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Is $L^p$ separable? - Mathematics Stack Exchange

Thu, 09 Apr 2026 21:51:00 GMT

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 < ∞.

galois theory - The definition of the separable closure of a field ...

Mon, 13 Apr 2026 06:37:00 GMT

In any case, each polynomial that has a zero in the separable closure will also decompose in linear factors; thus ext. is normal. Also, note that for some fields such as the rationals or any field of characteristic $0$ but also for finite fields, the separable closure is nothing but the algebraic closure.

Separability of $l^ {p}$ spaces - Mathematics Stack Exchange

Sun, 12 Apr 2026 10:56:00 GMT

Explore related questions sequences-and-series functional-analysis metric-spaces lp-spaces separable-spaces

Prove that a subspace of a separable and metric space is itself separable

Sun, 12 Apr 2026 12:22:00 GMT

Prove that a subspace of a separable and metric space is itself separable Ask Question Asked 12 years, 6 months ago Modified 5 months ago

Proof of separability of $L^p$ spaces - Mathematics Stack Exchange

Tue, 14 Apr 2026 11:51:00 GMT

A metrizable space is separable if and only if it is second-countable. This means that the euclidean topology on $\mathbb {R}^n$ has a countable basis. This countable basis is explicitely described in the first paragraph of the proof and is put to use in the second paragraph.

Is every Hilbert space separable? - Mathematics Stack Exchange

Sat, 11 Apr 2026 16:12:00 GMT

From Wikipedia: A Hilbert space is separable if and only if it has a countable orthonormal basis. What are the examples of non-separable Hilbert spaces? From an applied point of view, are all interesting (finite or infinite) Hilbert spaces separable?

I would like to show that $\\ell^1$ is separable

Fri, 10 Apr 2026 00:57:00 GMT

So here is my question, I want to prove that $\\ell^1$ is separable. So i need to show that there exists a countable dense subset in $\\ell^1$. Since I am not sure if my idea was right i hoped som...

Prove that $X^\\ast$ separable implies $X$ separable

Mon, 06 Apr 2026 23:20:00 GMT

Prove that $X^\ast$ separable implies $X$ separable Ask Question Asked 14 years, 4 months ago Modified 7 years, 9 months ago

Definition of Separable Space - Mathematics Stack Exchange

Sat, 11 Apr 2026 23:14:00 GMT

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 ...

functional analysis - Elegant proof that $L^2 ( [a,b])$ is separable ...

Tue, 07 Apr 2026 04:35:00 GMT

The sub-$\mathbb Q$-vector space generated by the characteristic functions of intervals with rational end-points is countable and dense.