Dgdrxrt

Just out of curiosity, I am wondering if any uncountable, scattered subset $Usubset[0,1]$ must be dense in $[0,1]$ (endowed with the Euclidean topology). It's not necessarily true if $U$ is countable, since we can take $U=frac1n : ninmathbbN$, and there are countably many open sets in $[0,1]$ which $U$ does not intersect.

But I'm having a hard time figuring out whether it's true for uncountable $U$. Any help would be appreciated. (I added the "scattered" hypothesis) since any other interval contained in $[0,1]$ would suffice as a counterexample).

There are no uncountable scattered subsets of $[0,1]$. This follows from the theory of Cantor-Bendixson rank, for instance. Given any scattered $Asubset[0,1]$, there must be some ordinal $alpha$ such that the $alpha$th Cantor-Bendixson derivative $A^alpha$ of $A$ is empty. The least such $alpha$ must be countable, since the Cantor-Bendixson derivatives are a descending chain of closed subsets of $A$ and $A$ is second-countable. Since every subset of $A$ can have only countably many isolated points (again by second-countability), this means $A$ is countable.

The argument in a comment is worth restating: if $X$ is a set without isolated points (a crowded space) that is $T_1$ then no scattered subset (countable or not) can be dense in $X$:

Let $C$ be scattered. So it has an isolated point $p in C$, so there is an open set $U$ of $X$ such that $U cap C =p$. But then $Usetminus p$ is non-empty (as $X$ is crowded) and open (as $X$ is $T_1$, $p$ is closed) and misses $C$. So $C$ is not dense.

This certainly applies to $X=[0,1]$.

An uncountable set does not have to be dense. A simple example would be to take the half interval $[0,frac12]$ which is uncountable but not dense in $[0,1]$. But we can do even better, because we can find a set that is uncountable and not dense in any open interval. The Cantor set is uncountable and dense nowhere. https://en.wikipedia.org/wiki/Cantor_set