Equivalent Characterizations and Applications of Fractional Sobolev Spaces with Partially Vanishing Traces on (ε,δ,D)-Domains Supporting D-Adapted Fractional Hardy Inequalities

Abstract

Let ⊂Rn be an (ε,δ,D)-domain, with ε∈(0,1], δ∈(0,∞], and D⊂ ∂ being a closed part of ∂ , which is a general open connected set when D=∂ and an (ε,δ)-domain when D=. Let s∈(0,1) and p∈[1,∞). If Ws,p(), Ws,p(), and WDs,p() are the fractional Sobolev spaces on that are defined respectively via the restriction of Ws,p(Rn) to , the intrinsic Gagliardo norm, and the completion of all C∞() functions with compact support away from D, in this article we prove their equivalences [that is, Ws,p()=Ws,p() =WDs,p()] if supports a D-adapted fractional Hardy inequality and, moreover, when sp 1 such a fractional Hardy inequality is shown to be necessary to guarantee these equivalences under some mild geometric conditions on . Using the aforementioned equivalences, we show that the real interpolation space (Lp(), WD1,p())s,p equals to some weighted fractional order Sobolev space Ws,pdDs() when p∈ (1,∞). Applying this to the elliptic operator LD in with mixed boundary condition, we characterize both the domain of its fractional power and the parabolic maximal regularity of its Cauchy initial problem by means of Ws,pdDs().