  ***   Warning: new stack size = 32000000 (30.518 Mbytes).
[688, 201]
371
1:-0.33333333333333333333333333333333333333
2:0
3:19.233333333333333333333333333333333333
4:0
5:-52083.825396825396825396825396825396826
6:0
7:1357464617.6166666666666666666666666667
8:0
9:-179843066266647.30303030303030303030303
10:0
1:0.33063066328223158676532076242927218282
2:0.65737655586117037348678949547515310666
3:0.83891994700224752688923802043332022788
4:0.92491465281539828015714800144878813258
5:0.96452286982609889100272493876597162334
6:0.98297145977262401505413785166918148202
7:0.99172249343786354566494479026158994548
8:0.99593957135944435652980046461493771761
9:0.99799568488420794431041938185291613541
10:0.99900642043725868624437550798777108358
[441, 365]
0.65054897266021897189117007748600082035 + 0.3797872612825021141546006883142
4264193*I
1.0197948617829165568371172783583479161 + 0.01753787982678033377468853770967
0993444*x - 0.30423568247445724453438996641387297306*x^2 + O(x^3)
-1.0000000000000000000000000000000000000*x^-2 + 0.07281584548367672486058637
5874901319146 + O(x)
2.0000000000000000000000000000000000000*x^-3 + O(x^0)
-0.93754825431584375370257409456786497789 + 1.989280234298901023420858687421
5163815*x^2 - 3.0000729014215224328219706087689241919*x^4 + O(x^6)
1.9892802342989010234208586874215163815 - 6.00014580284304486564394121753784
83837*x^2 + 12.000743196868230785490141705105642696*x^4 + O(x^6)
-2.15800131645680564826065544584339217*x - 2.1019724905481294182200201711445
8153*x^2 - 0.529685033171161239709892386112460416*x^3 - 4.738573771869464928
37424643722475375*x^4 - 3.21952194221326633226406870366478753*x^5 + O(x^6)
-2.15800131645680564826065544584339217 - 4.203944981096258836440040342289163
06*x - 1.58905509951348371912967715833738125*x^2 - 18.9542950874778597134969
857488990150*x^3 - 16.0976097110663316613203435183239376*x^4 - 21.4034953961
473607584436264229933443*x^5 + O(x^6)
  *** lfuncreate: Warning: nonmonic polynomial. Result of the form [nf,c].
1.1179816853477385178979715038469170225
[1, [0, 1], 1, 5]
1.0000000000000000000000000000000000000*x^-2 + 1.154431329803065721213024180
1648048621*x^-1 + O(x^0)
0.61685027506808491367715568749225944596*x^-2 + 1.01511996319472488016374193
63106928091*x^-1 + O(x^0)
1.0000000000000000000000000000000000000*x^-1 + O(x^0)
0.72399875382322394120054853672842760345*x^-1 + O(x^0)
246.96037648704266640450758953126840719
246.96037648704266640450758953126840719
-2.0063564559085848512101000267299604382
1.00000000000000000000000000000000000000000000000000000*x^-1 + O(x^0)
4.59057737496905265921181053582421504989219703475223909 - 3.1894012475791441
3416113592649224080101489871517943905*I
4.59057737496905265921181053582421504989219703475223909 - 3.1894012475791441
3416113592649224080101489871517943905*I
-0.918938533204672741780329736405617639861397473637783413
-0.500000000000000000000000000000000000000000000000000000 - 0.91893853320467
2741780329736405617639861397473637783413*x - 1.00317822795429242560505001336
498021909949745508045994*x^2 - 1.0007851944770424079601768022277292142436346
1138266336*x^3 - 0.999879299500571164957800813655875235912130830621737643*x^
4 - 1.00000194089632045603779988198163183123243380977058752*x^5 - 1.00000130
114601395962431150487297972022050535126287236*x^6 - 0.9999998313841736107799
30217058015406504287266515799803*x^7 - 1.00000000576467597994939441606374165
964458982012538704*x^8 - 1.0000000009110164892314165709218674221759786407713
7178*x^9 - 0.999999999850299240580988626479279942923194971996409274*x^10 - 1
.00000000000940689566566617690964783960902526136635510*x^11 - 1.000000000000
