Sierpiński's constant

Sierpiński's constant is a mathematical constant usually denoted as K. One way of defining it is as the following limit:

K=\lim _{n\to \infty }\left[\sum _{k=1}^{n}{r_{2}(k) \over k}-\pi \ln n\right]

where r₂(k) is a number of representations of k as a sum of the form a² + b² for integer a and b.

It can be given in closed form as:

{\begin{aligned}K&=\pi \left(2\ln 2+3\ln \pi +2\gamma -4\ln \Gamma \left({\tfrac {1}{4}}\right)\right)\\&=\pi \ln \left({\frac {4\pi ^{3}e^{2\gamma }}{\Gamma \left({\tfrac {1}{4}}\right)^{4}}}\right)\\&=\pi \ln \left({\frac {e^{2\gamma }}{2G^{2}}}\right)\\&=2.584981759579253217065893587383\dots \end{aligned}}

where $G$ is Gauss's constant and $\gamma$ is the Euler-Mascheroni constant.

Another way to define/understand Sierpiński's constant is,

Let r(n)^[1] denote the number of representations of $n$ by $k$ squares, then the Summatory Function^[2] of $r_{2}(k)/k$ has the Asymptotic^[3] expansion

$\sum _{k=1}^{n}{r_{2}(k) \over k}=K+\pi \ln n+o\surd (1/n)$ ,

where $K=2.5849817596$ is the Sierpinski constant. The above plot shows

$[\sum _{k=1}^{n}{r_{2}(k) \over k}]-\pi \ln n$ ,

with the value of $K$ indicated as the solid horizontal line.

External links[edit]

[1]
http://www.plouffe.fr/simon/constants/sierpinski.txt - Sierpiński's constant up to 2000th decimal digit.
Weisstein, Eric W. "Sierpinski Constant". MathWorld.
OEIS sequence A062089 (Decimal expansion of Sierpiński's constant)
https://archive.lib.msu.edu/crcmath/math/math/s/s276.htm

References[edit]

^ "r(n)". archive.lib.msu.edu. Retrieved 2021-11-30.
^ "Summatory Function". archive.lib.msu.edu. Retrieved 2021-11-30.
^ "Asymptotic". archive.lib.msu.edu. Retrieved 2021-11-30.

This article about a number is a stub. You can help Wikipedia by expanding it.

[1] "r(n)". archive.lib.msu.edu. Retrieved 2021-11-30.

[2] "Summatory Function". archive.lib.msu.edu. Retrieved 2021-11-30.

[3] "Asymptotic". archive.lib.msu.edu. Retrieved 2021-11-30.

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