Diagonals separating the square of a continuum
Abstract
A metric continuum X is indecomposable if it cannot be put as the union of two of its proper subcontinua. A subset R of X is said to be continuumwise connected provided that for each pair of points p,q∈ R, there exists a subcontinuum M of X such that \p,q\⊂ M⊂ R. Let X2 denote the Cartesian square of X and the diagonal of X2. In ka it was asked if for a continuum X, distinct from the arc, X2 is continuumwise connected if and only if X is decomposable. In this paper we show that no implication in this question holds. For the proof of the non-necessity, we use the dynamic properties of a suitable homeomorphism of the Cantor set onto itself to construct an appropriate indecomposable continuum X.
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