04092582630415831547636589331713210684094*x^12 - 0.9999999999999346009519410
89847743543530991534013594552*x^13 - 1.0000000000000065439687498919193731717
8549879786061140*x^14 - 0.99999999999999969875751286332132050502895615410010
3971*x^15 + O(x^16)
[14.1347251417346937904572519835624702707842571156992432]
[14.1347251417346937904572519835624702707842571156992432]
[14.1347251417346937904572519835624702707842571156992432, 21.022039638771554
9926284795938969027773343405249027818, 25.0108575801456887632137909925628218
186595496725579967]
[-14.1347251417346937904572519835624702707842571156992432, 14.13472514173469
37904572519835624702707842571156992432]
1.64493406684822643647241516664602518921894990120679844
0.E-57
0.E-57 + 0.E-57*I
1.08642943411465667904756436036751417209703758075237284 + 0.5814393878814690
50796952624011344061904995756625692378*I
[0, 0, 0, 2.05247285847993976968922276314372344628278531045671612, 3.2624435
5597875746635580364385504003255536470999182746, 4.47055151331009795091782387
950075730310480986858048883, 4.754431515963405864151635593968863195363908404
79441418, 6.01192275298639519014642522248844223795049139992228727, 6.6225046
1340770678139848771792480632419572890704427238, 7.34281497953964814691434021
056204069773310740821664643, 7.706794648113253444646515057103424471764811099
99985019, 8.47680194262350037741231085806780599121287634323800435, 9.3821789
1117193954907921307162820430752270478042951828, 10.2034632426606570779547130
495062951265229955572895373, 10.49585360108396305215840613479582203063682050
06846644, 11.0334412351426994365984023609574093781284435634924994, 11.686948
0908853117520467071200624951073279924875106987, 12.2872289038249291759599430
438941349597652754843369265, 12.97272258207285515566187612538460946756424085
17308260, 13.1516366031527298638457029894321422485191693385770427, 14.941560
3295484662604761276988412262910822900346167548, 15.5153470765360805167423831
611671659141843411546141532, 15.89479293723708546650440371159237688468390847
47857619, 16.4404849010636539204980820326139388267735297782205584, 16.643129
4008115360154817747496027260477191373350164541, 17.4115213614943714989213104
465137362699445863767902588, 18.07306090799612896897975201392338100448825380
23845260, 18.5597395171897437816282533768115505690861265963563642, 19.031282
9499859520841448378360117311970316861384451388, 19.4973491720207997554477267
895497007883582413152228914, 19.97454966422489875085184165206182695782541275
69183433]
[0, 0, 0, 2.05247285847993976968922276314372344628278531045671612]
[-2.05247285847993976968922276314372344628278531045671612]
[2.05247285847993976968922276314372344628278531045671612]
[-2.05247285847993976968922276314372344628278531045671612, 0, 0, 0, 2.052472
85847993976968922276314372344628278531045671612]
[[1, 25/48, 5/12, 25/48, 1], [1620/691, 1, 9/14, 9/14, 1, 1620/691], 0.00741
542092989613058900642774590022872478364665364735552, 0.005083512108393286860
49429013743874732263404552491812001]
[[1, 10/21, 5/18, 5/24, 5/24, 5/18, 10/21, 1], 1.130264319203497485238782258
42414006077270696235995422]
2.99829512187626747049837118353413149411569186966170254 - 0.0193445925339772
841452384712897772364256641021849529530*I
2.99829512187626747049837118353413149411569186966170254 - 0.0193445925339772
841452384712897772364256641021849529530*I
2.99829512187626747049837118353413149411569186966170254 - 0.0193445925339772
841452384712897772364256641021849529530*I
997
0.177455993247329238699202652214156646711252940222106816
[0.201954787411261026528684690029341772176043691915844168, 0]
