Let $X$ be a Banach Space and let $P$ be a densely defined operator on $X$ such that
$P$ is closable
$R(P)\subset D\left( P\right) $ and $P^{2}=P$
Is $\overline{P}$ an everywhere defined continuous projection ?
Thank you
2026-03-30 23:11:35.1774912295
Is the closure of a closable projection continuous?
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