Counting continua
Abstract
For infinite cardinals ,λ let C(,λ) denote the class of all compact Hausdorff spaces of weight and size λ. So C(,λ)= if >λ or λ>2. If F is a class of pairwise non-homeomorphic spaces in C(,λ) then F is a set of size not greater than 2. For every infinite cardinal we construct 2 pairwise non-embeddable pathwise connected spaces in C(,λ) for λ=\20,\ and for λ=(+). (If is a strong limit then (+)=2.) Additionally, for all infinite cardinals ,μ with μ≤ we construct 2 pairwise non-embeddable connected spaces in C(,μ). Furthermore, for =λ=2θ with arbitrary θ and for certain other pairs ,λ we construct 2 pairwise non-embeddable connected, linearly ordered spaces X∈ C(,λ) such that Y∈ C(,λ) whenever Y is an infinite compact and connected subspace of X. On the other hand we prove that there is no space X with this property if λ is of countable cofinality and either =λ or λ is a strong limit.
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