Siegel–Walfisz theorem
In analytic number theory, the Siegel–Walfisz theorem was obtained by Arnold Walfisz[1] as an application of a theorem by Carl Ludwig Siegel[2] to primes in arithmetic progressions. It is a refinement both of the prime number theorem and of Dirichlet's theorem on primes in arithmetic progressions.
Statement
Define
- [math]\displaystyle{ \psi(x;q,a) = \sum_{n\,\leq\,x \atop n\,\equiv\,a\!\pmod{\!q}}\Lambda(n), }[/math]
where [math]\displaystyle{ \Lambda }[/math] denotes the von Mangoldt function, and let φ denote Euler's totient function.
Then the theorem states that given any real number N there exists a positive constant CN depending only on N such that
- [math]\displaystyle{ \psi(x;q,a)=\frac{x}{\varphi(q)}+O\left(x\exp\left(-C_N(\log x)^\frac{1}{2}\right)\right), }[/math]
whenever (a, q) = 1 and
- [math]\displaystyle{ q\le(\log x)^N. }[/math]
Remarks
The constant CN is not effectively computable because Siegel's theorem is ineffective.
From the theorem we can deduce the following bound regarding the prime number theorem for arithmetic progressions: If, for (a, q) = 1, by [math]\displaystyle{ \pi(x;q,a) }[/math] we denote the number of primes less than or equal to x which are congruent to a mod q, then
- [math]\displaystyle{ \pi(x;q,a) = \frac{{\rm Li}(x)}{\varphi(q)}+O\left(x\exp\left(-\frac{C_N}{2}(\log x)^\frac{1}{2}\right)\right), }[/math]
where N, a, q, CN and φ are as in the theorem, and Li denotes the logarithmic integral.
See also
References
- ↑ Walfisz, Arnold (1936). "Zur additiven Zahlentheorie. II" (in de). Mathematische Zeitschrift 40 (1): 592–607. doi:10.1007/BF01218882.
- ↑ Siegel, Carl Ludwig (1935). "Über die Classenzahl quadratischer Zahlkörper" (in de). Acta Arithmetica 1 (1): 83–86. http://pldml.icm.edu.pl/pldml/element/bwmeta1.element.bwnjournal-article-aav1i1p83bwm?q=bwmeta1.element.bwnjournal-number-aa-1935-1-1;6.
 |  |
