  ***   Warning: new stack size = 16000000 (15.259 Mbytes).
1
[Mod(5/2*t^2 - 3/8*t + 7/4, t^3 - 2), Mod(3/8*t^2 - 67/16*t - 123/16, t^3 - 
2)]
[Mod(21112/25281*t^2 + 33953/25281*t + 54736/25281, t^3 - 2), Mod(2829824/13
39893*t^2 + 5014079/1339893*t + 5473088/1339893, t^3 - 2)]
[Mod(-t, t^3 - 2), Mod(t, t^3 - 2)]
[]
3*x^4 + Mod(6*t + 6, t^3 - 2)*x^2 + Mod(-12*t - 24, t^3 - 2)*x + Mod(-t^2 - 
2*t - 1, t^3 - 2)
[0, 0, 0, Mod(-3*t^2 + 5184*t, t^3 - 2), Mod(-6912*t^2 + 5971968*t + 4, t^3 
- 2)]
[]
[Mod(0, 5), Mod(0, 5), Mod(0, 5), Mod(4, 5), Mod(0, 5), Mod(0, 5), Mod(3, 5)
, Mod(0, 5), Mod(4, 5), Mod(3, 5), Mod(0, 5), Mod(4, 5), Mod(3, 5), Vecsmall
([3]), [5, [4, 0, [1, 0, 0, 0]]], [0, 0, 0, 0]]
[0, 1, [1/289, 0, 0, 0], 1]
-1.0176096077975699654301625084525458834
[-1, -4, 6]
[6, 18, 12]
[[6], [18], [6, 2]]
6
[1, 0, 0, -2, -1, 0, 0, 0, -2, 0, 0, 0, -3, 0, 0, 4, 6, 0, 0, 2]
[1, 0, 0, -2, -1, 0, 0, 0, -2, 0, 0, 0, -3, 0, 0, 4, 6, 0, 0, 2]
[[65, 18; 0, 1], [1, 0, 0, 0], 2, [[5, [-2, 1]~, 1, 1, [2, -1; 1, 2]], 1; [1
3, [5, 1]~, 1, 1, [-5, -1; 1, -5]], 1], [[1, 5, [1, 0, 0, 0], 1], [1, 6, [1,
 0, 0, 0], 2]]]
[[65, 18; 0, 1], [1/17, 0, 0, 0], 2, [[5, [-2, 1]~, 1, 1, [2, -1; 1, 2]], 1;
 [13, [5, 1]~, 1, 1, [-5, -1; 1, -5]], 1], [[1, 5, [1, 0, 0, 0], 1], [1, 6, 
[1, 0, 0, 0], 2]]]
[[65, 18; 0, 1], [1, 0, 0, 0], 2, [[5, [-2, 1]~, 1, 1, [2, -1; 1, 2]], 1; [1
3, [5, 1]~, 1, 1, [-5, -1; 1, -5]], 1], [[1, 5, [1, 0, 0, 0], 1], [1, 6, [1,
 0, 0, 0], 2]]]
[-1, [5]]
[0, [10]]
[-4, [30]]
[5, [5], [[0, x + 1]]]
[8, [8], [[x + 2, 1]]]
[209844281664738990, [209844281664738990]]
[Mod(4*a + 29580, a^2 - 870), Mod(-56550*a - 218426550, a^2 - 870), Mod(5220
*a + 24220800, a^2 - 870), Mod(433703700*a - 321905785500, a^2 - 870), Mod(3
0478152852000*a + 1290691561617000, a^2 - 870)]
[Mod(4*a + 29580, a^2 - 870), Mod(-56550*a - 218426550, a^2 - 870), Mod(5220
*a + 24220800, a^2 - 870), Mod(433703700*a - 321905785500, a^2 - 870), Mod(3
0478152852000*a + 1290691561617000, a^2 - 870)]
[1/20880, 0, 0, 0]
[Mod(0, a^2 - 870), Mod(0, a^2 - 870), Mod(0, a^2 - 870), Mod(a, a^2 - 870),
 Mod(1, a^2 - 870)]
[Mod(1/20880*a, a^2 - 870), Mod(-1/501120*a - 41/167040, a^2 - 870), Mod(-1/
10440*a - 17/24, a^2 - 870), Mod(5011/3487795200*a + 2077/12026880, a^2 - 87
0)]
[0, 1]~
[1/30, 0, 0, 0]
1
1:12.829972218867343164701716427521360348
2:12.829972218867343164701716427521360348
3:12.829972218867343164701716427521360348
[1, 0, 0, 0]
[[64000001644800020229280152976800751644426376663403572812780612976355750337
16572028, 0; 0, 640000016448000202292801529768007516444263766634035728127806
1297635575033716572028], [1, 0, 0, 0], 6, [[2, [0, 1]~, 2, 1, [0, 870; 1, 0]
], 4; [10000000019, [10000000019, 0]~, 1, 2, 1], 2; [20000000089, [200000000
89, 0]~, 1, 2, 1], 2; [40000000520000003750000013929460019555447, [400000005
20000003750000013929460019555447, 0]~, 1, 2, 1], 1], [[4, -1, [1, 1, 1, Mod(
