The CUNY Probability Seminar is typically held on Tuesdays from 4:15 to 5:15 pm at the CUNY Graduate Center Math Department in room 5417. The exact dates, times and locations are mentioned below. If you want to talk at the seminar, or want to be added to/removed from the seminar mailing list, then please contact the Seminar Coordinator.

*Elena Kosygina (*https://www.baruch.cuny.edu/math/elenak/)

## Seminar Schedule:

**Tuesday, January 29, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Jian Ding, University of Pennsylvania

**Title: **Random walk among Bernoulli obstacles

**Abstract: **Consider a discrete time simple random walk on Z^d, d\geq 2 with random Bernoulli obstacles, where the random walk will be killed when it hits an obstacle. We show that the following holds for a typical environment (for which the origin is in an infinite cluster free of obstacles): conditioned on survival up to time n, the random walk will be localized in a single island. In addition, the limiting shape of the island is a ball and the asymptotic volume is also determined. This is based on joint works with Changji Xu. Time permitting, I will also describe a recent result in the annealed case, which is a joint work with Ryoki Fukushima, Rongfeng Sun and Changji Xu.

**Tuesday, February 5, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Louis-Pierre Arguin, Baruch College and the CUNY Graduate Center

**Title: **Moments of the Riemann zeta function on a short interval

**Abstract: **The moments of the Riemann zeta function on the interval [T,2T] on the critical line play a fundamental role in the distribution of the prime numbers. In this talk, we look at the moments of the Riemann zeta function on typical short intervals (but with length diverging with T). We will show that the moments exhibit a freezing phase transition up to a certain interval length akin to the transition seen seen in log-correlated processes. As a consequence we prove the leading order of the maximum of the zeta function on such short intervals. The results generalize a conjecture of Fyodorov & Keating and the related results of Arguin et al. and Najnudel on intervals of length one. Joint work with F. Ouimet and M. Radziwill.

**Tuesday, February 12, 2019, 4:15-5:15** – no seminar (CUNY is closed for Lincoln’s birthday)

**Tuesday, February 19, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Antonia Foldes, College of Staten Island and the CUNY Graduate Center

**Title: **Random walks on some planar structures

**Abstract: ** Link to a PDF

**Tuesday, February 26, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Ramon van Handel, Princeton University

**Title: **Extremals in Minkowski’s inequalities and degenerate diffusions

**Abstract: **In a seminal 1903 paper, Minkowski laid the foundation for the modern theory of convex geometry. In particular, he introduced certain fundamental inequalities that unify and extend may known inequalities such as the isoperimetric inequality, the Brunn-Minkowski inequality, etc. It has been a long-standing problem, dating back to Minkowski’s paper, to characterize the extremals in these inequalities. In this talk, I will explain how this problem in geometry can be settled by connecting it to the study of certain highly degenerate diffusions. No background in geometry will be assumed. (Joint work with Yair Shenfeld).

**Tuesday, March 5, 2019, 4:15-5:15 ** – no seminar ( EC meeting followed by a colloquium)

**Tuesday, March 12, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Si Tang, Lehigh University

**Title: **Frog model on trees with drift

**Abstract: **We provide a uniform upper bound on the minimal drift so that the one-per-site frog model on a d-ary tree is recurrent. To do this, we introduce a subprocess that couples across trees with different degrees. Finding couplings for frog models on nested sequences of graphs is known to be difficult. The upper bound comes from combining the coupling with a new, simpler proof that the frog model on a binary tree is recurrent when the drift is sufficiently strong. This is a joint work with E. Beckman, N. Frank, Y. Jiang, and M. Junge.

**Tuesday, March 19, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Alisa Knizel, Columbia University

**Title: **Generalization of TASEP in continuous inhomogeneous space

**Abstract: **We investigate a new class of exactly solvable particle systems

generalizing the Totally Asymmetric Simple Exclusion Process (TASEP).

One of the features of the particle systems we consider is the

presence of spatial inhomogeneity which can lead to the formation of

traffic jams.

