Let $A \subset X$.
When do we have $A^\bot=\{0\}\implies\overline{A}=X \ \ \ \ ?$
I've read some answers in the forum that stated that for the converse $A$ had to be a subspace of $X$.
2026-03-29 07:28:53.1774769333
When does a trivial orthogonal complement imply the subset is dense?
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