1/435*a + 1, a^2 - 870)], 1], [2, -4, [1, 0, 0, 0], 3], [2, -3, [1, 0, 0, 0]
, 2], [1, 5, [1, 0, 0, 0], 1]]]
39.851140182843701620954357795663570393
[[16000000182400000866400002194880003127714802377096080752773084, 0; 0, 1600
0000182400000866400002194880003127714802377096080752773084], [1, 0, 0, 0], 3
, [[2, [0, 1]~, 2, 1, [0, 870; 1, 0]], 4; [7, [-3, 1]~, 1, 1, [3, 870; 1, 3]
], 1; [7, [3, 1]~, 1, 1, [-3, 870; 1, -3]], 1; [103, [-47, 1]~, 1, 1, [47, 8
70; 1, 47]], 1; [103, [47, 1]~, 1, 1, [-47, 870; 1, -47]], 1; [1993, [-685, 
1]~, 1, 1, [685, 870; 1, 685]], 1; [1993, [685, 1]~, 1, 1, [-685, 870; 1, -6
85]], 1; [10000000019, [10000000019, 0]~, 1, 2, 1], 2; [27836679629744327661
656297107448887, [27836679629744327661656297107448887, 0]~, 1, 2, 1], 1], [[
4, -1, [1, 1, 1, Mod(1/435*a + 1, a^2 - 870)], 1], [1, 5, [1, 0, 0, 0], 1], 
[1, 5, [1, 0, 0, 0], 1], [1, 5, [1, 0, 0, 0], 1], [1, 5, [1, 0, 0, 0], 1], [
1, 5, [1, 0, 0, 0], 1], [1, 5, [1, 0, 0, 0], 1], [2, -4, [1, 0, 0, 0], 3], [
1, 5, [1, 0, 0, 0], 1]]]
[1]~
[1]~
[1, [1, 0, 0, 0], 1, matrix(0,2), []]
[[28, 0, 20; 0, 28, 20; 0, 0, 4], [1, 0, 0, 0], 6, [[2, [2, 0, 0]~, 1, 3, 1]
, 2; [7, [1, -3, 0]~, 3, 1, [3, 1, 1; 3, 8, 1; 2, 3, 3]], 2], [[2, -4, [1, M
od(1/8*z^2 + 3/4*z + 2, z^3 - 4*z^2 - 32*z + 64), Mod(1/16*z^2 + 1/4*z, z^3 
- 4*z^2 - 32*z + 64), Mod(7/8*z^2 + 3*z - 4, z^3 - 4*z^2 - 32*z + 64)], 3], 
[2, -1, [1, 0, 0, 0], 2]]]
[Mod(1, a^2 - 17), Mod(2, a^2 - 17), Mod(1, a^2 - 17), Mod(-66585651*a - 274
539700, a^2 - 17), Mod(-600624098797*a - 2476436600713, a^2 - 17)]
[Mod(4*a - 32, a^2 - 17), Mod(-192*a + 972, a^2 - 17), Mod(2*a - 16, a^2 - 1
7), Mod(6688*a - 29440, a^2 - 17)]
[Mod(a, a^2 - 7), Mod(0, a^2 - 7), Mod(0, a^2 - 7), Mod(-9, a^2 - 7), Mod(0,
 a^2 - 7)]
[2, -9, Mod(a, a^2 - 7), 0]
2268
2268
54
54
1
1
[9, [3, 3], [[Mod(-2, a^2 - a + 1), Mod(-3*a + 2, a^2 - a + 1)], [Mod(0, a^2
 - a + 1), Mod(-a + 2, a^2 - a + 1)]]]
[9, [3, 3], [[Mod(-9/4, a^2 - a + 1), Mod(-3*a + 1, a^2 - a + 1)], [Mod(-1/4
, a^2 - a + 1), Mod(-a + 2, a^2 - a + 1)]]]
1.3211372891561117704694923724477608437
1.3211372891561117704694923724477608437
[[3.2454018605082579620032350562420879904 + 1.111397817128820959029052707850
2348351*I, 1.6668632098170830019533312582971884208 - 0.486801726858514320058
78432460464226233*I]]
[[3.2454018605082579620032350562420879904 + 1.111397817128820959029052707850
2348351*I, 1.6668632098170830019533312582971884208 - 0.486801726858514320058
78432460464226233*I]]
[[3.3428093839915903612041140523628625748 - 0.475484699340869907792393249264
58939281*I, 1.8377117333570711477796051427229973887 + 0.56107170810617604791
234131325616570861*I]]
[[3.3428093839915903612041140523628625748 - 0.475484699340869907792393249264
58939281*I, 1.8377117333570711477796051427229973887 + 0.56107170810617604791
234131325616570861*I]]
[3.4324153628883011196857987711414818098]
