Nonlinear Harmonic Analysis in Sub-Riemannian Geometry

  • Hauer, Daniel (Primary Chief Investigator)
  • Sikora, Adam (Chief Investigator)
  • Portal, Pierre (Chief Investigator)

Project: Research

Project Details

Description

This proposal is devoted to linear and nonlinear harmonic analysis. It aims to unify the most significant attributes of harmonic analysis such as restriction estimates, dispersive properties of differential operators, spectral multipliers, uniform Sobolev estimates and sharp Weyl formula. Such unification will strongly improve tools for mathematical modelling in all areas of technology and science. Notable applications include medical imaging, fluid dynamics and subatomic modelling using quantum interpretation.
It will solve several important open problems in spectral analysis of partial differential operators and develop new cutting-edge techniques in harmonic analysis with application to nonlinear partial differential equations.
Short titleHarmonic Analysis
StatusActive
Effective start/end date1/01/2431/12/27