[quote=KEP;146406]Here KEP is reporting 196 base 19 sierpinski primes:

[code]737944*19^14099+1
647776*19^14132+1
692164*19^14135+1
418366*19^14298+1
270924*19^14303+1
337306*19^14332+1
526014*19^14333+1
584176*19^14346+1
506214*19^14365+1
618208*19^14372+1
327154*19^14377+1
513036*19^14398+1
478716*19^14412+1
659166*19^14422+1
679066*19^14438+1
511696*19^14498+1
524784*19^14561+1
679986*19^14602+1
478894*19^14607+1
53016*19^14632+1
226714*19^14633+1
683556*19^14716+1
501924*19^14751+1
251988*19^14796+1
281496*19^14826+1
80134*19^14831+1
689646*19^14852+1
266796*19^14886+1
359814*19^14947+1
604266*19^15024+1
615306*19^15038+1
446316*19^15042+1
218116*19^15048+1
17526*19^15052+1
333544*19^15067+1
481804*19^15073+1
422374*19^15079+1
388384*19^15081+1
657306*19^15082+1
33594*19^15089+1
209526*19^15096+1
139674*19^15101+1
245506*19^15110+1
342714*19^15175+1
119716*19^15220+1
226686*19^15228+1
551154*19^15243+1
273976*19^15252+1
116206*19^15286+1
413824*19^15323+1
192456*19^15354+1
255426*19^15438+1
316584*19^15465+1
161094*19^15529+1
284176*19^15544+1
22216*19^15550+1
370606*19^15558+1
123540*19^15562+1
502794*19^15567+1
595134*19^15593+1
461086*19^15686+1
377464*19^15719+1
701584*19^15735+1
762364*19^15751+1
445266*19^15806+1
26176*19^15864+1
373284*19^15873+1
57424*19^15905+1
268386*19^15916+1
704284*19^15927+1
605364*19^15939+1
431826*19^15998+1
741124*19^16009+1
180946*19^16014+1
366654*19^16043+1
296014*19^16117+1
330444*19^16117+1
345066*19^16120+1
692116*19^16150+1
753204*19^16193+1
604894*19^16209+1
376194*19^16263+1
378624*19^16277+1
35974*19^16303+1
385006*19^16310+1
342726*19^16352+1
530116*19^16400+1
105904*19^16439+1
333624*19^16445+1
137416*19^16462+1
311596*19^16498+1
378136*19^16532+1
335226*19^16538+1
32436*19^16588+1
679146*19^16604+1
681886*19^16742+1
161634*19^16745+1
659724*19^16747+1
266136*19^16766+1
447906*19^16770+1
762126*19^16774+1
409216*19^16832+1
286576*19^16848+1
515826*19^16874+1
268944*19^16889+1
160204*19^16939+1
582894*19^16979+1
306526*19^17006+1
720226*19^17012+1
323614*19^17015+1
33504*19^17019+1
340414*19^17033+1
182646*19^17046+1
325084*19^17061+1
339054*19^17233+1
189426*19^17234+1
182224*19^17299+1
373564*19^17313+1
627544*19^17315+1
234636*19^17336+1
438286*19^17346+1
317266*19^17352+1
365886*19^17462+1
529804*19^17479+1
38974*19^17509+1
620346*19^17636+1
615994*19^17695+1
30616*19^17716+1
608064*19^17719+1
155394*19^17765+1
741406*19^17838+1
185404*19^17871+1
49486*19^17910+1
164574*19^18005+1
502276*19^18036+1
12850*19^18046+1
478524*19^18063+1
593904*19^18073+1
744796*19^18092+1
120844*19^18117+1
160794*19^18189+1
262914*19^18275+1
693556*19^18320+1
12720*19^18347+1
639646*19^18352+1
662766*19^18358+1
624406*19^18434+1
650764*19^18439+1
588936*19^18442+1
286*19^18524+1
226876*19^18532+1
472566*19^18626+1
118366*19^18638+1
692656*19^18656+1
724998*19^18671+1
273834*19^18713+1
321226*19^18716+1
445764*19^18717+1
673266*19^18752+1
437086*19^18770+1
495546*19^18788+1
606156*19^18790+1
376626*19^18832+1
494296*19^18934+1
509254*19^19001+1
403164*19^19003+1
526996*19^19012+1
727764*19^19117+1
153574*19^19123+1
673006*19^19144+1
141744*19^19157+1
547474*19^19277+1
182674*19^19323+1
252496*19^19352+1
238846*19^19442+1
348762*19^19478+1
742846*19^19492+1
336004*19^19499+1
626944*19^19635+1
604794*19^19661+1
89674*19^19751+1
315484*19^19819+1
558034*19^19825+1
761466*19^19850+1
361006*19^19932+1
155076*19^19966+1
372846*19^20064+1
162406*19^20174+1
185946*19^20260+1
219966*19^20422+1
283426*19^20472+1
320244*19^20501+1
477334*19^20507+1
87574*19^20511+1
97726*19^20566+1
218466*19^20570+1[/code]

Regards

KEP[/quote]


Thanks KEP. One thing: k=30616 already had a prime at n=13678. Therefore 195 k's are being removed and 1203 k's are remaining.