For systems with special step-like initial data, we find explicit

limit shapes, describe their hydrodynamic evolution, and obtain

asymptotic fluctuation results which put our generalized TASEPs into

the Kardar-Parisi-Zhang universality class. At a critical scaling

around a traffic jam we observe deformations of the Tracy-Widom

distribution and the extended Airy kernel.

The exact solvability and asymptotic behavior of generalizations of

TASEP we study are powered by a new nontrivial connection to Schur

measures and processes.

Based on joint work with Leonid Petrov and Axel Saenz.

**Tuesday, March 26, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Jack Hanson, CCNY

**Title: **Universality of the time constant for critical first-passage percolation on the triangular lattice

**Abstract: **We consider first-passage percolation (FPP) on the triangular lattice with vertex weights whose common distribution function F satisfies F(0) = 1/2. This is known as the critical case of FPP because large (critical) zero-weight clusters allow travel between distant points in time which is sublinear in the distance. Denoting by T_n the first-passage time from 0 to the boundary of the box of sidelength n, we show existence of the time constant — the limit of T_n / \log n — and find its exact value to be I / (2 \sqrt{3} pi). (Here I = \inf{x > 0 : F(x) > 1/2}.) This shows that the time constant is universal, in the sense that it is insensitive to most details of F. Furthermore, we find the exact value of the limiting normalized variance, which is also only a function of I, under the optimal moment condition on F.

**Tuesday, April 2, 2019, 4:15-5:15**

**Room 5417**

**Speaker:** Marcus Michelen, University of Pennsylvania

**Title:** Critical and Near-Critical Percolation on Galton-Watson Trees

**Abstract: **Letting denote the probability that the root of tree *T* is contained in an infinite cluster in *p*-percolation, we study the quenched behavior of when *T* is a Galton-Watson tree. For each *k*, a *k*th order Taylor expansion at criticality is obtained almost-surely, with the coefficients given as limits of tree-dependent martingales. Additionally, we construct the incipient infinite cluster on Galton-Watson trees, and prove quenched limit theorems for the size of its layers. Portions are based on joint work with Robin Pemantle and Josh Rosenberg.

**Tuesday, April 9, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Victor de la Pena, Columbia University

**Title: **The Price of Dependence is a Constant

**Abstract: ** In this paper I will introduce a decoupling inequality for concave functions of sums of non-negative variables which (in some sense) supports the title’s claim.

**Tuesday, April 16, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Firas Rassoul-Agha, University of Utah

**Title: **Busemann functions and Gibbs measures in directed polymer models on Z^2.

**Abstract: **We consider random walk in a space-time random potential, also known as directed random polymer measures, on the planar square lattice with nearest-neighbor steps and general i.i.d. weights on the vertices. We construct covariant cocycles and use them to prove new results on existence, uniqueness/non-uniqueness, and asymptotic directions of semi-infinite polymer measures. Along the way, we prove almost sure existence of Busemann function limits in directions where the limiting free energy has some regularity.

**Tuesday, April 23, 2019 – ** Spring recess – no seminar

**Tuesday, April 30, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Larry Goldstein, University of Southern California

**Title: **TBA

**Abstract: **The generalized Dickman distribution with parameter is the unique solution to the distributional equality , where with *W* non-negative with probability one, independent of *W*, and denotes equality in distribution. Members of this family appear in the study of algorithms, number theory, stochastic geometry, and perpetuities.

The Wasserstein distance between such a *W* with finite mean and obeys The specialization of this bound to the case and coupling constructions yield for that where and is the number of comparisons made by the Quickselect algorithm to find the smallest element of a list of *n* distinct numbers.

Joint with Bhattacharjee, using Stein’s method, bounds for Wasserstein type distances can also be computed between and weighted sums arising in probabilistic number theory of the form where is an enumeration of the prime numbers in increasing order and is, for instance, Geometric with parameter .

**Tuesday, May 7, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **Hanbaek Lyu, UCLA

**Title: **TBA

**Abstract: **TBA

**Tuesday, May 14, 2019, 4:15-5:15**

**Room 5417**

**Speaker: **TBA

**Title: **TBA

**Abstract: **TBA