Flag-like singular integrals and associated Hardy spaces on a kind of nilpotent Lie groups of step two

TL;DR

This paper studies flag-like singular integrals on certain step-two nilpotent Lie groups, introducing new geometric and analytical tools, and establishes boundedness and atomic decomposition results for associated Hardy spaces.

Contribution

It develops a lifting method to analyze flag-like singular integrals on step-two nilpotent Lie groups, including new notions like tubes and atoms, and proves boundedness and atomic decomposition results.

Findings

Established Calderón reproducing formula for these groups.

Proved $L^p$ boundedness of flag-like singular integrals.

Provided atomic decomposition of $H^1$ Hardy space.

Abstract

The Cauchy-Szeg\"o singular integral is a fundamental tool in the study of holomorphic $H^p$ Hardy space. But for a kind of Siegel domains, the Cauchy-Szeg\"o kernels are neither product ones nor flag ones on the Shilov boundaries, which have the structure of nilpotent Lie groups $\mathscr N $ of step two. We use the lifting method to investigate flag-like singular integrals on $\mathscr N $, which includes these Cauchy-Szeg\"o ones as a special case. The lifting group is the product $\tilde {\mathscr N }$ of three Heisenberg groups, and naturally geometric or analytical objects on $\mathscr N $ are the projection of those on $\tilde {\mathscr N } $. As in the flag case, we introduce various notions on $\mathscr N $ adapted to geometric feature of these kernels, such as tubes, nontangential regions, tube maximal functions, Littlewood-Paley functions, tents, shards and atoms etc. They have the feature of tri-parameters, although the second step of the group $\mathscr N$ is only $2$-dimensional, i.e. there exists a hidden parameter as in the flag case. We also establish the corresponding Calder\'on reproducing formula, characterization of $ L ^p (\mathscr N)$ by Littlewood-Paley functions, $ L ^p $-boundedness of tube maximal functions and flag-like singular integrals and atomic decomposition of $H^1$ Hardy space on $ {\mathscr N } $.