[was@laptop 02-25-03]$ meccah was@meccah.math.harvard.edu's password: Last login: Tue Feb 25 11:05:49 2003 from h0030bd499247.ne.client2.attbi.com ********************************************************************** Welcome to MECCAH.MATH.HARVARD.EDU Mathematics Extreme Computation Cluster At Harvard 12 Athlon 2000 MP processors (2 are only 1900) master node has 3 GB memory and the other five have 2GB each 3:39pm up 7 days, 27 min, 4 users, load average: 1.36, 1.28, 1.20 75 processes: 71 sleeping, 4 running, 0 zombie, 0 stopped CPU states: 397.5% user, 2.1% system, 299.1% nice, 0.0% idle Mem: 3098528K av, 3088220K used, 10308K free, 0K shrd, 93616K buff Connection to meccah.math.harvard.edu closed. [was@laptop 02-25-03]$ ssh meccah.math.harvard.edu was@meccah.math.harvard.edu's password: Last login: Tue Feb 25 15:37:12 2003 from roam240-72.fas.harvard.edu ********************************************************************** Welcome to MECCAH.MATH.HARVARD.EDU Mathematics Extreme Computation Cluster At Harvard 12 Athlon 2000 MP processors (2 are only 1900) master node has 3 GB memory and the other five have 2GB each 3:39pm up 7 days, 27 min, 4 users, load average: 1.49, 1.32, 1.21 75 processes: 73 sleeping, 2 running, 0 zombie, 0 stopped CPU states: 394.2% user, 2.5% system, 296.8% nice, 0.0% idle Mem: 3098528K av, 3081144K used, 17384K free, 0K shrd, 93624K buff Swap: 4145352K av, 13184K used, 4132168K free 2787392K cached PID USER PRI NI SIZE RSS SHARE STAT N# %CPU %MEM TIME COMMAND 8868 elkies 14 0 6208 6208 156 S 6 99.8 0.2 859:09 gp 3286 rubinste 17 5 34152 33M 212 R N 0 99.6 1.1 1460m Lcalc 3569 mwatkins 19 19 7604 7604 268 S N 4 98.8 0.2 1411m ec 12713 mwatkins 19 19 4484 4484 272 S N 5 98.4 0.1 284:26 ec 15235 was 9 0 912 912 716 R 0 0.1 0.0 0:00 mtop 1 root 9 0 156 124 104 S 0 0.0 0.0 0:13 init 2 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 keventd 3 root 19 19 0 0 0 SWN 0 0.0 0.0 0:01 ksoftirqd_CPU0 4 root 19 19 0 0 0 SWN 0 0.0 0.0 0:01 ksoftirqd_CPU1 5 root 9 0 0 0 0 SW 0 0.0 0.0 1:46 kswapd 6 root 9 0 0 0 0 SW 0 0.0 0.0 0:07 bdflush 7 root 9 0 0 0 0 SW 0 0.0 0.0 0:11 kupdated 8 root -1 -20 0 0 0 SW< 0 0.0 0.0 0:00 mdrecoveryd 9 root 9 0 0 0 0 SW 0 0.0 0.0 1:14 kjournald 10 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 oMfs_main_server 11 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 oM_migd 12 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 oMFS_gc 13 root 9 0 0 0 0 SW 0 0.0 0.0 1:38 oMosix_infod 14 root 9 0 0 0 0 SW 0 0.0 0.0 22:32 memsorter 133 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 kjournald [was@meccah was]$ [was@meccah was]$ more /etc/motd 3:40pm up 7 days, 28 min, 4 users, load average: 1.21, 1.27, 1.19 75 processes: 73 sleeping, 2 running, 0 zombie, 0 stopped CPU states: 393.2% user, 3.3% system, 296.5% nice, 0.0% idle Mem: 3098528K av, 3081716K used, 16812K free, 0K shrd, 93652K buff Swap: 4145352K av, 13184K used, 4132168K free 2787848K cached PID USER PRI NI SIZE RSS SHARE STAT N# %CPU %MEM TIME COMMAND 8868 elkies 15 0 6208 6208 156 S 6 99.7 0.2 859:59 gp 3286 rubinste 19 5 34152 33M 212 R N 0 99.5 1.1 1461m Lcalc 3569 mwatkins 19 19 7608 7608 272 S N 4 98.5 0.2 1412m ec 12713 mwatkins 19 19 4484 4484 272 S N 5 98.5 0.1 285:15 ec 15252 was 9 0 912 912 716 R 0 0.1 0.0 0:00 mtop 1 root 9 0 156 124 104 S 0 0.0 0.0 0:13 init 2 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 keventd 3 root 19 19 0 0 0 SWN 0 0.0 0.0 0:01 ksoftirqd_CPU0 4 root 19 19 0 0 0 SWN 0 0.0 0.0 0:01 ksoftirqd_CPU1 5 root 9 0 0 0 0 SW 0 0.0 0.0 1:46 kswapd 6 root 9 0 0 0 0 SW 0 0.0 0.0 0:07 bdflush 7 root 9 0 0 0 0 SW 0 0.0 0.0 0:11 kupdated 8 root -1 -20 0 0 0 SW< 0 0.0 0.0 0:00 mdrecoveryd 9 root 9 0 0 0 0 SW 0 0.0 0.0 1:14 kjournald 10 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 oMfs_main_server 11 