Sobolev Extension By Linear Operators
Abstract
Let Lm,p(n) be the Sobolev space of functions with mth derivatives lying in Lp(n). Assume that n< p < ∞. For E ⊂ n, let Lm,p(E) denote the space of restrictions to E of functions in Lm,p(n). We show that there exists a bounded linear map T : Lm,p(E) → Lm,p(n) such that, for any f ∈ Lm,p(E), we have Tf = f on E. We also give a formula for the order of magnitude of \|f\|Lm,p(E) for a given f : E → when E is finite.
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