Gary

Did some OGR the last weeks, but I think I am back now.

Current status:
b17: one k remaining, n ~ 240K
b18: one k remaining, n ~ 235K

[QUOTE=gd_barnes;146463]Thanks KEP. One thing: k=30616 already had a prime at n=13678. Therefore 195 k's are being removed and 1203 k's are remaining.


Gary[/QUOTE]

Thanks for correcting my mistake. Don't really know how this happened, but I guess its a human factor there is to blame, since I manually removed the k's already primed, from the sieve file :smile:

Looking forward to see the update on the website. Also good idea to print out any prime above n=25000 for Riesel base 3, it really makes the conjecture websites more interesting :smile:

KEP!

[quote=rogue;146382]I'm still working on them.



No.[/quote]


Your use of the word 'them' has me confused again since I was only asking about 2 reservations, of which I thought you only had one still reserved. Let me spell it out...I now have you reserved for:

Riesel base 26 (last activity May 9th)
Sierp base 27 (last activity May 8th)

I RELEASED your reservation for:
Riesel based 27

Is that correct?

All these bases on both sides are confusing! (lol)


Thanks,
Gary

[quote=KEP;146506]Thanks for correcting my mistake. Don't really know how this happened, but I guess its a human factor there is to blame, since I manually removed the k's already primed, from the sieve file :smile:

Looking forward to see the update on the website. Also good idea to print out any prime above n=25000 for Riesel base 3, it really makes the conjecture websites more interesting :smile:

KEP![/quote]

The web pages were already updated last night for all of your primes.

I'm confused. There is already a web page of all known Riesel base 3 primes for n>=25K. See the link in the top-10 primes for Riesel base 3 on the main Riesel conjecture web page.

Perhaps you're referring to Sierp base 3. For that, I only list primes for n>=70K. I made the statement previously that it is in 'the works' to list all primes for n>25K for Sierp base 3. It will take me a little while to compile all of the primes from various sources including my laptop and desktop computers and the mini-drive and Karsten's drive here.

For Riesel base 3, I started listing all primes for n>25K right away so I don't have to go back and find them all.

Eventually, I plan to do something similar for all bases...that is list all of the primes of signficant size on a web page for ease of reference in the future. Only having the top 10 is not enough.


Gary

[QUOTE=gd_barnes;146589]Your use of the word 'them' has me confused again since I was only asking about 2 reservations, of which I thought you only had one still reserved. Let me spell it out...I now have you reserved for:

Riesel base 26 (last activity May 9th)
Sierp base 27 (last activity May 8th)

I RELEASED your reservation for:
Riesel based 27

Is that correct?[/QUOTE]

Yes. I intend to continue the other two ranges for a few more weeks (at most) before releasing them, assuming the ranges I am testing have no primes.

Sierp base 12 is at n=195K.

I paused it again to work on higher priority work. Sometime in the next 2 months, I'll put 4 quads on it for 5-6 days and complete it up to n=250K. At an hour per test at n=195K, that's about how much CPU power it will take to get it tested to n=250K.


Gary

i'm testing Riesel Base 15 with my new scripts.
for now i tested n<=1M.

the PRP's with n>500 are attached (smaller availlable on request).

there're 15 k's with no primes for n<15.5k:
[code]
135202
144400
193524
296686
298342
300870
381714
481292
527774
684682
853776
937474
940130
977666
986914[/code]

i'm testing further.
in combination for small n upto about 1000, i have the edit a little the tests with pfgw.
my intention:
with [b]one[/b] command/batch test a wide k-range standalone, running till end without any work by hand.
for now the deeper sieve have to manage per hand, all others is ok so far.

i am testing riesel base 15 1M>k<=2M
i have used the pfgw script that Siemelink posted in the Starting your own base 101 thread to test to n=1k after this i had 215ks left
after that i am using kar_bons fixed script to llr it
at n=2k i had 97ks left and at n=3k i have 53 ks remaining
i havent tested the prps to see if they are prime yet i will do that tomorrow

base 25 riesel
 

Here are the base 25 Riesel primes that I found between n = 22,000 and 25,000:
308268*25^22760-1
319548*25^23475-1
174708*25^23999-1
229932*25^24525-1
95874*25^24566-1
212382*25^24821-1
121566*25^24993-1

They were confirmed with PFGW.

Cheers, Willem.

base 25 riesel
 

Aloha.

I've reached n = 25,000 for my reservation for base 25. I won't be continuing with this one.

Laters, Willem.