Stationary random entire functions and related questions

Speaker
Adi Glucksam (University of Toronto)
Date
11/11/2020 - 17:00 - 16:00Add to Calendar 2020-11-11 16:00:00 2020-11-11 17:00:00 Stationary random entire functions and related questions Let T be the action of the complex plane on the space of entire functions defined by translations, i.e T_w takes the entire function f(z) to the entire function f(z+w). B.Weiss showed in `97 that there exists a probability measure defined on the space of entire functions, which is invariant under this action. In this talk I will present optimal bounds on the minimal possible growth of functions in the support of such measures, and discuss other growth related problems inspired by this work. In particular, I will focus on the question of minimal possible growth of frequently oscillating subharmonic functions The talk is partly based on a joint work with L. Buhovsky, A. Logunov, and M. Sodin. Zoom אוניברסיטת בר-אילן - Department of Mathematics mathoffice@math.biu.ac.il Asia/Jerusalem public
Place
Zoom
Abstract

Let T be the action of the complex plane on the space of entire functions defined by translations, i.e T_w takes the entire function f(z) to the entire function f(z+w). B.Weiss showed in `97 that there exists a probability measure defined on the space of entire functions, which is invariant under this action. In this talk I will present optimal bounds on the minimal possible growth of functions in the support of such measures, and discuss other growth related problems inspired by this work. In particular, I will focus on the question of minimal possible growth of frequently oscillating subharmonic functions

The talk is partly based on a joint work with L. Buhovsky, A. Logunov, and M. Sodin.

Last Updated Date : 05/11/2020