0.97906557276284488612288786018111182197046845456987142630213045542848319630
07533965134607035430513178949168014263879
-189
-189
-191
-191
1.97848884347766873530779261857994032392637450942515837 + 0.0609239674747025
097814469640574145327771779577841455860*I
1.30351764627548230978276542627689204122406359796082825 - 0.0344294367015510
576149187463564582588308663091234952457*I
  *** lfunzeros: Warning: lfuninit: insufficient initialization.
[1.76524528537434114004961734014687322242921043467451418, 2.9001948143989959
3853720458684428845871417117642020713, 4.80912824766302432457595530706768541
000593962088321171, 6.05385187632329316110398877826905838861120455439163616,
 7.03104718941202758893296505461247399284219178321418886, 8.0611446646958964
5370426023193369987671312157987402508, 10.4138094136894319447888631663520554
801158568510225716, 11.5429326942529531377771432204175144625871573059960913,
 12.2634871694527156193695773489858842238381199251462399, 13.523913779157256
8249199285782562251878941627912318795, 14.6267210920659865269412411659252020
114704423226886093, 15.2588679023455946128303693291132825994525235298638847,
 17.1471665979791684669746630513532371198945899053737963, 17.924261776515709
3404867459600570383531919623979762348, 19.2057886412953906115542482837931510
878888441286200350]
-189
1.97848884347766873530779261857994032392637450942515837 + 0.0609239674747025
097814469640574145327771779577841455860*I
-191
x^3 - x - 1
Curve y^2+(x^3+x^2+1)*y = x^2+x
-58
Curve y^2+(x^3+1)*y = x^2+x
Curve y^2+(x^2+x)*y = x^6+3*x^5+6*x^4+7*x^3+6*x^2+3*x+1
  *** lfungenus2: Warning: unknown valuation of conductor at 2.
-58
Curve y^2=x^5 + x
-142
[0, 0, -1]
2.1541265970381460760215439978358922308
Curve y^2=x^5 + 1
-139
[0, 0, 1]
1.0314071041733177562983179141216861078
  *** lfungenus2: Warning: unknown valuation of conductor at 2.
[[Vecsmall([15]), [12*x^5 + 12, [[2, 1], [3, 1], [5, 1]]]], 0, [0, 0, 1, 1],
 2, 50625, 0]
Elliptic curves over number fields
-136
1.3894051168795718563026565631765059398
-135
1.7561367497808959311966399691482152395
-135
2.7749792286446646504296418681816946545
-132
4.4552267729872870508917049939747968543
-140
8.2306621809152393859013012963081422203
-2
-22
Grossencharacter
-139
1.0000000000000000000000000000000000000
tensor product
   realbitprecision = 64 significant bits (19 decimal digits displayed)
-65
1.774264741132682166
check all formats
-195
-195
-195
-195
[1, -2, -3, 2, -2, 6, -1, 0, 6, 4]
[1, -1, 1, 1, -1, -1, -1, -1, 1, 1]
[1, -1, 0, 1, 1, 0, 0, -1, 0, -1]
[1, 1, [0]]
[1, 1, [0]]
[496, 2, [0, 1]]
[1, 1, [0]]
-191
1/240
-1/504
1/480
-1/264
691/65520
-1/24
3617/16320
-43867/28728
1.00000000000000000000000000000000000000000000000000000
-1.07637023438345995368832251445133621778701931610742695
0.661475187921069742727520633979626889791045796292710056
0.146374542091265989413000913274996215907067384190621201
0.934830053608610054115427799558087197935200286533499400
0.661475187921069742727520633979626889791045796292710056
[0]
-190
-189
-57
0
0.953260474794660686250509013566383496014986229687151072 + 16.29021572039039
07929631726451921643054665845864660536*I
0
1.00000000000000000000000000000000000000000000000000000
-183
1.00000000000000000000000000000000000000000000000000000
-177
zeta(s-a)
-189
1.00000000000000000000000000000000000000000000000000000*x^-1 + O(x^0)
1.64493406684822643647241516664602518921894990120679844
-189
-0.500000000000000000000000000000000000000000000000000000
1.00000000000000000000000000000000000000000000000000000*x^-1 + O(x^0)
zeta(s)*zeta(s-a)
-185
1.64493406684822643647241516664602518921894990120679844*x^-1 + O(x^0)
1.97730435029729611819708544148512557208215146666013421
-186
-0.822467033424113218236207583323012594609474950603399219
1.20205690315959428539973816151144999076498629234049888*x^-1 + O(x^0)
