# Sieve of Eratosthenes with Wheel Factorization

i'm implementing a reasonably fast prime number generator and i obtained some nice results with a few optimizations on the sieve of eratosthenes. In particular, during the preliminary part of the algorithm, i skip all multiples of 2 and 3 in this way:

``````template<class Sieve, class SizeT>
void PrimeGenerator<Sieve, SizeT>::factorize()
{
SizeT c = 2;
m_sieve[2] = 1;
m_sieve[3] = 1;

for (SizeT i=5; i<m_size; i += c, c = 6 - c)
m_sieve[i] = 1;
}
``````

Here m_sieve is a boolean array according to the sieve of eratosthenes. I think this is a sort of Wheel factorization only considering primes 2 and 3, incrementing following the pattern 2, 4, 2, 4,.. What i would like to do is to implement a greater wheel, maybe considering primes 2,3 and 5. I already read a lot of documentation about it, but I didn't see any implementation with the sieve of eratosthenes... a sample code could help a lot, but also some hints would be nice :) Thanks.

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What is your question? Are you looking for sieve of erathosthenes code? –  Jean-Bernard Pellerin Jul 26 '13 at 23:00
stackoverflow.com/questions/8341295/… has a Haskell implementation in answers. –  Ziyao Wei Jul 26 '13 at 23:00
I'm sorry if i wasn't clear: I would like to skip all multiples of 2,3 and 5, like I already do for multiples of 2 and 3. And no, I don't need sieve of eratosthenes code –  Crybot Jul 26 '13 at 23:02
Separate the mapping of prime candidates (numbers not divisible by you wheels factors) to bits in the sieve from the actual sieving algorithm. A wheel with 2, 3 and 5 is especially convenient, because you get 8 candidates for each segment of 30 numbers, which can conveniently be stored in a byte. –  starblue Jul 28 '13 at 7:28

You can go even further. Here is some OCaml code I wrote a few years ago:

``````let eratosthene borne =
let remove_multiples a lst =
let rec remmult multa li accu = function
[]         -> rev accu
then remmult (a*(hd li)) (tl li)  accu      tail
else remmult   multa        li (head::accu) tail
in
remmult (a * a) lst [] lst
in
let rec first_primes accu ll =
let a = hd ll in
if a * a > borne then (rev accu) @ ll
else first_primes (a::accu) (remove_multiples a (tl ll))
in
let start_list =
(* Hard code of the differences of consecutive numbers that are prime*)
(* with 2 3 5 7 starting with 11... *)
let rec lrec = 2 :: 4 :: 2 :: 4 :: 6 :: 2 :: 6 :: 4 :: 2 :: 4 :: 6
:: 6 :: 2 :: 6 :: 4 :: 2 :: 6 :: 4 :: 6 :: 8 :: 4 :: 2 :: 4 :: 2
:: 4 :: 8 :: 6 :: 4 :: 6 :: 2 :: 4 :: 6 :: 2 :: 6 :: 6 :: 4 :: 2
:: 4 :: 6 :: 2 :: 6 :: 4 :: 2 :: 4 :: 2 :: 10 :: 2 :: 10 :: lrec
and listPrime2357 a llrec accu =
if a > borne then rev accu
else listPrime2357 (a + (num (hd llrec))) (tl llrec) (a::accu)
in
listPrime2357 (num 11) lrec []
in
first_primes [(num 7);(num 5);(num 3);(num 2)] start_list;;
``````

Note the nice trick that OCaml allows for cyclic linked list.

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thank you. I don't know that language, but I'll try to understand :) –  Crybot Jul 26 '13 at 23:05
The important part is the hardcoded list of differences. 2,4,2,4,6 => 11+2 = 3, 13+4=16, 17+2=19, 19+4=23, 23+6=29... I'm removing the multiple of 2 3 5 7 –  hivert Jul 26 '13 at 23:08
is there a way to calculate those values? –  Crybot Jul 26 '13 at 23:10
Yes ! I didn't get those by a miracle ! –  hivert Jul 26 '13 at 23:11
Sorry it was too tempting ;-) Just start with 11, list all the number from 11 to 11+2*3*5*7 which are not divisible by 2,3,5,7 and record the differences. Then it will repeat from 11+2*3*5*7 to 11+(2*3*5*7)*2 and so on... –  hivert Jul 26 '13 at 23:13

2*3*5 = 30
spokes = 2,3,4,5,6,8,9,10,12,15,16,18,20,24,30
numbers between spokes: 1,7,11,13,17,19,23,25,29

``````int[] gaps = [6,4,2,4,2,4,2,4];
int[] primes = [2,3,5];
int max = 9001;
int counter, max_visited;
while(max_visited < max) {
int jump = gaps[counter];
counter = counter + 1 % gaps.length;
max_visited += jump;
}
``````

Does that help?

Alternatively, this might have been what you wanted instead, pseudo-code:

``````primes = [2,3,5];
product = multiply(primes);//imaginary function that returns 30
wheel = new int[product];
foreach(prime in primes)
for(int x = 1; x <= product/prime; x++)
wheel[prime*x] = 1;
return wheel
``````
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Thanks :) it helped –  Crybot Jul 26 '13 at 23:30

Paul Pritchard, an Australian mathematician working for IBM, developed a series of wheel sieves in the 1980s. I discuss one of them at my blog, including examples worked by hand and an implementation in Scheme. It's too big to discuss here. You should be aware that though the asymptotic complexity is less than the Sieve of Eratosthenes, implementation details typically make it slower in practice.

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Thanks for the link, i'll read it ;) –  Crybot Jul 26 '13 at 23:27
Using 2, 3 and 5 I got a speedup of factor 3 in Java. –  starblue Jul 28 '13 at 7:25