Spring 2024 Analysis Seminar

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Organizer: Shaoming Guo

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

Time: Wed 3:30--4:30

Room: B223

We can use B223 from 4:30 to 5:00 for discussions after talks.

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
1 We, Jan. 24, 2024
2 We, Jan. 31 Sunggeum Hong Chosun University The Hörmander multiplier theorem for n-linear operators and its applications Andreas
3 We, Feb. 7 Donald Stull University of Chicago Dimensions of pinned distance sets in the plane Betsy, Shaoming, and Jake F.
4 We, Feb. 14
Fr, Feb. 16 Jack Lutz Iowa State University Shaoming department colloquium, 4-5pm
5 We, Feb. 21 Andrei Martinez-Finkelshtein Baylor Zeros of polynomials and free probability Sergey
6 We, Feb. 28 Alex Rutar University of St. Andrews Andreas
7 We, Mar. 6 Song-Ying Li UC-Irvine Xianghong
8 We, Mar. 13
9 We, Mar. 20
10 We, Mar. 27 Spring recess spring recess spring recess
11 We, Apr. 3
12 We, Apr. 10 Victor Bailey University of Oklahoma Betsy
13 We, Apr. 17 Jianhui (Franky) Li Northwestern University Betsy
14 We, Apr. 24
15 We, May 1

Abstracts

Donald Stull

Title: Dimensions of pinned distance sets in the plane

Abstract: In this talk, we discuss recent work on the Hausdorff and packing dimension of pinned distance sets in the plane. Given a point x in the plane , and a subset E , the pinned distance set of E with respect to x is the set of all distances between x and the points of E . An important open problem is understanding the Hausdorff, and packing, dimensions of pinned distance sets. We will discuss ongoing progress on this problem, and present improved lower bounds for both the Hausdorff and packing dimensions of pinned distance sets. We also discuss the computability-theoretic methods used to achieve these bounds.



Andrei Martinez-Finkelshtein

Title: Zeros of polynomials and free probability

Abstract: I will discuss briefly the connections of some problems from the geometric theory of polynomials to notions from free probability, such as free convolution. More specifically, I will illustrate it with two examples: - real zeros of some hypergeometric polynomials, their monotonicity, interlacing, and asymptotics; - flow of zeros of polynomials under iterated differentiation.