20101002, 14:14  #1 
Feb 2005
FD_{16} Posts 
sieving primes in arithmetic progressions
Does there exist a fast optimized siever for finding primes in a given arithmetic progression?
That is, for given the parameters A, B along with the range [L,U], such siever should find and report all primes of the form A*k + B in the interval [L,U]. It is not a big deal to write my own siever (based on ala sieve of Eratosthenes or Atkin) but I'd rather use a fast existing siever if there is such a beast. Last fiddled with by maxal on 20101002 at 14:15 
20101002, 14:58  #2 
"Forget I exist"
Jul 2009
Dumbassville
2^{6}·131 Posts 
well to get the candidates just find k such that A*k+B are on the lines 6n+1 or 6n1.

20101002, 16:23  #3 
Jan 2005
Caught in a sieve
18B_{16} Posts 
Hm, that kinda looks like k*2^n+1, doesn't it? I may know something about this.
Let's see...you want to find: k*A+B = 0 (mod P) k*A = B (mod P) k = B*A^1 (mod P) Now, B (mod P) is just PB, assuming B < P. A^1, on the other hand, is a Modular multiplicative inverse. Those take a little more work, but they can be worth it. Especially if A is of a special form that makes it easy. 
20101002, 16:40  #4 
Feb 2005
11·23 Posts 
I'm not asking about the theory, I'm asking about the _software_.

20101002, 16:43  #5 
"Forget I exist"
Jul 2009
Dumbassville
2^{6}·131 Posts 

20101002, 16:44  #6 
"Forget I exist"
Jul 2009
Dumbassville
2^{6}×131 Posts 

20101002, 17:23  #7 
Feb 2005
375_{8} Posts 
science_man_88, I asked concrete question about the software  if you don't know the answer, please don't make irrelevant comments.
And please don't teach me the theory  believe me, I know it well. 
20101002, 17:41  #8 
"Forget I exist"
Jul 2009
Dumbassville
10000011000000_{2} Posts 
look if you want a siever either build one if you can or look as apparently nothing else is what you want so why post it here.

20101003, 13:44  #9 
A Sunny Moo
Aug 2007
USA (GMT5)
3·2,083 Posts 
PrimeGrid did a big search for an AP26 earlier this year; I'm not sure how they went about doing it, but I would assume that a fast sieve was part of it somewhere along the way. You might try asking in their AP26 subproject forum about it.

20101003, 17:13  #10 
Feb 2005
11·23 Posts 
AP26 is irrelevant. I'm not looking for primes forming an arithmetic progression, but primes in the given arithmetic progression (possibly with gaps between them). The latter problem is much simpler than the former one.

20101003, 17:32  #11 
Jun 2003
5·29·37 Posts 
yafu has a high performance SoE. It also (most likely) has routines for modular arithmetic. Should be easy to adapt it for your purpose.

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