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 oM_migd 12 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 oMFS_gc 13 root 9 0 0 0 0 SW 0 0.0 0.0 1:38 oMosix_infod 14 root 9 0 0 0 0 SW 0 0.0 0.0 22:32 memsorter 133 root 9 0 0 0 0 SW 0 0.0 0.0 0:00 kjournald [was@meccah was]$ gp GP/PARI CALCULATOR Version 2.1.4 (released) i686 running linux (ix86 kernel) 32-bit version (readline v4.2 enabled, extended help available) Copyright (C) 2002 The PARI Group PARI/GP is free software, covered by the GNU General Public License, and comes WITHOUT ANY WARRANTY WHATSOEVER. Type ? for help, \q to quit. Type ?12 for how to get moral (and possibly technical) support. realprecision = 28 significant digits seriesprecision = 16 significant terms format = g0.28 parisize = 4000000, primelimit = 500000 ? 2+2 %1 = 4 ? 200! %2 = 788657867364790503552363213932185062295135977687173263294742533244359449963403342920304284011984623904177212138919638830257642790242637105061926624952829931113462857270763317237396988943922445621451664240254033291864131227428294853277524242407573903240321257405579568660226031904170324062351700858796178922222789623703897374720000000000000000000000000000000000000000000000000 ? exp(2*pi*sqrt(163)) %3 = 1 + 25.53429066960740932342190401*pi + 325.9999999999999999999999999*pi^2 + 2774.726252764005146478513569*pi^3 + 17712.66666666666666666666666*pi^4 + 90456.07584010656777519954237*pi^5 + 384955.2888888888888888888888*pi^6 + 1404222.891613082909272145276*pi^7 + 4481979.434920634920634920634*pi^8 + 12716018.40738513967840887111*pi^9 + 32469451.01742504409171075836*pi^10 + 75371309.10559191882111439971*pi^11 + 160379409.5709176420287531398*pi^12 + 315013420.1079867376369653115*pi^13 + 574546016.7046060582568519074*pi^14 + 978041666.2400350139966732531*pi^15 + O(pi^16) ? exp(2*Pi*sqrt(163)) %4 = 6.892589303610927989108563912 E34 ? exp(Pi*sqrt(163)) %5 = 262537412640768743.9999999996 ? \p200 realprecision = 202 significant digits (200 digits displayed) ? exp(Pi*sqrt(163)) %6 = 262537412640768743.99999999999925007259719818568887935385633733699086270753741037821064791011860731295118134618606450419308388794975386404490572871447719681485232243203911647829148864228272013117831706 ? ? Help topics: 0: list of user-defined identifiers (variable, alias, function) 1: Standard monadic or dyadic OPERATORS 2: CONVERSIONS and similar elementary functions 3: TRANSCENDENTAL functions 4: NUMBER THEORETICAL functions 5: Functions related to ELLIPTIC CURVES 6: Functions related to general NUMBER FIELDS 7: POLYNOMIALS and power series 8: Vectors, matrices, LINEAR ALGEBRA and sets 9: SUMS, products, integrals and similar functions 10: GRAPHIC functions 11: PROGRAMMING under GP 12: The PARI community Further help (list of relevant functions): ?n (1<=n<=11). Also: ? functionname (short on-line help) ?\ (keyboard shortcuts) ?. (member functions) Extended help looks available: ?? (opens the full user's manual in a dvi previ ?? tutorial (same with the GP tutorial) ?? refcard (same with the GP reference card) ?? keyword (long help text about "keyword" from the use ??? keyword (a propos: list of related functions). ? ?5 elladd ellak ellan ellap ellbil ellchangecurve ellchangepoint elleisnum elleta ellglobalred ellheight ellheightmatrix ellinit ellisoncurve ellj elllocalred elllseries ellorder ellordinate ellpointtoz ellpow ellrootno ellsigma ellsub elltaniyama elltors ellwp ellzeta ellztopoint ? E = ellinit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~, 4.2065463159763627835250572371508824063890666162719582885459819612288542979454098882125567994550743541165535487504657365159269382857427748552424835899762955408232269405221786720900968333625907881186170, -2.1032731579881813917625286185754412031945333081359791442729909806144271489727049441062783997275371770582767743752328682579634691428713874276212417949881477704116134702610893360450484166812953940593085 + 1.2143253239437908059099708448904656242775174224374546372083147094027028436808845872273363635444177219195350553450303185723850838007581712590161710057174693057164054228116779686730752542931700755827723*I, -1.2935547796148952674767575125656058188289292574202007881776267707630337472780222252203221439423100134344354521468819923279439072132079403877318494073536119004392958746589543414098820314228108006854624 + 5.83468437 E-203*I, 0.64677738980744763373837875628280290941446462871010039408881338538151687363901111261016107197115500671721772607344099616397195360660397019386592470367680595021964793732947717070494101571140540034273122 - 1.1202513003332802196552063208342852345875379855205660068725503656901943650439353316202484088591955870732115575686621713091279831943779383404849069431366377364187435434689689536526146882794376588783422*I, 5.1081157178325565351221945057517738028777963707532815657289812951371616077491126470842559944733130724777678612149906103762428413907953197072474369664365506506453207997033392382758283309313709740608162] ? E[1] %8 = 0 ? E[2] %9 = 0 ? E[3] %10 = 0 ? E[12] %11 = -432 ? E[13] %12 = 0 ? E.omega %13 = [4.2065463159763627835250572371508824063890666162719582885459819612288542979454098882125567994550743541165535487504657365159269382857427748552424835899762955408232269405221786720900968333625907881186170, -2.1032731579881813917625286185754412031945333081359791442729909806144271489727049441062783997275371770582767743752328682579634691428713874276212417949881477704116134702610893360450484166812953940593085 + 1.2143253239437908059099708448904656242775174224374546372083147094027028436808845872273363635444177219195350553450303185723850838007581712590161710057174693057164054228116779686730752542931700755827723*I] ? ellan(E,50) %14 = [1, 0, 0, 0, 0, 0, -4, 0, 0, 0, 0, 0, 2, 0, 0, 0, 0, 0, 8, 0, 0, 0, 0, 0, -5, 0, 0, 0, 0, 0, -4, 0, 0, 0, 0, 0, -10, 0, 0, 0, 0, 0, 8, 0, 0, 0, 0, 0, 9, 0] ? %14[2] %15 = 0 ? %14[13] %16 = 2 ? v=ellan(E,100000); ? gettime %18 = 1260 ? gettime %19 = 10 ? gettime %20 = 0 ? v=ellan(E,100000); ? gettime %22 = 1230 ? v=ellan(E,500000); *** the PARI stack overflows ! current stack size: 4.0 Mbytes [hint] you can increase GP stack with allocatemem() ? allocatemem() *** Warning: doubling stack size; new stack = 8.0 MBytes. ? allocatemem() *** Warning: doubling stack size; new stack = 16.0 MBytes. ? allocatemem() *** Warning: doubling stack size; new stack = 32.0 MBytes. ? allocatemem() *** Warning: doubling stack size; new stack = 64.0 MBytes. ? v=ellan(E,500000); ? gettime %24 = 16650 ? max(v) *** expected character: ',' instead of: max(v) ^- ? ma matadjoint mathilbert matinverseimage matrixqz matalgtobasis mathnf matisdiagonal matsize matbasistoalg mathnfmod matker matsnf matcompanion mathnfmodid matkerint matsolve matdet matid matmuldiagonal matsolvemod matdetint matimage matmultodiagonal matsupplement matdiagonal matimagecompl matpascal mattranspose mateigen matindexrank matrank max mathess matintersect matrix ? ?max max(x,y): maximum of x and y. ? s=v[1]; for(i=2,500000,if(v[i] > s, s=v[i])); s; ? s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~, 4.2065463159763627835250572371508824063890666162719582885459819612288542979454098882125567994550743541165535487504657365159269382857427748552424835899762955408232269405221786720900968333625907881186170, -2.1032731579881813917625286185754412031945333081359791442729909806144271489727049441062783997275371770582767743752328682579634691428713874276212417949881477704116134702610893360450484166812953940593085 + 1.2143253239437908059099708448904656242775174224374546372083147094027028436808845872273363635444177219195350553450303185723850838007581712590161710057174693057164054228116779686730752542931700755827723*I, -1.2935547796148952674767575125656058188289292574202007881776267707630337472780222252203221439423100134344354521468819923279439072132079403877318494073536119004392958746589543414098820314228108006854624 + 5.83468437 E-203*I, 0.64677738980744763373837875628280290941446462871010039408881338538151687363901111261016107197115500671721772607344099616397195360660397019386592470367680595021964793732947717070494101571140540034273122 - 1.1202513003332802196552063208342852345875379855205660068725503656901943650439353316202484088591955870732115575686621713091279831943779383404849069431366377364187435434689689536526146882794376588783422*I, 5.1081157178325565351221945057517738028777963707532815657289812951371616077491126470842559944733130724777678612149906103762428413907953197072474369664365506506453207997033392382758283309313709740608162] ? gettime; v=ellan(E,5000);gettime %28 = 40 ? ?5 elladd ellak ellan ellap ellbil ellchangecurve ellchangepoint elleisnum elleta ellglobalred ellheight ellheightmatrix ellinit ellisoncurve ellj elllocalred elllseries ellorder ellordinate ellpointtoz ellpow ellrootno ellsigma ellsub elltaniyama elltors ellwp ellzeta ellztopoint ? 34959^92943 %29 = *** user interrupt after 1,280 ms. ? 32^4985 *** user interrupt after 0 ms. ? 34959^92943 %29 = *** user interrupt after 1,260 ms. ? 32^4985 %29 = 14881336074188823301250142239316909522369007580774451005424273778823221863486790717337865567055679961533597997458932439631119848693586468045425163402866111260833691795268801568536584695734303719167662132011843265878042075746263986481796160204820657597688897047847998433337442496951193546508298425887048093938087953196585510623500802004709421238829483328886225868716722702183659951964374759370102301842036130788371672099706901879378300175061845743843768405097659645422332358151819515424493507538690236895333043112482646413126404504016630879340446380627602680749815801281009092137750387027966175585823229947898023384354856847153175434254011165155720544444318907203193025745383342915062070449526402460015702074056008073462298674388056849323056978544914331355322182611627386467763554232758664336950265626466105059353970588059143381000807876818764457067249038519091548255294738774723848288755583295288571305065206343103767551579598302649835944559451158122301566925909251950898893735862331930597379784903909220985484494108830421269717508505921130376544313052793605081234671800690927381660542616374391160462583235176741933596655294347616614101301568822790869661324030300725524706434186306202839199163657922724101988243855807107242076085808150976431386091394821572898981348444593596555186092604564287066931345222842611147509121095194705906626165335418352636300092583885502611187527887534359954941526569645274661893118951449021982768485390266803084902118259566234905982542837041623697161863054787150567513384061537228835792765483688289913391976831744462473703241312354240869665134532640387909122454586390023658243753832555427357259418971914988868390165526718775701937675216286909883007451919685167429260395580413670824999853242538401124166777692081527788526748772415198672712441790921495389338269035345805065293332938332621818674966992075613068220071845643535680829960810451737796114117975535948960174380707525072080716615813314742125211219213900672601780679754319583746243978055650394707235499173495251598744644158512045110491332310211999873209476340560395606584896295301648300017457304406450693822958887201149762647010256534036978665005907586325656563858507613566611310909183182044939142367164993481252146253116223951708379476985404899483071976953920574883403731567165118393589491800601790891642632668542573046804513891399628108331474463939146191944683975891031408111178930541479058728567921150813933173481113422285087124212543107771377318137588255110742648263734687312776848030230916004369535215853929804478952236523904008793083060430235081