Hemicompact space

In mathematics, in the field of topology, a Hausdorff topological space is said to be hemicompact if it has a sequence of compact subsets such that every compact subset of the space lies inside some compact set in the sequence.^[1] This forces the union of the sequence to be the whole space, because every point is compact and hence must lie in one of the compact sets.

• Every compact space is hemicompact.
• The real line is hemicompact.
• Every locally compact Lindelöf space is hemicompact.

Every hemicompact space is σ-compact^[2] and if in addition it is first countable then it is locally compact. If a hemicompact space is weakly locally compact, then it is exhaustible by compact sets.

If ${\displaystyle X}$ is a hemicompact space, then the space ${\displaystyle C(X,M)}$ of all continuous functions ${\displaystyle f:X\to M}$ to a metric space ${\displaystyle (M,\delta )}$ with the compact-open topology is metrizable.^[3] To see this, take a sequence ${\displaystyle K_1,K_2,\dots }$ of compact subsets of ${\displaystyle X}$ such that every compact subset of ${\displaystyle X}$ lies inside some compact set in this sequence (the existence of such a sequence follows from the hemicompactness of ${\displaystyle X}$). Define pseudometrics

${\displaystyle d_n(f,g)=\underset{x\in K_n}{\sup }\delta (f(x),g(x)),f,g\in C(X,M),n\in \mathbb{N}.}$

Then

${\displaystyle d(f,g)={\displaystyle \sum _{n=1}^{\mathrm{\infty }}}\frac{1}{2^n}\cdot \frac{d_n(f,g)}{1+d_n(f,g)}}$

defines a metric on ${\displaystyle C(X,M)}$ which induces the compact-open topology.

• Compact space
• Exhaustible by compact sets
• Locally compact space
• Lindelöf space

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• hemicompact space on nLab
• hemicompact on π-Base

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