Selberg sieve

In mathematics, in the field of number theory, the Selberg sieve is a technique for estimating the size of "sifted sets" of positive integers which satisfy a set of conditions which are expressed by congruences. It was developed by Atle Selberg in the 1940s.

Description

In terms of sieve theory the Selberg sieve is of combinatorial type: that is, derives from a careful use of the inclusion-exclusion principle. Selberg replaced the values of the Möbius function which arise in this by a system of weights which are then optimised to fit the given problem. The result gives an upper bound for the size of the sifted set.

Let A be a set of positive integers x and let P be a set of primes. For each p in P, let Ap denote the set of elements of A divisible by p and extend this to let Ad the intersection of the Ap for p dividing d, when d is a product of distinct primes from P. Further let A1 denote A itself. Let z be a positive real number and P(z) denote the product of the primes in P which are z. The object of the sieve is to estimate

S(A,P,z) = \left\vert A \setminus \bigcup_{p \mid P(z)} A_p \right\vert .

We assume that |Ad| may be estimated by

 \left\vert A_d \right\vert = \frac{1}{f(d)} X + R_d .

where f is a multiplicative function and X   =   |A|. Let the function g be obtained from f by Möbius inversion, that is

 g(n) = \sum_{d \mid n} \mu(d) f(n/d)
 f(n) = \sum_{d \mid n} g(d)

where μ is the Möbius function. Put

 V(z) = \sum_{\begin{smallmatrix}d < z \\ d \mid P(z)\end{smallmatrix}} \frac{\mu^2(d)}{g(d)} .

Then

 S(A,P,z) \le \frac{X}{V(z)} + O\left({\sum_{\begin{smallmatrix} d_1,d_2 < z \\ d_1,d_2 \mid P(z)\end{smallmatrix}} \left\vert R_{[d_1,d_2]} \right\vert} \right) .

It is often useful to estimate V(z) by the bound

 V(z) \ge \sum_{d \le z} \frac{1}{f(d)} . \,

Applications

References

This article is issued from Wikipedia - version of the Monday, May 05, 2014. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.