Bourgain-Brezis-Mironescu-Maz'ya-Shaposhnikova limit formulae for fractional Sobolev spaces via interpolation and extrapolation

TL;DR

This paper extends classical limit and convergence formulas for Sobolev spaces to fractional cases using interpolation, introduces new fractional spaces with appropriate seminorms, and disproves a related conjecture.

Contribution

It characterizes interpolation spaces between L^p and fractional Sobolev spaces, extends key limit formulas to fractional settings, and refutes a conjecture on fractional convergence.

Findings

Extended Bourgain-Brezis-Mironescu limit formulas to fractional Sobolev spaces.

Disproved a conjecture on fractional convergence results with classical Gagliardo seminorms.

Provided sharp fractional Sobolev embedding results.

Abstract

The real interpolation spaces between $L^{p}({\mathbb{R}}^{n})$ and $\dot {H}^{t,p}({\mathbb{R}}^{n})$ (resp. $H^{t,p}({\mathbb{R}}^{n})$), $t>0,$ are characterized in terms of fractional moduli of smoothness, and the underlying seminorms are shown to be " the correct" fractional generalization of the classical Gagliardo seminorms. This is confirmed by the fact that, using the new spaces combined with interpolation and extrapolation methods, we are able to extend the Bourgain-Brezis-Mironescu-Maz'ya-Shaposhnikova limit formulae, as well as the Bourgain-Brezis-Mironescu convergence theorem, to fractional Sobolev spaces. On the other hand, we disprove a conjecture of \cite{Braz} suggesting fractional convergence results given in terms of classical Gagliardo seminorms. We also solve a problem proposed in \cite{Braz} concerning sharp forms of the fractional Sobolev embedding.