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1.6.0-DEV-0669b64613.log
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1.6.0-DEV-0669b64613.log
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Julia Version 1.6.0-DEV.1153
Commit 0669b64613 (2020-10-07 09:01 UTC)
Platform Info:
OS: Linux (x86_64-linux-gnu)
CPU: AMD EPYC 7502 32-Core Processor
WORD_SIZE: 64
LIBM: libopenlibm
LLVM: libLLVM-10.0.1 (ORCJIT, znver2)
Environment:
JULIA_DEPOT_PATH = ::/usr/local/share/julia
JULIA_NUM_THREADS = 2
Resolving package versions...
Installed Antic_jll ─────── v0.2.2+0
Installed MPFR_jll ──────── v4.1.0+1
Installed Arb_jll ───────── v2.18.1+0
Installed LoadFlint ─────── v0.3.3
Installed Requires ──────── v1.1.0
Installed BinaryProvider ── v0.5.10
Installed Nemo ──────────── v0.18.1
Installed Hecke ─────────── v0.8.5
Installed GMP_jll ───────── v6.2.0+2
Installed FLINT_jll ─────── v2.6.3+0
Installed AbstractAlgebra ─ v0.10.0
Updating `~/.julia/environments/v1.6/Project.toml`
[3e1990a7] + Hecke v0.8.5
Updating `~/.julia/environments/v1.6/Manifest.toml`
[c3fe647b] + AbstractAlgebra v0.10.0
[e21ec000] + Antic_jll v0.2.2+0
[d9960996] + Arb_jll v2.18.1+0
[b99e7846] + BinaryProvider v0.5.10
[e134572f] + FLINT_jll v2.6.3+0
[781609d7] + GMP_jll v6.2.0+2
[3e1990a7] + Hecke v0.8.5
[472f376f] + LoadFlint v0.3.3
[3a97d323] + MPFR_jll v4.1.0+1
[2edaba10] + Nemo v0.18.1
[ae029012] + Requires v1.1.0
[56f22d72] + Artifacts
[2a0f44e3] + Base64
[ade2ca70] + Dates
[8ba89e20] + Distributed
[b77e0a4c] + InteractiveUtils
[76f85450] + LibGit2
[8f399da3] + Libdl
[37e2e46d] + LinearAlgebra
[56ddb016] + Logging
[d6f4376e] + Markdown
[44cfe95a] + Pkg
[de0858da] + Printf
[9abbd945] + Profile
[3fa0cd96] + REPL
[9a3f8284] + Random
[ea8e919c] + SHA
[9e88b42a] + Serialization
[6462fe0b] + Sockets
[2f01184e] + SparseArrays
[fa267f1f] + TOML
[8dfed614] + Test
[cf7118a7] + UUIDs
[4ec0a83e] + Unicode
Building LoadFlint → `~/.julia/scratchspaces/44cfe95a-1eb2-52ea-b672-e2afdf69b78f/4de92c7daa511ecbb38650004aaf6e16de72388d/build.log`
Building Nemo ─────→ `~/.julia/scratchspaces/44cfe95a-1eb2-52ea-b672-e2afdf69b78f/c672975dab57391df030e7660d30e4c42e526edf/build.log`
Testing Hecke
Status `/tmp/jl_9zvNc0/Project.toml`
[c3fe647b] AbstractAlgebra v0.10.0
[3e1990a7] Hecke v0.8.5
[2edaba10] Nemo v0.18.1
[ae029012] Requires v1.1.0
[ade2ca70] Dates
[8ba89e20] Distributed
[b77e0a4c] InteractiveUtils
[8f399da3] Libdl
[37e2e46d] LinearAlgebra
[d6f4376e] Markdown
[44cfe95a] Pkg
[de0858da] Printf
[9abbd945] Profile
[9a3f8284] Random
[9e88b42a] Serialization
[2f01184e] SparseArrays
[8dfed614] Test
Status `/tmp/jl_9zvNc0/Manifest.toml`
[c3fe647b] AbstractAlgebra v0.10.0
[e21ec000] Antic_jll v0.2.2+0
