I am reading Apostol's "Introduction to Analytic Number Theory". In Chapter 3, he defines Riemann Zeta Function, $\zeta(s)$, by the equation \begin{equation} \zeta(s) = \sum_{n = 1}^{\infty} \frac{1}{n^s} \quad \text{if } s > 1, \end{equation} and by the equation \begin{equation} \zeta(s) = \lim_{x \to \infty} \left( \sum_{n \leq x} \frac{1}{n^s} - \frac{x^{1 - s}}{1 -s} \right) \quad \text{if } 0 < s < 1. \end{equation} Then he derives the following asymptotic formulas. \begin{equation} \label{harmonic_partial_sums} \sum_{n \leq x} \frac{1}{n} = \log x + C + O\left(\frac{1}{x}\right), \end{equation} \begin{equation} \label{1/ns partial sums} \sum_{n \leq x} \frac{1}{n^s} = \zeta(s) + \frac{x^{1 - s}}{1 - s} + O(x^{-s}), \end{equation} where $C$ is the Euler-Mascheroni constant. Looking at these formulas, one might suspect (naively) that \begin{equation} \lim_{s \to 1} \left( \zeta(s) + \frac{x^{1 - s}}{1 -s} \right) = \log x + C. \end{equation} I tried to prove this by going back to the Abel summation formula but came across the integral \begin{equation} \int_{x}^{\infty} \frac{\{t\}}{t^{s+1}} \, dt \end{equation} whose limit does not exist as $s$ approaches $1$. I would highly appreciate if I could know whether the limit exists and if it exists what's its value.
-
$\begingroup$ The limit actually exists when $s\to1$ from the right. $\endgroup$– TravorLZHCommented Jul 19, 2022 at 7:44
1 Answer
The Riemann zeta function has a simple pole at $s=1$, with residue $1$. If you take $x\gt0$ a real number, as I think you are, then: $$\begin{align}\lim_{s\to1}(\zeta(s)+x^{1-s}(1-s)^{-1})&=\lim_{s\to1}\left[\frac{x^{1-s}-1}{1-s}+\underset{\longrightarrow\gamma}{\underbrace{(\zeta(s)-(s-1)^{-1})}}\right]\\&\overset{L.H}=\gamma+\lim_{s\to1}\frac{(-\ln x)x^{1-s}}{-1}\\&=\ln(x)+\gamma\end{align}$$
As you expected, where the constant $C$ is the $\gamma$ the Euler-Mascheroni constant, or the first Stieltjes constant.
To see where these constants are coming from, I will reference for you an answer someone gave me a few months ago, here. No complex analysis is involved, really - you should only understand that "analytic continuation is unique" to understand why Conrad's zeta is the same as your zeta.
$$\gamma=\lim_{n\to\infty}\left[-\ln n+\sum_{m=1}^n\frac{1}{m}\right]$$
-
$\begingroup$ Is there any elementary method to show the limit $\lim_{s \to 1} (\zeta(s) - (s-1)^{-1}) = \gamma$. $\endgroup$– RyanCommented Jul 19, 2022 at 8:49
-
$\begingroup$ @MuhammadAtifZaheer Please see the answer I linked, it is as elementary as it could reasonably get. The thing is about the zeta function, there are a gazillion different representations, all equivalent on various different domains... sometimes other representations, like Conrad's, are more useful than Apostol's $\endgroup$– FShrikeCommented Jul 19, 2022 at 8:49
-
$\begingroup$ @MuhammadAtifZaheer The main problem with what? $\endgroup$– FShrikeCommented Jul 19, 2022 at 9:51
-
$\begingroup$ I think the main problem is with interchanging the following limits: $\lim_{s \to 1} \lim_{x \to \infty} \sum_{n \leq x} \frac{1}{n^s} + \frac{x^{1-s} - 1}{s - 1} = \lim_{x \to \infty} \lim_{s \to 1} \sum_{n \leq x} \frac{1}{n^s} + \frac{x^{1-s} - 1}{s - 1}$. $\endgroup$– RyanCommented Jul 19, 2022 at 9:53
-
$\begingroup$ The left hand side is $\lim_{s \to 1} \left \{ \zeta(s) - \frac{1}{s - 1} \right \}$ and the right hand side is $\gamma$. $\endgroup$– RyanCommented Jul 19, 2022 at 9:57