20080310, 04:11  #1 
May 2007
Kansas; USA
3^{3}×17×23 Posts 
Sierp base 3 reservations/statuses/primes
Admin edit: Separated Riesel base 3 reservations/statuses/primes posts from Sierp base 3 reservations/status/primes posts.
Sierp base 3 tested by kvalue up to k=2.2M. With help from the top5000 site, ZERO k's REMAIN!! surprised Reserving Sierp base 3 by kvalue from k=2.2M100M. I'll test them all to n=25K if necessary. Gary Last fiddled with by MyDogBuster on 20150824 at 16:46 Reason: Admit edit 
20080310, 22:08  #2  
Jan 2005
479 Posts 
Quote:
The less the merrier... 

20080310, 22:30  #3 
Jan 2005
479 Posts 
I'll be trying out testing Sierp base 3 from k=100M to k=110M (upto n=25k)
(I've tested 100M to 100.01M, and it left zero candidates) 
20080311, 21:47  #4  
May 2007
Kansas; USA
24475_{8} Posts 
Quote:
What helped me out is the top5000 site, which knocked out 4 k's whose first prime was apparently n>87K. The largest prime that I had to personally find was k=966536 at n=49292. I didn't even have to sieve. I just set PFGW to test them all up to n=50K (not the most efficient way, but the most hasslefree). I would then watch it from timetotime and when it hit one that was on the top5000 site, I'd let it doublecheck it to n=25K to see if it found a smaller prime. If not, I'd stop it and start with the next even k. But I've FINALLY hit a snag on one and I'm sieving it now to n=200K. k=2290976 is composite to n=57K. I suppose I should just let it go for now and continue on with so many k's but I'm trying to keep my perfect record intact. (lol) I'll probably try to 'solve' the first 23 of them that go beyond n=50K and that aren't on top5000 by sieving and LLRing but after that, I'll just let them go because it's much more efficient to sieve multiple k's together. I may start a informal 'team drive' for this but without the usual sieved files. We'll just reserve ranges of kvalues and test them up to some predetermined limit using PFGW. n=25K is probably a good choice. Gary 