  *** lfunconductor: Warning: #an = 598 < 1519, results may be imprecise.
61
1.01542133944024439298806668944681826497337332941038810
[[147, 202], [147, 202], [147, 202]]
-189
[[11, 195], [6, 195]]
1
[1171561, 3339]
1
4
857
120
[8, 2108]
[]
[[[1, 0.54657288114990636157071248041210027618*x^-1 + O(x^0)]], [[1, 6.64934
60830715850476062965515423576672*x^-1 + O(x^0)], [0, -6.64934608307158504760
62965515423576672*x^-1 + O(x^0)]]~, 1]
1
5077
725.0000000000000000
[725, -52]
24217.00000000000000
28614069.00000000000
-64
-57
[1, 0, 1, 0, 1, 0, 2, 0, -2, 0]
[1, 1 + 1.732050807568877294*I, 1/2 - 0.8660254037844386468*I, -1 + 1.732050
807568877294*I, -1/2 - 0.8660254037844386468*I, 2, 0, 0, 1 + 1.7320508075688
77294*I, 1 - 1.732050807568877294*I]
[1, -1 - 1.732050807568877294*I, 0.5000000000000000001 + 0.86602540378443864
68*I, -1.000000000000000000 + 1.732050807568877294*I, -1, 1.0000000000000000
00 - 1.732050807568877294*I, -1 + 1.732050807568877294*I, 0, 0.9999999999999
999999 - 1.732050807568877294*I, 1 + 1.732050807568877294*I]
1
[6, 186]
[[12, 125], [11, 125], [5, 124]]
1.000000000000000000
0.83214280825734611779852282418300471522 + 0.0378612661512960987252330268197
96281464*I
0.83214280825734611779852282418300471522 + 0.0378612661512960987252330268197
96281464*I
-125
[1, -127]
1.6449340668482264364724151666460251892
1:-56
2:-35
3:-43
4:-31
5:-38
6:-25
7:-22
0
  *** lfun: Warning: #an = 1 < 5, results may be imprecise.
1.6449321944727952165464885195862083681
0.97075234252284168437606085418663108405 + 0.0794201340278726639136259197680
22884149*I
-125
-123
-122
-147
-124
-125
O(x)
O(x^2)
-0.50000000000000000000000000000000000000
O(x^2)
[0.90384905518988545678200390170972794465 - 2.372435185361247117269703583348
5504030*I, 2.1076105368263265781937945304702732642 + 2.778690871419041003781
6785866162988408*I]
1.3957117832136846124125242709765990227 + 0.19841375090717971815217149623689
183815*I
[1.3957117832136846124125242709765990227 + 0.1984137509071797181521714962368
9183815*I]
[0.98840426632758622164719972283433390539, 0.9884042663275862216471997228343
3390539]
