Spaces of variable smoothness and integrability: Characterizations by local means and ball means of differences

TL;DR

This paper characterizes variable smoothness and integrability Besov and Triebel-Lizorkin spaces using classical ball means of differences, extending their understanding from Fourier to time-domain analysis.

Contribution

It provides the first time-domain characterization of these variable exponent spaces via ball means of differences, complementing existing Fourier-based descriptions.

Findings

Spaces can be characterized by local means with Peetre maximal functions.

Results extend to 2-microlocal function spaces with variable integrability.

Characterizations unify Fourier and time-domain approaches for variable smoothness spaces.

Abstract

We study the spaces of Besov and Triebel-Lizorkin type with variable smoothness and integrability as introduced recently by Almeida & H\"ast\"o and Diening, H\"ast\"o & Roudenko. Both scales cover many classical spaces with fixed exponents as well as function spaces of variable smoothness and function spaces of variable integrability. These spaces have been introduced by Fourier analytical tools, as the decomposition of unity. Surprisingly, our main result states that these spaces also allow a characterization in the time-domain with the help of classical ball means of differences. To that end, we first prove a local means characterization for them with the help of the so-called Peetre maximal functions. Our results do also hold for 2-microlocal function spaces with variable integrability which are a slight generalization of generalized smoothness spaces and spaces of variable smoothness.