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2014-09-03, 18:02
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#1 |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
36×13 Posts |
P.I.E.S. - Prime Internet Eisenstein Search
Once upon a time, there was a wonderful "non-boring" prime search project, names P.I.E.S. and its logo was the best of them all!
I've inadvertently revived it recently (D.Broadhurst brought to my attention the Ecclesiastical truth that nothing is new under the sun). Some of the recent primes include these: Code:
Phi(3, -16159^78732) 662674 digits Phi(3, -13617^41472) 342898 digits Phi(3, -9499^41472) 329925 digits Phi(3, -14809^36864) 307485 digits Phi(3, -1925^46656) 306477 digits Phi(3, -12890^36864) 303041 digits Phi(3, -29906^32768) 293324 digits Phi(3, -25719^32768) 289031 digits |
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2014-09-03, 19:09
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#2 |
"Mark"
Apr 2003
Between here and the
143138 Posts |
I remember that project. Whatever happened to Phil Carmody? That was his baby.
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2014-09-03, 19:16
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#3 |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
36·13 Posts |
His CV seems rather current (on his famous website).
Probably gave up primes to further his real work: Tizen, Linux, security... ...and bitter (!). The dude rated >9000 beers. That's awesome. ________________________ P.S. (much later) In November, I received an answer from Phil! He is alive and well, and to use his words, "I like to think of it as taking a break, I'm sure I'll be back some time..." It is a rather long break from anything numerical. Last fiddled with by Batalov on 2014-12-28 at 23:50 Reason: news from Phil |
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2014-12-28, 23:45
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#4 |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
36·13 Posts |
Yves Gallot's Cyclo announced
Yves Gallot independently got interested in this form.
At this time, he wrote a fast (for those who know, like a Genefer_OCL fast!) test implementation for Phi(3*2^n,b). Version 0.1-beta, currently. It runs great! Here is the thread where development news will be announced. (No need to cross-post here; it will be happening there.) |
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2015-01-02, 16:05
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#5 | |
Jun 2003
5,051 Posts |
Quote:
Last fiddled with by axn on 2015-01-02 at 16:06 |
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2015-01-02, 17:42
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#6 |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
947710 Posts |
Optimal depth? I haven't checked systematically.
But in practice, for some ranges I prefactored to 55 bits, or even 59-61 bits (for E-M numbers). I patched only one kernel, so the limit is 63 bits iirc. For the form chosen by Yves, a modification to ppsieve/tpsieve is rather more appropriate (because 2^n is fixed) - to really sieve as opposed to prefactoring. I have not looked into tpsieve source. EDIT: ...Or rather AthGFNSieve ? EDIT 2: ...Or gfnsvCUDA, in fact? Last fiddled with by Batalov on 2015-01-04 at 22:56 |
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2015-01-03, 06:46
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#7 |
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"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
36·13 Posts |
Here are some 1P-4.5P range factors -- for debugging the future CycSvCUDA+, attached.
