Mathematical communication

主讲人 Speaker:Yuval Peres, Andrew Best
时间 Time:Fri., 15:30-16:45, Mar. 8-May 10, 2024(updated)
地点 Venue:Shuangqing Complex Building B725
课程日期:2024-03-08~2024-05-10

Note: No lecture on March 15.

The lecture on April 5 will be adjusted to April 7.

Updated: The lectures from May 17 to May 31 originally have been cancelled.


Introduction

We will discuss best practices for writing mathematical papers and giving mathematical lectures. Students will have opportunities to present and get constructive feedback. This will be useful for Quizhen graduate students preparing their thesis for publication and lectures.


Video Public: No

Notes Public: No

Audience: Graduate

Language: English


Lecturer Intro

Yuval Peres obtained his PhD in 1990 from the Hebrew University, Jerusalem. He was a postdoctoral fellow at Stanford and Yale, and was then a Professor of Mathematics and Statistics in Jerusalem and in Berkeley. Later, he was a Principal researcher at Microsoft. Yuval has published more than 350 papers in most areas of probability theory, including random walks, Brownian motion, percolation, and random graphs. He has co-authored books on Markov chains, probability on graphs, game theory and Brownian motion, which can be found at https://www.yuval-peres-books.com. His presentations are available at https://yuval-peres-presentations.com. Dr. Peres is a recipient of the Rollo Davidson prize and the Loeve prize. He has mentored 21 PhD students including Elchanan Mossel (MIT, AMS fellow), Jian Ding (PKU, ICCM gold medal and Rollo Davidson prize), Balint Virag and Gabor Pete (Rollo Davidson prize).
Dr. Peres was an invited speaker at the 2002 International Congress of Mathematicians in Beijing, at the 2008 European congress of Math, and at the 2017 Math Congress of the Americas. In 2016, he was elected to the US National Academy of Science.
Attained PhD in 2021 from the Ohio State University under the supervision of Vitaly Bergelson, then became a postdoc at BIMSA. Works on ergodic theory and its interactions with number theory and additive combinatorics.


Website: https://bimsa.net/activity/MathematicalCommunication