Higher order fractional weighted homogeneous spaces: characterization and finer embeddings

Abstract

In this article, for N ≥ 2, s ∈ (1,2), p∈ (1, Ns), σ=s-1 and a ∈ [0, N-sp2), we establish an isometric isomorphism between the higher order fractional weighted Beppo-Levi space align* Ds,pa(RN) := Cc∞(RN)[·]s,p,a where [u]s,p,a := ( RN × RN | ∇ u(x) -∇ u(y) |p|x-y |N+σ p \, dx|x|a dy|y|a )1p, align* and higher order fractional weighted homogeneous space align* Ws,pa(RN):= \u ∈ Lap*s(RN): \| ∇ u \|Lap*σ(RN) + [u]s,p,a < ∞ \ align* with the weighted Lebesgue norm align* \| u \|Lap*α(RN):= ( ∫RN |u(x)|p*α|x|2ap*αp \, dx )1p*α, where p*α=NpN-α p for α= s,σ. align* To achieve this, we prove that Cc∞(RN) is dense in Ws,pa(RN) with respect to [·]s,p,a, and [·]s,p,a is an equivalent norm on Ws,pa(RN). Further, we obtain a finer embedding of Ds,pa(RN) into the Lorentz space LNpN-sp-2a, p(RN), where LNpN-sp-2a, p(RN) ⊂neq Lap*s(RN).