This page list all events and seminars that take place in the department this week. Please use the form below to choose a different week or date range.

אשנב למתמטיקה

TBA Online

Nov 26, 18:00—19:30, 2024, אולם 101-, בניין מתמטיקה

Speaker

אריאל ידין

AGNT

TBA Online

Nov 27, 14:10—15:10, 2024, -101

Speaker

No Meeting

BGU Probability and Ergodic Theory (PET) seminar

On the local convergence of random Lipschitz functions on regular trees

Nov 28, 11:10—12:00, 2024, -101

Speaker

Yinon Spinka (TAU)

Abstract

A Lipschitz function on a graph G is a function f:V->Z from the vertex set of the graph to the integers which changes by at most 1 along any edge of the graph. Given a finite connected graph G, and fixing the value of the function to be 0 on at least one vertex, we may sample such a Lipschitz function uniformly at random. What can we say about the typical height at a vertex? This depends heavily on G. For example, when G is a path of length n, and the height at one of the endpoints is fixed to be 0, this model corresponds to a simple random walk with uniform increments in {-1,0,1}, and hence the height at the opposite endpoint of the path is typically of order sqrt(n). In this talk, we consider the case when G is a d-regular tree of depth n, and the height at the leaves is fixed to 0. Peled, Samotij and Yehudayoff showed that the height at the root of the tree is tight as n grows, having doubly exponentially decaying tails. We study the question of whether the distribution of the height at the root converges as n tends to infinity. It turns out that the answer depends on d, with a phase transition occurring between d=7 and d=8. We explain the reasons for this and outline some details of the proof. Joint with Nathaniel Butler, Kesav Krishnan and Gourab Ray.


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