Sobolev Wp1(Rn) spaces on d-thick closed subsets of Rn

Abstract

Let S ⊂ Rn be a~closed set such that for some d ∈ [0,n] and > 0 the~d-Hausdorff content Hd∞(S Q(x,r)) ≥ rd for all cubes~Q(x,r) centered in~x ∈ S with side length 2r ∈ (0,2]. For every p ∈ (1,∞), denote by Wp1(Rn) the classical Sobolev space on Rn. We give an~intrinsic characterization of the restriction Wp1(Rn)|S of the space Wp1(Rn) to~the set S provided that p > \1,n-d\. Furthermore, we prove the existence of a bounded linear operator Ext:Wp1(Rn)|S Wp1(Rn) such that Ext is right inverse for the usual trace operator. In particular, for p > n-1 we characterize the trace space of the Sobolev space Wp1(Rn) to the closure of an arbitrary open path-connected set~. Our results extend those available for p ∈ (1,n] with much more stringent restrictions on~S.