sober space

Let $X$ be a topological space. A subset $A$ of $X$ is said to be irreducible if whenever $A\subseteq B\cup C$ with $B,C$ closed, we have $A\subseteq B$ or $A\subseteq C$. Any singleton and its closure are irreducible. More generally, the closure of an irreducible set is irreducible.

A topological space $X$ is called a sober space if every irreducible closed subset is the closure of some unique point in $X$.

Remarks.

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  For any sober space, the closure of a point determines the point. In other words, $\mathrm{cl}(x)=\mathrm{cl}(y)$ implies $x=y$.

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  A space is sober iff the closure of every irreducible set is the closure of a unique point.

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  Any sober space is T0.

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  Any Hausdorff space is sober.

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  A closed subspace of a sober space is sober.

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  Any product of sober spaces is sober.

Title	sober space
Canonical name	SoberSpace
Date of creation	2013-03-22 16:43:44
Last modified on	2013-03-22 16:43:44
Owner	CWoo (3771)
Last modified by	CWoo (3771)
Numerical id	6
Author	CWoo (3771)
Entry type	Definition
Classification	msc 54E99
Defines	irreducible set