When is the complement of the diagonal of a LOTS functionally countable?
Abstract
In a 2021 paper, Vladimir Tkachuk asked whether there is a non-separable LOTS X such that X2\ x,x x∈ X\ is functionally countable. In this paper we prove that such a space, if it exists, must be an Aronszajn line and admits a ≤ 2-to-1 retraction to a subspace that is a Suslin line. After this, assuming the existence of a Suslin line, we prove that there is Suslin line that is functionally countable. Finally, we present an example of a functionally countable Suslin line L such that L2\ x,x x∈ L\ is not functionally countable.
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