  ***   at top-level: lfuntheta(1,0)
  ***                 ^--------------
  *** lfuntheta: domain error in lfunthetainit: t = 0
  ***   at top-level: lfunhardy(1,I)
  ***                 ^--------------
  *** lfunhardy: incorrect type in lfunhardy (t_COMPLEX).
  ***   at top-level: lfun(1,2,-1)
  ***                 ^------------
  *** lfun: domain error in lfun: D <= 0
  ***   at top-level: lfunan(lfuncreate([1,0,[0],1,1,1,1]),10)
  ***                 ^----------------------------------------
  *** lfunan: incorrect type in vecan_closure (t_INT).
  ***   at top-level: ...t(x^2+1);G=galoisinit(N);lfunartin(N,G,[1]~,2)
  ***                                             ^---------------------
  *** lfunartin: inconsistent dimensions in lfunartin.
  ***   at top-level: ...t(x^2+1);G=galoisinit(N);lfunartin(N,G,[1,1,1]
  ***                                             ^---------------------
  *** lfunartin: inconsistent dimensions in lfunartin.
  ***   at top-level: localbitprec(16);lfun(Lt,12)
  ***                                  ^-----------
  *** lfun: incorrect type in vecan_closure (t_INT).
  ***   at top-level: lfun(L,1)
  ***                 ^---------
  *** lfun: incorrect type in direuler [bad primes] (t_VEC).
  ***   at top-level: lfunzeros(1,[3,1])
  ***                 ^------------------
  *** lfunzeros: incorrect type in lfunzeros (t_VEC).
  ***   at top-level: lfuncreate([errbnr,[[1],[2]]])
  ***                 ^------------------------------
  *** lfuncreate: incorrect type in lfuncreate [different conductors] (t_VEC).
  ***   at top-level: lfuncreate([errG,[[1],[2]]])
  ***                 ^----------------------------
  *** lfuncreate: incorrect type in lfunchiZ (t_VEC).
  ***   at top-level: lfuncreate([errG,[[1,8]~,[1,7]~]])
  ***                 ^----------------------------------
  *** lfuncreate: incorrect type in lfuncreate [different conductors] (t_VEC).
  ***   at top-level: lfuncreate([errG,[[1,8]~,[0,1]~]])
  ***                 ^----------------------------------
  *** lfuncreate: incorrect type in lfuncreate [different conductors] (t_VEC).
  ***   at top-level: lfunorderzero([errG,[[1,8]~,[1,2]~]])
  ***                 ^-------------------------------------
  *** lfunorderzero: incorrect type in lfunorderzero [vector-valued] (t_VEC).
  ***   at top-level: ...z)->1,1],0,[0],1,1,1,1]);lfunan(L,5)
  ***                                             ^-----------
  *** lfunan: incorrect type in vecan_closure (t_VEC).
  ***   at top-level: ...->1,[1]],0,[0],1,1,1,1]);lfunan(L,5)
  ***                                             ^-----------
  *** lfunan: incorrect type in vecan_closure [wrong arity] (t_CLOSURE).
  ***   at top-level: ...->1,[1]],0,[0],1,1,1,1]);lfunan(L,5)
  ***                                             ^-----------
  *** lfunan: incorrect type in vecan_closure (t_INT).
  ***   at top-level: ...1,[2,3]],0,[0],1,1,1,1]);lfunan(L,5)
  ***                                             ^-----------
  *** lfunan: incorrect type in direuler [bad primes] (t_INT).
  ***   at top-level: ...[[2,3]]],0,[0],1,1,1,1]);lfunan(L,5)
  ***                                             ^-----------
  *** lfunan: domain error in direuler: constant term != 1
  ***   at top-level: ...["",3]]],0,[0],1,1,1,1]);lfunan(L,5)
  ***                                             ^-----------
  *** lfunan: incorrect type in gtou [integer >=0 expected] (t_STR).
  ***   at top-level: ...[2,""]]],0,[0],1,1,1,1]);lfunan(L,5)
  ***                                             ^-----------
  *** lfunan: incorrect type in direuler (t_STR).
  ***   at top-level: lfun([[],[""]],1)
  ***                 ^-----------------
  *** lfun: incorrect type in lfunmisc_to_ldata (t_VEC).
  ***   at top-level: lfuneuler(x^2+1,Pi)
  ***                 ^-------------------
  *** lfuneuler: incorrect type in lfuneuler (t_REAL).
  ***   at top-level: lfunthetacost(polcyclo(43))
  ***                 ^---------------------------
  *** lfunthetacost: overflow in lfunthetacost.
  ***   at top-level: lfuncheckfeq(1,I)
  ***                 ^-----------------
  *** lfuncheckfeq: domain error in lfunthetaneed: arg t > 0.7853981633974482790
Total time spent: 4071
