# Dyadic harmonic analysis and weighted inequalities: the sparse   revolution

**Authors:** Mar\'ia Cristina Pereyra

arXiv: 1812.00850 · 2018-12-04

## TL;DR

This paper surveys the development of dyadic harmonic analysis and sparse domination techniques, highlighting their role in establishing weighted inequalities for Calderón-Zygmund operators and their impact on modern harmonic analysis.

## Contribution

It provides a comprehensive overview of the evolution of dyadic models, sparse domination, and their applications in weighted inequalities, emphasizing recent breakthroughs like the proof of the A2 conjecture.

## Key findings

- Representation of Hilbert transform as dyadic averages
- Development of sparse domination methods
- Proof of the A2 conjecture using dyadic techniques

## Abstract

We will introduce the basics of dyadic harmonic analysis and how it can be used to obtain weighted estimates for classical Calder\'on-Zygmund singular integral operators and their commutators. Harmonic analysts have used dyadic models for many years as a first step towards the understanding of more complex continuous operators. In 2000 Stefanie Petermichl discovered a representation formula for the venerable Hilbert transform as an average (over grids) of dyadic shift operators, allowing her to reduce arguments to finding estimates for these simpler dyadic models. For the next decade the technique used to get sharp weighted inequalities was the Bellman function method introduced by Nazarov, Treil, and Volberg, paired with sharp extrapolation by Dragi\v{c}evi\'c et al. Other methods where introduced by Hyt\"onen, Lerner, Cruz-Uribe, Martell, P\'erez, Lacey, Reguera, Sawyer, Uriarte-Tuero, involving stopping time and median oscillation arguments, precursors of the very successful domination by positive sparse operators methodology. The culmination of this work was Tuomas Hyt\"onen's 2012 proof of the $A_2$ conjecture based on a representation formula for any Calder\'on-Zygmund operator as an average of appropriate dyadic operators. Since then domination by sparse dyadic operators has taken central stage and has found applications well beyond Hyt\"onen's $A_p$ theorem. We will survey this remarkable progression and more in these lecture notes.

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## Figures

19 figures with captions in the complete paper: https://tomesphere.com/paper/1812.00850/full.md

## References

190 references — full list in the complete paper: https://tomesphere.com/paper/1812.00850/full.md

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Source: https://tomesphere.com/paper/1812.00850