Spring 2023 Analysis Seminar

From UW-Math Wiki
Revision as of 17:26, 17 February 2023 by Aseeger (talk | contribs)
Jump to navigation Jump to search

Organizer: Shaoming Guo

Email: shaomingguo (at) math (dot) wisc (dot) edu

Time: Tuesdays, 4-5pm

Room: Van Vleck B139

All talks will be in-person unless otherwise specified.

In some cases the seminar may be scheduled at different time to accommodate speakers.

If you would like to subscribe to the Analysis seminar list, send a blank email to analysis+join (at) g-groups (dot) wisc (dot) edu

Date Speaker Institution Title Host(s)
Jan. 24
Jan. 31
Feb. 7 Shaoming Guo UW Madison Hörmander's generalization of the Fourier restriction problem Analysis group
Feb. 14 Diogo Oliveira e Silva Instituto Superior Técnico (Lisboa) The Stein-Tomas inequality: three recent improvements Betsy Stovall, Andreas Seeger
Feb. 21 Jack Burkart UW Madison Sobolev Spaces for General Metric Spaces Analysis group
Feb. 28 Shengwen Gan MIT Analysis group
Mar. 7 Yuqiu Fu MIT Zane Li
Mar. 14 Spring break
Mar. 21 Zhiren Wang Penn State Shaoming Guo, Chenxi Wu
Mar. 28
Apr. 4 Liding Yao Ohio State Brian Street
Apr. 11 Dominique Maldague MIT Betsy Stovall, Andreas Seeger
Apr. 18 David Beltran Universitat de València. Andreas Seeger
Apr. 25 Herve Gaussier Institut Fourier Xianghong Gong, Andy Zimmer
May 2 Lisa Naples Macalester College Jack Burkart


Abstracts

Shaoming Guo

Title: Hormander's generalization of the Fourier restriction problem

Abstract: Hörmander 1973 proposed to study a generalized Fourier extension operator, and asked whether the generalized operator satisfies the same L^p bounds as that of the standard Fourier extension operator. Surprisingly, Bourgain 1991 gave a negative answer to Hörmander’s question. In this talk, I will discuss a modification of Hörmander’s question whose answer may be affirmative. This is a joint work with Hong Wang and Ruixiang Zhang.


Diogo Oliveira e Silva

Title: The Stein-Tomas inequality: three recent improvements

Abstract: The Stein-Tomas inequality dates back to 1975 and is a cornerstone of Fourier restriction theory. Despite its respectable age, it is a fertile ground for current research. The goal of this talk is three-fold: we present a recent proof of the sharp endpoint Stein-Tomas inequality in three space dimensions; we present a variational refinement and withdraw some consequences; and we discuss how to improve the Stein-Tomas inequality in the presence of certain symmetries.



[1] Previous Analysis Seminars

[2] Fall 2022 Analysis Seminar