20080312, 11:33  #5 
Jan 2005
479 Posts 
The way I was thinking about it:
Process a chunk of 1M, 10M or 100M k's to n=25k with pfgw. (On my laptop, it slows down incredably with more then 1M... I'll need to try on my desktop) and report the remaining k's which have no primes upto 25k here. Keep a record of those, and sieve them as we get say 100 of them, and test to 100k The remaining we keep again until we'll have 100 again, and sieve them to n=1M (or 500k, or whichever is the most efficient...) This way, we'll slowly crawl along on the conjecture, and get top5000 primes in the end with enough sieving done. (The numbers are of course variable, and depending on how much is left after the initial sieving, I reckoned 100 is plenty for the time being...) 
20080313, 00:50  #6 
May 2007
Kansas; USA
293D_{16} Posts 
That sounds good to me. Yes, 100 k's at a time for sieving sounds like a good number. Much more just takes too darned long.
I'm being stubborn on my one k=2290976 that I haven't been able to find a prime for yet. I sieved it for n=50K200K and am LLRing it...currently at n=82K with no prime, but I know that's not the most efficient way to do things in the long run. I'll be on vacation in Mexico from 3/133/19. I'll stop k=2290976 in the morning before I leave. I'm hoping to get it up to n=100K. While I'm gone, I'll just set my machine to only search to n=25K and then I'll determine the missing k's when I get back for inclusion in a future 'big sieve'. Gary 
20080324, 00:55  #7 
May 2007
Kansas; USA
3^{3}×17×23 Posts 
Sierp base 3 continues its "perfect" streak with:
2290976*3^94265+1 is prime This was a very lucky find. I had sieved this k to n=200K but only planned to LLR it to n=100K so the prime came just in time. All k's have now been checked to k=2.4M with ZERO k's STILL remaining! Other large first primes for k>2M are: 2257826*3^42721+1 and 2363776*3^20423+1 I've actually tested all k on this base to k=8M and n=25K. There are going to be several k's remaining for k>2.4M but not a huge number of them. I need to do some fancy sorting of output primes files to determine what is left. I'll post the remaining k's later tonight here and on the web pages. When we get to 100 of them, we'll start a mass sieve for n=25K200K or something similar. Gary Last fiddled with by gd_barnes on 20080324 at 00:58 
20080324, 07:01  #8 
May 2007
Kansas; USA
10557_{10} Posts 
I sorted the output primes files for Sierp base 3 up to k=3M tested to n=25K. There are FINALLY 3 k's remaining:
2930054 2949008 2980832 There were 6 k's remaining in my file at n=25K for k=2.4M3M. One was once again knocked out by the top 5000 site: 2621746*3^119335+1 is prime. Two others were multiples of the base but effectively duplicated earlier high primes. I need to come up with a better way to sort these huge primes files because it is taking much too long to parse and sort them in Excel 50000 k's at a time. If anyone has a suggestion, let me know. My testing is past k=8M and it's going to take a long time to sort these things to see what k's don't have primes. k=3M8M is ~2.5M k's and I can't easily get around Excel's 65536line restriction. Gary 
20080324, 07:57  #9 
I ♥ BOINC!
Oct 2002
Glendale, AZ. (USA)
3·7·53 Posts 
Excel 2007: 1,048,576 rows by 16,384 columns, 17,179,869,184 cells.(what a boost!)
That or learn Access Send me a couple small sample files so I can see what you are doing to sort them. Maybe a piece of perl code or something could do it more efficiently... If you are using an Excel formula, then Perl, or something similar, should be able to do the same thing. Last fiddled with by IronBits on 20080324 at 07:59 
20080326, 19:47  #10  
Jan 2006
Hungary
100001100_{2} Posts 
Quote:
ABC2 $b*3^$a1 // {number_primes,$b,1} a: from 1 to 2500 b: from 2 to infintity step 6 ABC2 $b*3^$a1 // {number_primes,$b,1} a: from 1 to 2500 b: from 6 to infintity step 6 This minimizes the duplicate tests:  only even k  no (k mod 3) = 1  no multiples of 3 I like this because I can run the script for as long as I want. For such a gigantic range "Fire and Forget" is very important and maintenance should be as low as possible. When the pfgw.out file gets too large, filter out all the candidates with: grep 25001 pfgw.out This spits out only those k where the n reached 2500. Hope it helps, Willem. 

20080326, 20:38  #11  
May 2007
Kansas; USA
10100100111101_{2} Posts 
Quote:
For Riesel base 3, there are two problems: 1. We do need to test k==(2 mod 3). Only odd k have a trivial factor for base 3 on both sides. so 2*3^n1, 8*3^n1, 14*3^n1, etc. or the equivalent for the Sierp side should be tested. 2. We can't automatically and easily eliminate all k's divisible by 3 because where k*3^n1 only yields a prime at n=1, 3k*3^n1 still has no prime so must be tested. Or if k*3^n1 only yields a prime at n=2, 9k*3^n1 still has no prime so must be tested, etc. It's the multiples of the base (MOB) problem. Can you get around that issue? I know of no command to tell it to ONLY process a 3k if k has a prime for n=1 or to NOT process a 3k if k has a prime for n>1 or k does NOT have a prime! It's a tricky issue to say the least! The script that I use for Sierp base 3 is a simple one that tests everything we need. It does incorrectly duplicate the 3k tests in most cases but correctly processes the 3k's that would be missed by your script: ABC2 $b*3^$a+1 // {number_primes,$b,1} a: from 1 to 25000 b: from 2 to 3574321403229073 step 2 Thanks for the advice on the grep command on the pfgw.out file. I wasn't aware of it. I haven't been creating a pfgw.out results file because it's gets HUGE too quickly and timeconsuming to pull up and review for k's remaining. But this definitely makes the case for creating the file and using it. I'll try that. In a synopsis, I think we have to stick with the script I'm using but I should create a results file and use the grep command on it. Thanks a bunch. That helps a lot. Gary Last fiddled with by gd_barnes on 20080326 at 20:52 

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