If all compact subspaces of $X$ are closed in $X$, then is $X$ Hausdorff ? If not then please give counter-example.
We know that converse is true i.e. compact subspace of Hausdorff space is closed.
2026-03-25 00:02:19.1774396939
A space $X$ with property that all compact subspaces are closed.
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