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

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:

where is Gauss's constant and is the Euler-Mascheroni constant.

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

Graph of the given equation where the straight line represents Sierpiński's constant.

Let r(n)[1] denote the number of representations of  by  squares, then the Summatory Function[2] of has the Asymptotic[3] expansion

,

where  is the Sierpinski constant. The above plot shows

,

with the value of  indicated as the solid horizontal line.

See also

  • 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

  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.
This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.