Brezis--Seeger--Van Schaftingen--Yung-Type Characterization of Homogeneous Ball Banach Sobolev Spaces and Its Applications

Abstract

Let γ∈R\0\ and X(Rn) be a ball Banach function space satisfying some extra mild assumptions. Assume that =Rn or ⊂Rn is an (,∞)-domain for some ∈(0,1]. In this article, the authors prove that a function f belongs to the homogeneous ball Banach Sobolev space W1,X() if and only if f∈ Lloc1() and λ∈(0,∞)λ \|[∫\y∈:\ |f(·)-f(y)|>λ|·-y|1+γp\ |·-y|γ-n\,dy ]1p\|X()<∞, where p∈[1,∞) is related to X(Rn). This result is of wide generality and can be applied to various specific Sobolev-type function spaces, including Morrey [Bourgain--Morrey-type, weighted (or mixed-norm or variable) Lebesgue, local (or global) generalized Herz, Lorentz, and Orlicz (or Orlicz-slice)] Sobolev spaces, which is new even in all these special cases; in particular, it coincides with the well-known result of H. Brezis, A. Seeger, J. Van Schaftingen, and P.-L. Yung when X():=Lq(Rn) with 1<p=q<∞, while it is still new even when X():=Lq(Rn) with 1≤ p<q<∞.