416831362608779299211007726155569686108390723074927310071218014855934149639690851379102941003797461649480855905399854445884085463802849155406918990087305925736549744589112021865944979810879316991642703313549024695917857149319762045704122982374327867573324390707924080917418653045105201306860394964126478037536849336090831688979226245843588261038291823526758033946075060575728532816184093134462313678369274994577250313493327103966635281682775997870816934472857204644463385874689729311786495294566683995240576080140671923708250725983384738748271226394550386678133869485909020489577756415035294626059164167196685021106060227032562591344608599508829123664752376975307503437816838943051348599562087789494113990364987317643347410571779103151041182926185566515973878270036777234644937341140840782791719500017071310786620333304452104708256341717273218522668711984627574260978501590850750834102025937371590440340344383025172718191035788581883279112900579147797138387830318245403395501584088512430525874691765838734287636882745221332818770496559820156981546538937147537026304142976281540327700700556652292283603230966622365325443675323963151839754907465253178864451327438606166481818524982830489470965354424096709143987331066299633414877119264666742689427670492460811651361759813434690023239604246598094021391999416432344159845369628383977149296950564782244855241237381559884897961419230499234499224386343652985884839371968463703521296881405501377657130688130175815578588178741979026188740952260951097378437261062670807019129214257878572063415967071116974186901094934960994151768608234222927717362200082312909137474116638891898525195280845767695876893808049117098643268409058022132622857551754305846806502240876340334830859476927173940748213774877972565237905614488776296546968369231017156523206409209295701222608330979598496104016000152487360152566382893448141706902116360680326154791069725618484570399963150680578929733412668167405172878615996878223996640843205803930196913366334351423618312026581589625723854477517266491407898265511126400369753179466389990036895943553055895116327066983968132590690828738581067254488344800658411786762844235968557145861384248604772187394020406352858281097140343699954377371339085279756393559520140828624982492185840304150384433188879956493191339636754282539874973205973959933377280541837790965399946847056710295771572938421551206567302253314776087716451456027711129397350706645086364495842977978293618253403738979028936611573458647535671175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? 2003! %30 = 26609864319773565595826461791451157045754470892106063461848572896983723321884833895914901448312126195327736523845749175083922809083548094611135240147096391404980257432377520463591377908469501749851785252166619407025140383166794495513255930722098580236209706987595083583508861861847266505105484008120721314129622552608222769064826004485442846233723582495422304424800511699883951184768786103833329696580156777869587044345859083551427989372337174774741947157234323537040465869156134229985855564112766177768251760118957624472202696770184590819649183472883384806382516829856996292112726886289573496184510700698743152105990143022082528886560955211983646423196950668328923747059919156184980968103933405825876791022953569181941295065142975473079328942697059221833358289881563686433599355570819450305837464882365781699423417657524475824665742855675898899290159467394363886432137808166121211387431969525337470291188850432959680141450338939861523072678783098168215065489497003108236724746977194623755890094505984348157513951671617684753101430031489195087300294019194622998090672139558596869414320999081757178289057254155073934311342315797590265076361569162697557110745664283575101386980278264316168395850724587145850985860136086896819312814994005462812642868310946498347553132861071466155448990926202258346971139395412