Weak endpoint estimates for Calderón-Zygmund operators in von Neumann algebras
José Manuel Conde Alonso (Universidad Autónoma de Madrid)
Abstract: The classical Calderón-Zygmund decomposition is a fundamental tool that helps one study endpoint estimates for numerous operators near L1. In this talk, we will discuss an extension of the decomposition to a particular operator valued setting where noncommutativity makes its appearance. Noncommutativity will allow us to get rid of the -usually necessary- UMD property of the Banach space where functions take values. Based on joint work with L. Cadilhac and J. Parcet.
analysis of PDEsclassical analysis and ODEsfunctional analysismetric geometry
Audience: researchers in the topic
Series comments: Description: A senior graduate student/postdoc series in harmonic analysis, geometric measure theory, and partial differential equations.
Meetings will be weekly, and usually will occur on Monday, with some exceptions. For each talk, the Zoom link is made available in the website too. Contact Bruno Poggi at poggi008@umn.edu if you would like to subscribe to the seminar mailing list.
| Organizers: | Bruno Poggi*, Ryan Matzke, Jose Luis Luna Garcia* |
| *contact for this listing |