Lethbridge Number Theory and Combinatorics Seminar: Nathan Ng
Topic
Mean values of long Dirichlet polynomials
Speakers
Details
A Dirichlet polynomial is a function of the form $A(t)=\sum_{n \le N} a_n n^{-it}$ where $a_n$ is a complex sequence, $N \in \mathbb{N}$, and $t \in \mathbb{R}$.
For $T \ge 1$, the mean values
$$\int_{0}^{T} |A(t)|^2 \, dt$$
play an important role in the theory of L-functions. I will discuss work of Goldston and Gonek on how to evaluate these integrals in the case that $T < N < T^2$. This will depend on the correlation sums \[
\sum_{n \le x} a_n a_{n+h} \text{ for } h \in \mathbb{N}.
\]
If time permits, I will discuss a conjecture of Conrey and Keating in the case that $a_n$ corresponds to a generalized divisor function and $N > T$.
For $T \ge 1$, the mean values
$$\int_{0}^{T} |A(t)|^2 \, dt$$
play an important role in the theory of L-functions. I will discuss work of Goldston and Gonek on how to evaluate these integrals in the case that $T < N < T^2$. This will depend on the correlation sums \[
\sum_{n \le x} a_n a_{n+h} \text{ for } h \in \mathbb{N}.
\]
If time permits, I will discuss a conjecture of Conrey and Keating in the case that $a_n$ corresponds to a generalized divisor function and $N > T$.
Additional Information
Time: 12:00-12:50pm
Location: B543 University Hall
Web page: http://www.cs.uleth.ca/~nathanng/ntcoseminar/
Nathan Ng (University of Lethbridge)
This is a Past Event
Event Type
Scientific, Seminar
Date
January 29, 2018
Time
-
Location