[3.4324153628883011196857987711414818098]
[[1.4331498327481794699384519990689978958 E-7, -8.90022802078150157827725183
62365500525 E-8*I], [0.14948961573271587735193776533155518448 - 0.0364920854
87651217049327378480123927290*I, 0.025252400424922004835631005650622494292 -
 0.077154497013473286414108150293274820223*I], [71131.7121340703744044981170
95975388071 + 31444.727244680220552887076625190441805*I, 19527.9820807200880
34284003590898052213 - 44174.617547686477264962272970191397890*I]]
81
2
1
[3, [3], [[Mod(75, a^2 - a - 22), Mod(-53*a + 276, a^2 - a - 22)]]]
0.029243259302535776270985513029724899123
0.029243259302535776270985513029724899123
0.029243259302535776270985513029724899123
[[0.36275979223366389123527228531236021016, 0.181379896116831945617636142656
18010508 - 0.98792397441408998992096074875409751608*I], [3.42226903540115887
19775751832202902106, 1.7111345177005794359887875916101451053 - 0.1047197318
4863928069787984196947537734*I]]
[[9.0690068978198926646497340170387502852, 4.5345034489099463323248670085193
751426 - 7.3776203664257126727668408543261959548*I], [-196.67027839726644769
316107917450672666, -98.335139198633223846580539587253363331 + 7.85398337930
14079898062379028921755190*I]]
[0.35837909570111076671922166110255577349, 0.3583790957011107667192216611025
5577349]
89
4
1
[10, [10], [[Mod(a^2, a^3 - a^2 + 1), Mod(-2*a^2 + 1, a^3 - a^2 + 1)]]]
0.33753547062081148560344962283967451355
[[3.5491769254598924808129220481653238934, -2.542655659111084982919736837317
6365643*I], [1.9499083977009059175943781181149776030 + 2.8338954531694537916
413166973195484122*I, 3.3837615464515224781027253345320644787 - 0.9298685032
8561627019201162339975284811*I]]
[[0.67178899867737769984191766676172801075, 1.289047377476443975073193849195
0519406*I], [0.59569675561968713991027058840738833243 - 0.784496667533226302
75597445878594696512*I, 0.94830798409984778856147508826172748052 + 0.1986300
0529303555671904142603584000601*I]]
[9.0243347947070770520143614245496848016, 11.4023848644128046507836413961968
47706]

[4 0]

[0 4]


[1 0]

[0 1]

10351

[27  0]

[ 0 27]

0
2.6776858460184521884180352812357212922
-1
2.4789169415611595631185019889765914992
-1
2.7983467075796708218369484107296525132
-1
0.94644710225720189761360064296904262845
1.1306942438544073283221551692300185759
1
1.9118646495040059117224489068629589287
2.3989895152878390668263655479635937156
1
1.1553619177287290907122191262256779900
1.8108719765738961774239981105279304803
1
0.21953076079603813973615927742358668806
-1
0.047510692468775579593867285193171421984
-1
0.35764851040087134693652331655969825373
-1
0.092936445769006934770949560984704427787
-1
0
1
-1
-127
  ***   at top-level: ellinit([Mod(-5*a+12,a^2-a-1),Mod(-10,a^2-a-1)
  ***                 ^----------------------------------------------
  *** ellinit: inconsistent moduli in ellinit: a^2 - a - 1 != a^2 - 11*a - 1
Total time spent: 1571
