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Line 1: ~~{{uncat\|October 2006}}~~ In [[mathematics]], one [[normed vector space]] is said to be '''continuously embedded''' in another normed vector space if the [[inclusion function]] between them is [[continuous function\|continuous]]. In some sense, the two norms are "almost equivalent", even though they are not both defined on the same space. Several of the [[Sobolev inequality\|Sobolev embedding theorems]] are continuous embedding theorems. Line 21 ⟶ 20: * {{cite book \| author=Rennardy, M., & Rogers, R.C. \| title=An Introduction to Partial Differential Equations \| publisher=Springer-Verlag, Berlin \| year=1992 \| id=ISBN 3-540-97952-2 }} [[Category:Functional analysis]]

Continuous embedding: Difference between revisions