Why is $\ell^\infty (\mathbb {N})$ not separable? Ask Question Asked 11 years, 10 months ago Modified 1 year, 3 months ago

Oct 8, 2020 · The standard definition (e.g. from wikipedia) that a separable topological space $X$ contains a countable, dense subset, or equivalently that there is a sequence $(x ...

Related: Prove that every compact metric space is separable (Although it seems that in that question the OP asks mainly about verification of their own proof.)

The problem statement, all variables and given/known data: Show that if X is a subset of M and (M, d) is separable, then (X, d) is separable. [This may be a little bit trickier than it looks - E may be a …

Jun 19, 2015 · $X$ is a compact metric space, then $C(X)$ is separable, where $C(X)$ denotes the space of continuous functions on $X$. How to prove it? And if $X$ is just a compact ...

Feb 5, 2020 · $X^*$ is separable then $X$ is separable Proof: Here is my favorite proof, which I think is simpler than both the one suggested by David C. Ullrich and the one I had ...

Jun 27, 2014 · Wikipedia en.wikipedia.org/wiki/Separable_space#Non-separable_spaces: The Lebesgue spaces Lp, over a separable measure space, are separable for any 1 ≤ p < ∞.

Aug 10, 2017 · Proving that a Banach space is separable if its dual is separable Ask Question Asked 8 years, 4 months ago Modified 2 years, 1 month ago

Oct 13, 2017 · I have just learned about separable Banach spaces. The definition of a separable space that I know is that a space is separable if you can find a countable dense subset of it. I would be …

Apr 10, 2017 · From this, it follows that sums and products of separable elements are separable, and thus we have the claim: Compositums of separable extensions are separable.