Template:Common Banach spaces

Glossary of symbols for the table below:

$𝔽$ denotes the field of real numbers $ℝ$ or complex numbers $ℂ .$
$K$ is a compact Hausdorff space.
$p, q \in ℝ$ are real numbers with $1 < p, q < \infty$ that are Hölder conjugates, meaning that they satisfy $\frac{1}{q} + \frac{1}{p} = 1$ and thus also $q = \frac{p}{p - 1} .$
$Σ$ is a $σ$ -algebra of sets.
$Ξ$ is an algebra of sets (for spaces only requiring finite additivity, such as the ba space).
$μ$ is a measure with variation $| μ | .$ A positive measure is a real-valued positive set function defined on a $σ$ -algebra which is countably additive.

	Dual space	Reflexive	weakly sequentially complete	Norm		Notes
Classical Banach spaces
$𝔽^{n}$	$𝔽^{n}$	Yes	Yes	$‖ x ‖_{2}$	$= {(\sum_{i = 1}^{n} \| x_{i} \|^{2})}^{1 / 2}$	Euclidean space
$ℓ_{p}^{n}$	$ℓ_{q}^{n}$	Yes	Yes	$‖ x ‖_{p}$	$= {(\sum_{i = 1}^{n} \| x_{i} \|^{p})}^{\frac{1}{p}}$
$ℓ_{\infty}^{n}$	$ℓ_{1}^{n}$	Yes	Yes	$‖ x ‖_{\infty}$	$= \max \nolimits_{1 \leq i \leq n} \| x_{i} \|$
$ℓ^{p}$	$ℓ^{q}$	Yes	Yes	$‖ x ‖_{p}$	$= {(\sum_{i = 1}^{\infty} \| x_{i} \|^{p})}^{\frac{1}{p}}$
$ℓ^{1}$	$ℓ^{\infty}$	No	Yes	$‖ x ‖_{1}$	$= \sum_{i = 1}^{\infty} \| x_{i} \|$
$ℓ^{\infty}$	$ba$	No	No	$‖ x ‖_{\infty}$	$= \sup \nolimits_{i} \| x_{i} \|$
$c$	$ℓ^{1}$	No	No	$‖ x ‖_{\infty}$	$= \sup \nolimits_{i} \| x_{i} \|$
$c_{0}$	$ℓ^{1}$	No	No	$‖ x ‖_{\infty}$	$= \sup \nolimits_{i} \| x_{i} \|$	Isomorphic but not isometric to $c .$
$bv$	$ℓ^{\infty}$	No	Yes	$‖ x ‖_{b v}$	$= \| x_{1} \| + \sum_{i = 1}^{\infty} \| x_{i + 1} - x_{i} \|$	Isometrically isomorphic to $ℓ^{1} .$
${bv}_{0}$	$ℓ^{\infty}$	No	Yes	$‖ x ‖_{b v_{0}}$	$= \sum_{i = 1}^{\infty} \| x_{i + 1} - x_{i} \|$	Isometrically isomorphic to $ℓ^{1} .$
$bs$	$ba$	No	No	$‖ x ‖_{b s}$	$= \sup \nolimits_{n} \| \sum_{i = 1}^{n} x_{i} \|$	Isometrically isomorphic to $ℓ^{\infty} .$
$cs$	$ℓ^{1}$	No	No	$‖ x ‖_{b s}$	$= \sup \nolimits_{n} \| \sum_{i = 1}^{n} x_{i} \|$	Isometrically isomorphic to $c .$
$B (K, Ξ)$	$ba (Ξ)$	No	No	$‖ f ‖_{B}$	$= \sup \nolimits_{k \in K} \| f (k) \|$
$C (K)$	$rca (K)$	No	No	$‖ x ‖_{C (K)}$	$= \max \nolimits_{k \in K} \| f (k) \|$
$ba (Ξ)$	?	No	Yes	$‖ μ ‖_{b a}$	$= \sup \nolimits_{S \in Ξ} \| μ \| (S)$
$ca (Σ)$	?	No	Yes	$‖ μ ‖_{b a}$	$= \sup \nolimits_{S \in Σ} \| μ \| (S)$	A closed subspace of $ba (Σ) .$
$rca (Σ)$	?	No	Yes	$‖ μ ‖_{b a}$	$= \sup \nolimits_{S \in Σ} \| μ \| (S)$	A closed subspace of $ca (Σ) .$
$L^{p} (μ)$	$L^{q} (μ)$	Yes	Yes	$‖ f ‖_{p}$	$= {(\int \| f \|^{p} d μ)}^{\frac{1}{p}}$
$L^{1} (μ)$	$L^{\infty} (μ)$	No	Yes	$‖ f ‖_{1}$	$= \int \| f \| d μ$	The dual is $L^{\infty} (μ)$ if $μ$ is $σ$ -finite.
$BV ([a, b])$	?	No	Yes	$‖ f ‖_{B V}$	$= V_{f} ([a, b]) + \lim \nolimits_{x \to a^{+}} f (x)$	$V_{f} ([a, b])$ is the total variation of $f$
$NBV ([a, b])$	?	No	Yes	$‖ f ‖_{B V}$	$= V_{f} ([a, b])$	$NBV ([a, b])$ consists of $BV ([a, b])$ functions such that $\lim \nolimits_{x \to a^{+}} f (x) = 0$
$AC ([a, b])$	$𝔽 + L^{\infty} ([a, b])$	No	Yes	$‖ f ‖_{B V}$	$= V_{f} ([a, b]) + \lim \nolimits_{x \to a^{+}} f (x)$	Isomorphic to the Sobolev space $W^{1, 1} ([a, b]) .$
$C^{n} ([a, b])$	$rca ([a, b])$	No	No	$‖ f ‖$	$= \sum_{i = 0}^{n} \sup \nolimits_{x \in [a, b]} \| f^{(i)} (x) \|$	Isomorphic to $ℝ^{n} \oplus C ([a, b]),$ essentially by Taylor's theorem.

Template:Common Banach spaces

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