Almost sharp descriptions of traces of Sobolev Wp1(Rn)-spaces to arbitrary compact subsets of Rn. The case p ∈ (1,n]
Abstract
Let S ⊂ Rn be an arbitrary nonempty compact set such that the d-Hausdorff content Hd∞(S) > 0 for some d ∈ (0,n]. For each p ∈ (\1,n-d\,n], an almost sharp intrinsic description of the trace space Wp1(Rn)|S of the Sobolev space Wp1(Rn) to the set S is obtained. Furthermore, for each p ∈ (\1,n-d\,n] and ∈ (0, \p-(n-d),p-1\), new bounded linear extension operators from the trace space Wp1(Rn)|S into the space Wp-1(Rn) are constructed.
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