EVENT DETAILS AND ABSTRACT


Dynamical Systems Seminar

Title: A dynamical approach to the asymptotic behavior of the sequence \Omega(n)
Speaker: Kaitlyn Loyd
Speaker Info:
Brief Description:
Special Note:
Abstract:

For $n$ a positive integer, let $\Omega(n)$ denote the number of prime factors of $n$, counted with multiplicity. The study of the asymptotic behavior of $\Omega(n)$ has a rich history, particularly in its applications to number theory. In this talk, I will discuss a recent dynamical approach to the study of $\Omega(n)$, as introduced by Bergelson and Richter. Furthering this approach, I will show that a Pointwise Ergodic Theorem does not hold along $\Omega(n)$. Time permitting, I will also discuss a dynamical sense in which we can consider the Prime Number Theorem and Erdos-Kac Theorem to be disjoint from one another, yielding a number theoretic corollary on the behavior of $\Omega(n)$.
Date: Tuesday, November 09, 2021
Time: 4:00pm
Where: Lunt 104
Contact Person: Aaron Brown
Contact email: awb@northwestern.edu
Contact Phone:
Copyright © 1997-2024 Department of Mathematics, Northwestern University.