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On the blending of real/complex analysis with number theory. The study involves distribution of prime numbers and other problems and helps giving asymptotic estimates to these.

6 votes
2 answers
336 views

Existence of radial limits of products of certain power series and $1-x$

Let $V$ be an arbitrary set of infinitely many positive integers, and let: $$\varsigma_{V}\left(z\right)\overset{\textrm{def}}{=}\sum_{v\in V}z^{v}$$ Let $T_{V}$ denote the set of all $t\in\left[0,1\r …
MCS's user avatar
  • 1,284
5 votes
1 answer
287 views

Overconcentration of Poles on the Circle of Convergence of a Power Series with Bounded Coeff...

Let $V$ be an arbitrary set of infinitely many positive integers, and let: $$\varsigma_{V}\left(z\right)\overset{\textrm{def}}{=}\sum_{v\in V}z^{v}$$ Let $T_{V}$ denote the set of all $t\in\left[0,1\r …
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  • 1,284
3 votes
2 answers
446 views

On the relation between the asymptotics of a Dirichlet series' coefficients and the series' ...

There is a wonderful series of articles by Flajolet et. al. about Mellin Transforms and the asymptotic analysis of generating functions. In particular, on page 45 of the article Mellin Transforms and …
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  • 1,284
2 votes
0 answers
189 views

On a generalization of the Möbius function from number theory

Let $\omega$ be a positive real number, and define: $$\mathbf{1}_{\omega}\left(n\right)\overset{\textrm{def}}{=}\left(-1\right)^{n}\binom{-\omega}{n}=\binom{\omega-1+n}{n}$$ for all positive integers …
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  • 1,284
0 votes
0 answers
98 views

Proportionality constant for the growth rate of $\zeta\left(s\right)$ along the imaginary axis

Going through what it says on page 95 of Titchmarsh's book on the Zeta function, and using his remark about $\mu$ at the bottom of that page, I conclude that there is some constant $C>0$ so that: $$\l …
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  • 1,284