(these are not all factors, because my prefactoring is not sieveless, and my range is definitely not up to 100M... I aim to run Cyclo only up to 60-100k, so I refactored only that and on CPU, because GPUs are all busy with Cyclo.) |
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2015-01-04, 10:17
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#8 |
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Jun 2003
116738 Posts |
Code:
1000001261273089 | 662808^262144-662808^131072+1 1000006089965569 | 849574^262144-849574^131072+1 1000008375336961 | 455269^262144-455269^131072+1 1000015658483713 | 609424^262144-609424^131072+1 1000041403908097 | 920824^262144-920824^131072+1 1000111040888833 | 919807^262144-919807^131072+1 1000150692790273 | 604203^262144-604203^131072+1 1000162177843201 | 29180^262144-29180^131072+1 1000174155988993 | 787542^262144-787542^131072+1 1000316228861953 | 398024^262144-398024^131072+1 1000349961289729 | 531076^262144-531076^131072+1 1000367180218369 | 411263^262144-411263^131072+1 1000377009831937 | 159202^262144-159202^131072+1 1000382286790657 | 617552^262144-617552^131072+1 1000383456215041 | 875212^262144-875212^131072+1 1000386632613889 | 546295^262144-546295^131072+1 1000397529415681 | 795057^262144-795057^131072+1 1000399998812161 | 866961^262144-866961^131072+1 1000401672339457 | 390886^262144-390886^131072+1 1000405490466817 | 688428^262144-688428^131072+1 1000433433968641 | 615190^262144-615190^131072+1 1000448240910337 | 138781^262144-138781^131072+1 1000484790337537 | 900170^262144-900170^131072+1 1000522517053441 | 562276^262144-562276^131072+1 1000548104404993 | 679006^262144-679006^131072+1 1000582061752321 | 350276^262144-350276^131072+1 1000662300622849 | 660924^262144-660924^131072+1 1000663461396481 | 837503^262144-837503^131072+1 1000665327599617 | 68496^262144-68496^131072+1 1000689321639937 | 860734^262144-860734^131072+1 1000756578091009 | 436685^262144-436685^131072+1 1000782285766657 | 506314^262144-506314^131072+1 1000823339089921 | 312141^262144-312141^131072+1 1000831513264129 | 173543^262144-173543^131072+1 1000832908394497 | 119875^262144-119875^131072+1 1000865864613889 | 224861^262144-224861^131072+1 1000872873295873 | 704347^262144-704347^131072+1 1000890549927937 | 558663^262144-558663^131072+1 1000963792699393 | 839906^262144-839906^131072+1 1001002085646337 | 783593^262144-783593^131072+1 1001055949946881 | 894642^262144-894642^131072+1 1001056090718209 | 944650^262144-944650^131072+1 1001170787106817 | 663236^262144-663236^131072+1 1001192796192769 | 197537^262144-197537^131072+1 1001399841718273 | 564133^262144-564133^131072+1 1001406565711873 | 849776^262144-849776^131072+1 1001418572169217 | 44447^262144-44447^131072+1 1001456317759489 | 764595^262144-764595^131072+1 1001518338932737 | 299751^262144-299751^131072+1 1001569924939777 | 478068^262144-478068^131072+1 1001593326010369 | 261012^262144-261012^131072+1 1001616896950273 | 801407^262144-801407^131072+1 1001676709036033 | 812043^262144-812043^131072+1 1001678214266881 | 128706^262144-128706^131072+1 1001705339092993 | 518811^262144-518811^131072+1 1001713621794817 | 675413^262144-675413^131072+1 1001721493979137 | 255905^262144-255905^131072+1 1001770557112321 | 559012^262144-559012^131072+1 1001789048487937 | 495255^262144-495255^131072+1 1001861382144001 | 82525^262144-82525^131072+1 1001868515868673 | 984503^262144-984503^131072+1 1001907340443649 | 274058^262144-274058^131072+1 1001959949598721 | 642412^262144-642412^131072+1 1001964683919361 | 154312^262144-154312^131072+1 1002008130355201 | 365738^262144-365738^131072+1 1002024444100609 | 759309^262144-759309^131072+1 1002039045783553 | 976621^262144-976621^131072+1 1002062479884289 | 571005^262144-571005^131072+1 1002063413379073 | 164798^262144-164798^131072+1 1002067929071617 | 637688^262144-637688^131072+1 1002081327513601 | 715174^262144-715174^131072+1 1002082203598849 | 553527^262144-553527^131072+1 1002138634813441 | 168077^262144-168077^131072+1 1002141614604289 | 781507^262144-781507^131072+1 1002174755635201 | 403241^262144-403241^131072+1 1002234780057601 | 775690^262144-775690^131072+1 1002236961619969 | 35954^262144-35954^131072+1 1002282297065473 | 218326^262144-218326^131072+1 1002318097809409 | 963807^262144-963807^131072+1 1002318530347009 | 222129^262144-222129^131072+1 1002355201671169 | 116983^262144-116983^131072+1 1002363982970881 | 