Remote point: Difference between revisions

In general topology, a remote point is a point ${\displaystyle p}$ that belongs to the Stone–Čech compactification ${\displaystyle \beta X}$ of a Tychonoff space ${\displaystyle X}$ but that does not belong to the topological closure within ${\displaystyle \beta X}$ of any nowhere dense subset of ${\displaystyle X}$.^[1]

Let ${\displaystyle ℝ}$ be the real line with the standard topology. In 1962, Nathan Fine and Leonard Gillman proved that, assuming the continuum hypothesis: Template:Blockquote

Their proof works for any Tychonoff space that is separable and not pseudocompact.^[1]

Chae and Smith proved that the existence of remote points is independent, in terms of Zermelo–Fraenkel set theory, of the continuum hypothesis for a class of topological spaces that includes metric spaces.^[2] Several other mathematical theorems have been proved concerning remote points.^[3][4]

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