Generalized Brezis--Van Schaftingen--Yung Formulae and Their Applications in Ball Banach Sobolev Spaces (2304.00949v1)

Abstract: Let $X$ be a ball Banach function space on $\mathbb{R}^n$. In this article, under some mild assumptions about both $X$ and the boundedness of the Hardy--Littlewood maximal operator on both $X$ and the associate space of its convexification, the authors successfully recover the homogeneous ball Banach Sobolev semi-norm $|\,|\nabla f|\,|X$ via the functional $$ \sup{\lambda\in(0,\infty)}\lambda \left|\left[\int_{{y\in\mathbb{R}^n:\ |f(\cdot)-f(y)|>\lambda|\cdot-y|^{1+\frac{\gamma}{q}}}} \left|\cdot-y\right|^{\gamma-n}\,dy\right]^\frac{1}{q}\right|_X $$ for any distributions $f$ with $|\nabla f|\in X$, as well as the corresponding limiting identities with the limit for $\lambda\to\infty$ when $\gamma\in(0,\infty)$ or the limit for $\lambda\to0^+$ when $\gamma\in(-\infty,0)$, where $\gamma\in\mathbb{R}\setminus{0}$ and where $q\in(0,\infty)$ is related to $X$. In particular, some of these results are still new even when $X:=L^p(X)$ with $p\in[1,\infty)$. As applications, the authors obtain some fractional Sobolev-type and some fractional Gagliardo--Nirenberg-type inequalities in the setting of $X$. All these results are of quite wide generality and are applied to various specific function spaces, including Morrey, mixed-norm (or variable or weighted) Lebesgue, Lorentz, and Orlicz (or Orlicz-slice) spaces, some of which are new even in all these special cases. The novelty of this article is to use both the method of the extrapolation and the boundedness of the Hardy--Littlewood maximal operator on both $X$ and the associate space of its convexification to overcome the essential difficulties caused by the deficiency of both the translation and the rotation invariance and an explicit expression of the norm of $X$.