a relationship between local compactness and closure
$begingroup$
Suppose that $X$ is a Hausdorff locally compact space and $S$ a subset of $X$. Let $xin X$ and suppose that every compact neighborhood of $x$ intersects $S$. Does it follow that $x$ lies in the closure of $S$?
general-topology
asked 16 hours ago
User12239User12239
367216
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add a comment |
$begingroup$
Suppose that $X$ is a Hausdorff locally compact space and $S$ a subset of $X$. Let $xin X$ and suppose that every compact neighborhood of $x$ intersects $S$. Does it follow that $x$ lies in the closure of $S$?
general-topology
asked 16 hours ago
User12239User12239
367216
$endgroup$
add a comment |
$begingroup$
Suppose that $X$ is a Hausdorff locally compact space and $S$ a subset of $X$. Let $xin X$ and suppose that every compact neighborhood of $x$ intersects $S$. Does it follow that $x$ lies in the closure of $S$?
general-topology
asked 16 hours ago
User12239User12239
367216
$endgroup$
Suppose that $X$ is a Hausdorff locally compact space and $S$ a subset of $X$. Let $xin X$ and suppose that every compact neighborhood of $x$ intersects $S$. Does it follow that $x$ lies in the closure of $S$?
general-topology
general-topology
asked 16 hours ago
User12239User12239
367216
asked 16 hours ago
User12239User12239
367216
asked 16 hours ago
User12239User12239
367216
asked 16 hours ago
User12239User12239
367216
asked 16 hours ago
User12239User12239
367216
367216
add a comment |
add a comment |
2 Answers
2
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votes
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Yes, it is true. Since $X$ is locally compact and Hausdorff, given a neighborhood $U$ of $x$ in $X$, we can find a neighborhood $V$ such that $overline V$ is compact and $overline Vsubseteq U$. As every compact neighborhood of $x$ intersects with $S$, $overline Vcap Sneq emptyset$ $implies Ucap Sneq emptyset$.
answered 16 hours ago
Thomas ShelbyThomas Shelby
4,7362727
$endgroup$
$begingroup$
Yes I was doubting if every neighborhood has a compact neighborhood so I need to prove this fact now
$endgroup$
– User12239
16 hours ago
$begingroup$
You can find a proof in 'Topology' by Munkres.
$endgroup$
– Thomas Shelby
16 hours ago
$begingroup$
Also see this.
$endgroup$
– Thomas Shelby
16 hours ago
1
$begingroup$
Thanks I’m looking them up
$endgroup$
– User12239
16 hours ago
add a comment |
$begingroup$
In this case ($X$ being locally compact Hausdorff) for every point $x$ of $X$, every neighbourhood of $x$ contains a compact neighbourhood of $x$ - see.
Then any neighbourhood of $x$ contains a compact neighbourhood which intersects $S$, so $xin bar{S}$
answered 16 hours ago
MaksimMaksim
1,00719
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add a comment |
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2 Answers
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active
oldest
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2 Answers
2
active
oldest
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$begingroup$
Yes, it is true. Since $X$ is locally compact and Hausdorff, given a neighborhood $U$ of $x$ in $X$, we can find a neighborhood $V$ such that $overline V$ is compact and $overline Vsubseteq U$. As every compact neighborhood of $x$ intersects with $S$, $overline Vcap Sneq emptyset$ $implies Ucap Sneq emptyset$.
answered 16 hours ago
Thomas ShelbyThomas Shelby
4,7362727
$endgroup$
$begingroup$
Yes I was doubting if every neighborhood has a compact neighborhood so I need to prove this fact now
$endgroup$
– User12239
16 hours ago
$begingroup$
You can find a proof in 'Topology' by Munkres.
$endgroup$
– Thomas Shelby
16 hours ago
$begingroup$
Also see this.
$endgroup$
– Thomas Shelby
16 hours ago
1
$begingroup$
Thanks I’m looking them up
$endgroup$
– User12239
16 hours ago
add a comment |
$begingroup$
Yes, it is true. Since $X$ is locally compact and Hausdorff, given a neighborhood $U$ of $x$ in $X$, we can find a neighborhood $V$ such that $overline V$ is compact and $overline Vsubseteq U$. As every compact neighborhood of $x$ intersects with $S$, $overline Vcap Sneq emptyset$ $implies Ucap Sneq emptyset$.
answered 16 hours ago
Thomas ShelbyThomas Shelby
4,7362727
$endgroup$
$begingroup$
Yes I was doubting if every neighborhood has a compact neighborhood so I need to prove this fact now
$endgroup$
– User12239
16 hours ago
$begingroup$
You can find a proof in 'Topology' by Munkres.
$endgroup$
– Thomas Shelby
16 hours ago
$begingroup$
Also see this.
