The impact of Schur multipliers in harmonic analysis and operator algebras

TL;DR

This paper surveys the significant role of Schur multipliers in harmonic analysis and operator algebras, highlighting recent bounds, applications, and novel insights into nonToeplitz multipliers and singular operators.

Contribution

It provides a comprehensive overview of recent developments, including new bounds and connections, in the study of Schur multipliers over the past 15 years.

Findings

Recent bounds on Schatten p-classes

Applications in harmonic analysis on group von Neumann algebras

Connections with highly singular operators from Euclidean harmonic analysis

Abstract

Schur multipliers are basic linear maps on matrix algebras. Their close albeit still intriguing connection with Fourier multipliers establishes a powerful bridge between harmonic analysis and operator algebras. In this paper, we survey their growing impact over the past 15 years. Particular attention will be drawn to recent bounds on Schatten $p$-classes, with far-reaching applications in harmonic analysis on group von Neumann algebras and operator rigidity phenomena for higher-rank Lie groups and lattices. Key novelties arise from new insights into nonToeplitz Schur multipliers and unprecedented connections with highly singular operators from Euclidean harmonic analysis.