Schur multipliers in Schatten-von Neumann classes

Abstract

We establish a rather unexpected and simple criterion for the boundedness of Schur multipliers SM on Schatten p-classes which solves a conjecture proposed by Mikael de la Salle. Given 1 < p < ∞, a simple form our main result reads for Rn × Rn matrices as follows \| SM: Sp Sp \|cb p2p-1 Σ|γ| [n2] +1 \| |x-y||γ| \ | ∂xγ M(x,y) | + | ∂yγ M(x,y) | \ \|∞. In this form, it is a full matrix (nonToeplitz/nontrigonometric) amplification of the H\"ormander-Mikhlin multiplier theorem, which admits lower fractional differentiability orders σ > n2 as well. It trivially includes Arazy's conjecture for Sp-multipliers and extends it to α-divided differences. It also leads to new Littlewood-Paley characterizations of Sp-norms and strong applications in harmonic analysis for nilpotent and high rank simple Lie group algebras.