$endgroup$
– Thomas Shelby
16 hours ago
1
$begingroup$
Thanks I’m looking them up
$endgroup$
– User12239
16 hours ago
add a comment |
$begingroup$
Yes, it is true. Since $X$ is locally compact and Hausdorff, given a neighborhood $U$ of $x$ in $X$, we can find a neighborhood $V$ such that $overline V$ is compact and $overline Vsubseteq U$. As every compact neighborhood of $x$ intersects with $S$, $overline Vcap Sneq emptyset$ $implies Ucap Sneq emptyset$.
answered 16 hours ago
Thomas ShelbyThomas Shelby
4,7362727
$endgroup$
Yes, it is true. Since $X$ is locally compact and Hausdorff, given a neighborhood $U$ of $x$ in $X$, we can find a neighborhood $V$ such that $overline V$ is compact and $overline Vsubseteq U$. As every compact neighborhood of $x$ intersects with $S$, $overline Vcap Sneq emptyset$ $implies Ucap Sneq emptyset$.
answered 16 hours ago
Thomas ShelbyThomas Shelby
4,7362727
edited 16 hours ago
answered 16 hours ago
Thomas ShelbyThomas Shelby
4,7362727
answered 16 hours ago
Thomas ShelbyThomas Shelby
4,7362727
answered 16 hours ago
Thomas ShelbyThomas Shelby
4,7362727
4,7362727
$begingroup$
Yes I was doubting if every neighborhood has a compact neighborhood so I need to prove this fact now
$endgroup$
– User12239
16 hours ago
$begingroup$
You can find a proof in 'Topology' by Munkres.
$endgroup$
– Thomas Shelby
16 hours ago
$begingroup$
Also see this.
$endgroup$
– Thomas Shelby
16 hours ago
1
$begingroup$
Thanks I’m looking them up
$endgroup$
– User12239
16 hours ago
add a comment |
$begingroup$
Yes I was doubting if every neighborhood has a compact neighborhood so I need to prove this fact now
$endgroup$
– User12239
16 hours ago
$begingroup$
You can find a proof in 'Topology' by Munkres.
$endgroup$
– Thomas Shelby
16 hours ago
$begingroup$
Also see this.
$endgroup$
– Thomas Shelby
16 hours ago
1
$begingroup$
Thanks I’m looking them up
$endgroup$
– User12239
16 hours ago
$begingroup$
Yes I was doubting if every neighborhood has a compact neighborhood so I need to prove this fact now
$endgroup$
– User12239
16 hours ago
$begingroup$
Yes I was doubting if every neighborhood has a compact neighborhood so I need to prove this fact now
$endgroup$
– User12239
16 hours ago
$begingroup$
You can find a proof in 'Topology' by Munkres.
$endgroup$
– Thomas Shelby
16 hours ago
$begingroup$
You can find a proof in 'Topology' by Munkres.
$endgroup$
– Thomas Shelby
16 hours ago
$begingroup$
Also see this.
$endgroup$
– Thomas Shelby
16 hours ago
$begingroup$
Also see this.
$endgroup$
– Thomas Shelby
16 hours ago
1
1
$begingroup$
Thanks I’m looking them up
$endgroup$
– User12239
16 hours ago
$begingroup$
Thanks I’m looking them up
$endgroup$
– User12239
16 hours ago
add a comment |
$begingroup$
In this case ($X$ being locally compact Hausdorff) for every point $x$ of $X$, every neighbourhood of $x$ contains a compact neighbourhood of $x$ - see.
Then any neighbourhood of $x$ contains a compact neighbourhood which intersects $S$, so $xin bar{S}$
answered 16 hours ago
MaksimMaksim
1,00719
$endgroup$
add a comment |
$begingroup$
In this case ($X$ being locally compact Hausdorff) for every point $x$ of $X$, every neighbourhood of $x$ contains a compact neighbourhood of $x$ - see.
Then any neighbourhood of $x$ contains a compact neighbourhood which intersects $S$, so $xin bar{S}$
answered 16 hours ago
MaksimMaksim
1,00719
$endgroup$
add a comment |
$begingroup$
In this case ($X$ being locally compact Hausdorff) for every point $x$ of $X$, every neighbourhood of $x$ contains a compact neighbourhood of $x$ - see.
Then any neighbourhood of $x$ contains a compact neighbourhood which intersects $S$, so $xin bar{S}$
answered 16 hours ago
MaksimMaksim
1,00719
$endgroup$
In this case ($X$ being locally compact Hausdorff) for every point $x$ of $X$, every neighbourhood of $x$ contains a compact neighbourhood of $x$ - see.
Then any neighbourhood of $x$ contains a compact neighbourhood which intersects $S$, so $xin bar{S}$
answered 16 hours ago
MaksimMaksim
1,00719
answered 16 hours ago
MaksimMaksim
1,00719
answered 16 hours ago
MaksimMaksim
1,00719
answered 16 hours ago
MaksimMaksim
1,00719
1,00719
add a comment |
add a comment |
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