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# Comparison of Sieve of Sundaram and Sieve of Atkin for generating a list of prime numbers

The running time of "sieve of sundaram" for generating a list of prime numbers upto a number n is given O(n*log(n)), according to the link: http://en.wikipedia.org/wiki/Sieve_of_Sundaram. Is this algorithm better than "Sieve of Atkin" and if it is then elaborate a little about how exactly it works?

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What do you mean by better? Better in practice or in theory? – starblue Mar 9 '11 at 21:02
Atkin,Eratosthenes,Sundaram....in that order. – st0le Mar 13 '11 at 9:14
@st0le, can you support putting the Sieve of Atkin (SoA) on top? I have done research for this answer that says that SoA only beats a maximally optimized as to wheel factorization Sieve of Eratosthenes (SoE) in very limited specific cases, and then only by a small margin if at all. The Atkin and Bernstein study was flawed in that they restricted the reference SoE implementation to only the same level of wheel factorization as is inherent to the SoA and corrupted their timing comparison by using a buffer size of 4 KB for SoE and 8 KB for SoA. – GordonBGood Apr 1 '14 at 6:16
cont'd: the biggest problem with both the Sieve's of Atkin and Sundaram is efficient multi-processing as they have an ever increasing number of sequences up to the square root of the sieving range that need new start addresses calculated for every new segment page at an ever increasing computational cost. The Sieve of Eratosthenes has a much lower ratio of sequences only based on the base primes up to the square root of the range, which decrease in density with increasing range. This is also why Daniel Bernstein's "primegen" does not show empirical O(n) performance with increasing range. – GordonBGood Apr 4 '14 at 8:46
@Gordon: Inspecting the source code of primegen shows that Dan Bernstein gave his Atkin implementation a sieve buffer that is four times as big as the one he used for the Eratosthenes foil (2048 * 16 uints vs. 1001 * 8 uints). Also, his implementation approach does not interact well with modern memory cache systems. On this aging Lynnfield a MinGW-built `primespeed` counts the primes up to 10^9 in 0.68 seconds and `eratspeed` takes 0.70 (redirecting to a file!). I can beat that even in C# with an odds-only SoE, without reaching for C/C++ or a mod 30 wheel. – DarthGizka Jun 6 at 11:14

This sieve computes primes up to N using O(N/log log N) operations

This is better than the Sieve of Sundaram, which is Θ(N log N) in operations (note that this is not O(N log N) -- there's a subtle difference between O() and Θ()).

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f(N) = Theta(N log N) implies f(N) = O(N log N). The converse is false though. – Alexandre C. Mar 8 '11 at 17:23
@CanSpice, one has to be careful in using asymptotic computational complexity to choose an algorithm, as one still has to ask "Over what range?" and "What is the speed for a given N?". The Wikipedia article for the Sieve of Sundaram used to say that it can be made to have a O(N) if implemented with hash tables with O(1); however, even if that were true, using hash tables typically has an constant overhead of 10's of times more than not using them so the resulting O(N) algorithm would certainly never catch up to the Sieve of Eratosthenese with O(N Log Log N). – GordonBGood Apr 1 '14 at 7:17
cont'd: The same can be said when comparing the Sieve of Eratosthenese (SoE) to the Sieve of Atkin (SoA) with relative performance of O(N log log N)/O(N) and O(N)/O(N / Log Log N) (pairs of performances for each, with the same optimizations also available for each, none of the 2nd which have ever been practically implemented) in that if the SoA had a higher constant factor overhead than the SoE (which it does when both are maximally optimized), then the SoA can actually be slower than the SoE for practical ranges. Also see this article. – GordonBGood Apr 1 '14 at 8:37

In theory:

• The sieve of Sundaram has an arithmetic complexity O(n log n).
• The basic sieve of Eratosthenes has arithmetic complexity O(n log log n).
• Optimized variants of the sieve of Eratosthenes have arithmetic complexity O(n).
• The sieve of Atkin has not only arithmetic but also bit complexity O(n/log log n).
• A magical sieve where you are given the primes, in order, takes time O(n/log n).

In practice, the sieve of Sundaram is so slow that no one uses it, and the sieve of Atkin is slower than optimized Eratosthenes variants (although it's at least competitive). Perhaps one day Atkin or something else will displace Eratosthenes but it's not likely to happen soon. (Also, there's no such thing as magic.)

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