for 0-dimensional, dense-in-itself, Polish spaces and partially for σ-compact spaces X. Using the theory of absorbing sets, we get characterizations of H(X), Aω(X) and Aω+1(X) for nondegenerate connected, locally connected Polish spaces X which are either locally compact or nowhere locally compact. For every n∈ N, we show that if X is an interval or a simple closed curve, An(X) is homeomorphic to the linear space c0=\(xi) ∈ Rω: xi=0\ with the product topology; if X is a Peano continuum and a point p∈ X is of order 2, then the hyperspace A1(X,\p\) of all compacta with exactly one accumulation point p also is homeomorphic to c0.