Giovanni Franzina
Published 2018-01-23Version 1
Given $s \in (0,1)$, we discuss the embedding of $\mathcal D^{s,p}_0(\Omega)$ in $L^q(\Omega)$. In particular, for $1\le q < p$ we deduce its compactness on all open sets $\Omega\subset \mathbb R^N$ on which it is continuous. We then relate, for all q up the fractional Sobolev conjugate exponent, the continuity of the embedding to the summability of the function solving the fractional torsion problem in $\Omega$ in a suitable weak sense, for every open set $\Omega$. The proofs make use of a non-local Hardy-type inequality in $\mathcal D^{s,p}_0(\Omega)$, involving the fractional torsion function as a weight.
On the Poincaré inequality on open sets in $\mathbb{R}^n$
Embeddings for the space $LD_γ^{p}$ on sets of finite perimeter
Sobolev space theory for the Dirichlet problem of the elliptic and parabolic equations with the fractional Laplacian on $C^{1,1}$ open sets
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