576202040787884601138575372110195988718654768189217465464616894034382432218732954353510615324035339591886355096323960647561569826533266473166210827276185403935168191322943429950752391501834348205019066794660969559172719648801007738405744013277813512938549165513271505527913308209174138575804169237010273100981364376509078048627737426862804122346487467521804438425288012219454422567112296558925595665015639960890119130064548470201330554764556345211990626534308844493340411825400515492701302397644305841765667492550219321557813767799483882028296840338740225201966556673471111586546584842787484545183633934330514890773874601381301654200906825321508747565983698550168977990808117638337838775383326010063942229447206160630905356160096582520805085491773620988557617158885571500418737960584536104115993789247194760148265788255897606887980629702917127190523364367446570469216794217138410474437214436374277522752262733553177578567634995684732037310918037518090264826069945234139714483531640357423162688388080809389751121903433573149366124390354833379181262830819024476598185962179478064820755847130303871423442456076270724968636406116951927393464504893932141806292516691273883383197674827377033624906341176253134583945153408217531794975883570076216623291528769420226822498199841389701669015726609321312537006918227545343570716939721344578966097605116990736215343938948182023144108181782243125213165114436708709180375454721342885950077003641461693222209697050716475100006941790531431834721347111908000893655551452177424394142268436490295508676988573689209954925912685040004786770746438613757990297586110701257609542242510547117804264382797673748442075328853309738574058555338547096135201027898385940043844898625133500342974617709917636249080385425798143416115097195710619374146987969274815452048586333392627584573103077415751071802470685139034254403305231814516127482222394700930413099461743704489914810743832331973972666867926443686993998035135937114989473407083903431307181510424974170307551329087198293027108102427479344104953453877878226684104359176868049812441904291766987517417332641445118388496074354274996985936466193070380602413111601550827618193327631537447651985069801437470804768765222321654884444383122703293358649704265222487327094768598516817084284805441681643947286354899196435174864125705500336971016683385755207432063738734860270843983482296406084733494748554877145065156331008270172856834283142790204622948655164207323077734756988729279190632421183980562798935568781242440897389592243887460802326780834518972226674205092993076756125024142643583915151878998207988082946451529087483078160384438969614636438092468750099122316988564410695610545751831294376653210610890070300994223438831171061302529431044642292536351717052625724227083450495251177284948979273969802272539619363628570481806812106047441156945078888041752555920790579611229913943236424822790141855838995395843025645616047309888939307290387123064526398426709697076819069769873941707866625793446338766297531577233642695949409645763543518540627463694568482005642544614636150396998352789465329820832930369048447357925898410903395574028487339497118669890071239203101192243824560440676463490548772809381453483915491372024049625583969549753404629248752543622427125317214794509501119927148884073424328460505917460963456434482704829739287470097672576105338885420345782649072559011284670355816308842013086329667592524718895611675348702777912479063132342835905405963961165795696825540437483382872608600368414292615164621338926822771809480058370981897874783202372365280232331803715607076673204566811470288210757313032356727604062114346633924575353230554208394983223904943284191445977522054666488911849992273742920957668498709507024732908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? Log(2003!)/Log(10) *** unknown function or error in formal parameters: Log(2003!)/Log(10)