Category:Annihilator of Subspace of Banach Space is Weak-* Closed
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This category contains pages concerning Annihilator of Subspace of Banach Space is Weak-* Closed:
Let $X$ be a Banach space.
Let $M$ be a vector subspace of $X$.
Let $X^\ast$ be the normed dual space of $X$.
Let $w^\ast$ be the weak-$\ast$ topology on $X^\ast$.
Let $M^\bot$ be the annihilator of $M$.
Then $M^\bot$ is closed in $\struct {X^\ast, w^\ast}$.
Pages in category "Annihilator of Subspace of Banach Space is Weak-* Closed"
The following 3 pages are in this category, out of 3 total.