Continuous embedding

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. In some sense, the two norms are "almost equivalent", even though they are not both defined on the same space. Several of the Sobolev embedding theorems are continuous embedding theorems.

Definition

Let X and Y be two normed vector spaces, with norms ||·||X and ||·||Y respectively, such that X  Y. If the inclusion map (identity function)

i : X \hookrightarrow Y : x \mapsto x

is continuous, i.e. if there exists a constant C  0 such that

\| x \|_{Y} \leq C \| x \|_{X}

for every x in X, then X is said to be continuously embedded in Y. Some authors use the hooked arrow to denote a continuous embedding, i.e. X  Y means X and Y are normed spaces with X continuously embedded in Y. This is a consistent use of notation from the point of view of the category of topological vector spaces, in which the morphisms (arrows) are the continuous linear maps.

Examples

i : \mathbf{R} \to \mathbf{R}^{2} : x \mapsto (x, 0)
In this case, ||x||X = ||x||Y for every real number X. Clearly, the optimal choice of constant C is C = 1.
p^{*} = \frac{n p}{n - p}.
Then the Sobolev space W1,p(Ω; R) is continuously embedded in the Lp space Lp(Ω; R). In fact, for 1  q < p, this embedding is compact. The optimal constant C will depend upon the geometry of the domain Ω.
X = Y = C^{0} ([0, 1]; \mathbf{R}),
the space of continuous real-valued functions defined on the unit interval, but equip X with the L1 norm and Y with the supremum norm. For n  N, let fn be the continuous, piecewise linear function given by
f_{n} (x) = \begin{cases} - n^{2} x + n , & 0 \leq x \leq \tfrac{1}{n}; \\ 0, & \mbox{otherwise.} \end{cases}
Then, for every n, ||fn||Y = ||fn|| = n, but
\| f_{n} \|_{L^{1}} = \int_{0}^{1} | f_{n} (x) | \, \mathrm{d} x = \frac1{2}.
Hence, no constant C can be found such that ||fn||Y  C||fn||X, and so the embedding of X into Y is discontinuous.

See also

References

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