What could be an example of a continuous, compact embedding betweend two seperable Hilbert spaces $H$ and $U$, which is not dense?
i.e. is there a map $i: U\rightarrow H, x\mapsto x$ which is not dense, provided that $i$ is continuous and compact?
2026-04-24 09:39:20.1777023560
Continuous and compact embedding between seperable Hilbert spaces is always dense?
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