Distributional Fractional Gradients and a Bourgain-Brezis-type Estimate

Abstract

In this paper, we extend the definition of fractional gradients found in Mazowiecka-Schikorra to tempered distributions on n, introduce associated regularisation procedures and establish some first regularity results for distributional fractional gradients in L1od. The key feature is the introduction of a suitable space of off-diagonal Schwarz functions Sod(2n), allowing for a dual definition of the fractional gradient on an appropriate space of distributions Sod(2n) by means of fractional divergences defined on Sod(2n). In the course of the paper, we make a first attempt to define Sobolev spaces with negative exponents in this framework and derive a result reminiscent of Bourgain-Brezis and Da Lio-Rivi\`ere-Wettstein in the form of a fractional Bourgain-Brezis inequality for this kind of gradient.