Reconstructing Compact Metrizable Spaces

Abstract

The deck, D(X), of a topological space X is the set D(X)=\[X \x\] x ∈ X\, where [Y] denotes the homeomorphism class of Y. A space X is (topologically) reconstructible if whenever D(Z)=D(X) then Z is homeomorphic to X. It is known that every (metrizable) continuum is reconstructible, whereas the Cantor set is non-reconstructible. The main result of this paper characterises the non-reconstructible compact metrizable spaces as precisely those where for each point x there is a sequence Bnx n ∈ N of pairwise disjoint clopen subsets converging to x such that Bnx and Bny are homeomorphic for each n, and all x and y. In a non-reconstructible compact metrizable space the set of 1-point components forms a dense Gδ. For h-homogeneous spaces, this condition is sufficient for non-reconstruction. A wide variety of spaces with a dense Gδ set of 1-point components are presented, some reconstructible and others not reconstructible.