Strict rearrangement inequalities: nonexpansivity and periodic Gagliardo seminorms

TL;DR

This paper establishes Pólya-Szegő type inequalities for periodic and cylindrical symmetric decreasing rearrangements of functions, analyzing the behavior of the Gagliardo seminorm and exploring cases of equality using nonexpansivity techniques.

Contribution

It introduces new Pólya-Szegő inequalities for specific rearrangements of the Gagliardo seminorm and improves classical nonexpansivity results with a novel proof approach.

Findings

Proved Pólya-Szegő inequalities for periodic rearrangements.

Analyzed cases of equality in rearrangement inequalities.

Provided improved nonexpansivity results with new proof techniques.

Abstract

This paper deals with the behavior of the periodic Gagliardo seminorm under two types of rearrangements, namely under a periodic, and respectively a cylindrical, symmetric decreasing rearrangement. Our two main results are P\'olya-Szeg\H{o} type inequalities for these rearrangements. We also deal with the cases of equality. Our method uses, among others, some classical nonexpansivity results for rearrangements for which we provide some slight improvements. Our proof is based on the ideas of [Frank and Seiringer, Non-linear ground state representations and sharp Hardy inequalities, J. Funct. Anal., 2008], where a new proof to deal with the cases of equality in the nonexpansivity theorem was given, albeit in a special case involving the rearrangement of only one function.