910301^262144-910301^131072+1 1002380442992641 | 265570^262144-265570^131072+1 1002405397266433 | 857181^262144-857181^131072+1 1002443680776193 | 391413^262144-391413^131072+1 1002455260987393 | 408596^262144-408596^131072+1 1002469296439297 | 572274^262144-572274^131072+1 1002621944463361 | 649746^262144-649746^131072+1 1002623702138881 | 803789^262144-803789^131072+1 1002701292306433 | 599480^262144-599480^131072+1 1002767977021441 | 613955^262144-613955^131072+1 1002785934409729 | 484050^262144-484050^131072+1 1002801935155201 | 609590^262144-609590^131072+1 1002813331341313 | 237504^262144-237504^131072+1 1002906852261889 | 232118^262144-232118^131072+1 1002932443545601 | 667371^262144-667371^131072+1 1002933212676097 | 42134^262144-42134^131072+1 1002946889515009 | 210015^262144-210015^131072+1 1002957273563137 | 709731^262144-709731^131072+1 1002977974812673 | 411432^262144-411432^131072+1 1003010488270849 | 517560^262144-517560^131072+1 1003098958725121 | 292353^262144-292353^131072+1 1003119180251137 | 806150^262144-806150^131072+1 1003140936892417 | 67015^262144-67015^131072+1 1003188995751937 | 977256^262144-977256^131072+1 1003210635214849 | 696010^262144-696010^131072+1 1003217749278721 | 537885^262144-537885^131072+1 1003222361702401 | 999668^262144-999668^131072+1 1003282991677441 | 618808^262144-618808^131072+1 1003308586893313 | 596060^262144-596060^131072+1 1003339550294017 | 468605^262144-468605^131072+1 1003356837642241 | 164382^262144-164382^131072+1 1003393092157441 | 843541^262144-843541^131072+1 1003393776353281 | 609351^262144-609351^131072+1 1003401657188353 | 315451^262144-315451^131072+1 1003417320554497 | 372292^262144-372292^131072+1 1003526908280833 | 827323^262144-827323^131072+1 1003556045586433 | 480595^262144-480595^131072+1 1003583148392449 | 452113^262144-452113^131072+1 1003583805849601 | 308705^262144-308705^131072+1 1003589516132353 | 892284^262144-892284^131072+1 1003635151208449 | 970300^262144-970300^131072+1 1003679915704321 | 30921^262144-30921^131072+1 1003727271493633 | 286751^262144-286751^131072+1 1003781934809089 | 627902^262144-627902^131072+1 1003850044538881 | 935433^262144-935433^131072+1 1003907933798401 | 680022^262144-680022^131072+1 1003908128833537 | 647373^262144-647373^131072+1 1003923660865537 | 638575^262144-638575^131072+1 1004079219474433 | 290709^262144-290709^131072+1 1004149336178689 | 484503^262144-484503^131072+1 1004241316478977 | 997454^262144-997454^131072+1 1004256750993409 | 83491^262144-83491^131072+1 1004297654894593 | 826337^262144-826337^131072+1 1004315414102017 | 600448^262144-600448^131072+1 1004371356942337 | 75431^262144-75431^131072+1 1004378840629249 | 959367^262144-959367^131072+1 1004493766656001 | 242570^262144-242570^131072+1 1004516072226817 | 168416^262144-168416^131072+1 1004528376741889 | 176092^262144-176092^131072+1 1004537894141953 | 899486^262144-899486^131072+1 1004576235061249 | 753402^262144-753402^131072+1 1004588756631553 | 708182^262144-708182^131072+1 1004760806719489 | 742124^262144-742124^131072+1 1004785497538561 | 417941^262144-417941^131072+1 1004806959267841 | 311457^262144-311457^131072+1 1004848089661441 | 249561^262144-249561^131072+1 1004902519406593 928.8/s (2.2P/day) Found 147 ETA 10h57m Termination requested |
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2015-01-04, 10:39
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#9 |
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"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
224058 Posts |
Looks legit ;-)
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2015-01-04, 11:26
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#10 |
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Jun 2003
5,051 Posts |
I will post a win32 binary later (once I've completed some more testing). It should complete a range 50% faster than GFN sieve (on account of the factor form k.3.2^n+1 as opposed to k.2^(n+1)+1)
Serge, would you be able to test it on Windows? |
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2015-01-04, 14:35
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#11 |
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"Mark"
Apr 2003
Between here and the
143138 Posts |
If you run these thru pfgw 3.7.8, it will validate them. Run you file as "pfgw factors.txt" and if all lines return "is Zero", then they are valid factors.
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