[d9960996] Arb_jll v2.18.1+0
[b99e7846] BinaryProvider v0.5.10
[e134572f] FLINT_jll v2.6.3+0
[781609d7] GMP_jll v6.2.0+2
[3e1990a7] Hecke v0.8.5
[472f376f] LoadFlint v0.3.3
[3a97d323] MPFR_jll v4.1.0+1
[2edaba10] Nemo v0.18.1
[ae029012] Requires v1.1.0
[56f22d72] Artifacts
[2a0f44e3] Base64
[ade2ca70] Dates
[8ba89e20] Distributed
[b77e0a4c] InteractiveUtils
[76f85450] LibGit2
[8f399da3] Libdl
[37e2e46d] LinearAlgebra
[56ddb016] Logging
[d6f4376e] Markdown
[44cfe95a] Pkg
[de0858da] Printf
[9abbd945] Profile
[3fa0cd96] REPL
[9a3f8284] Random
[ea8e919c] SHA
[9e88b42a] Serialization
[6462fe0b] Sockets
[2f01184e] SparseArrays
[fa267f1f] TOML
[8dfed614] Test
[cf7118a7] UUIDs
[4ec0a83e] Unicode
Testing Running tests...
using GAP failed. Not running FieldFactory tests
Test Summary: | Pass Total
Number fields | 20 20
124.868565 seconds (63.49 M allocations: 3.462 GiB, 3.47% gc time, 99.29% compilation time)
Test Summary: | Pass Total
AlgAss | 919 919
61.584019 seconds (43.63 M allocations: 2.403 GiB, 3.22% gc time, 81.60% compilation time)
Test Summary: | Pass Total
AlgAssAbsOrd | 177 177
163.759310 seconds (510.95 M allocations: 21.544 GiB, 13.26% gc time, 64.52% compilation time)
Test Summary: | Pass Total
AlgAssRelOrd | 34 34
31.260192 seconds (106.58 M allocations: 4.084 GiB, 14.58% gc time, 59.04% compilation time)
Test Summary: | Pass Total
Elliptic curves | 277 277
19.255584 seconds (18.99 M allocations: 1.748 GiB, 2.91% gc time, 64.51% compilation time)
Test Summary: | Pass Total
Finitely generated abelian groups | 419 419
19.262383 seconds (23.20 M allocations: 1.269 GiB, 2.36% gc time, 89.82% compilation time)
Test Summary: | Pass Total
Generic Groups | 928 928
10.779982 seconds (16.36 M allocations: 1.219 GiB, 3.68% gc time, 85.99% compilation time)
Test Summary: |
Linear algebra | No tests
0.002362 seconds (709 allocations: 62.523 KiB, 0.01% compilation time)
Test Summary: | Pass Total
Map | 132 132
0.815677 seconds (676.02 k allocations: 39.712 MiB, 85.07% compilation time)
Test Summary: | Pass Total
Misc | 28003 28003
141.555164 seconds (229.39 M allocations: 13.405 GiB, 4.71% gc time, 18.34% compilation time)
Test Summary: | Pass Total
NfAbs | 2105 2105
92.124627 seconds (173.61 M allocations: 22.636 GiB, 4.05% gc time, 28.65% compilation time)
NfOrd.jl
80.317844 seconds (269.00 M allocations: 14.292 GiB, 10.77% gc time, 2.11% compilation time)
Elem.jl
1.017668 seconds (764.01 k allocations: 45.408 MiB, 67.53% compilation time)
Ideal.jl
5.608839 seconds (18.96 M allocations: 942.222 MiB, 12.32% gc time, 33.52% compilation time)
FracIdl.jl
1.678483 seconds (941.48 k allocations: 50.732 MiB, 92.11% compilation time)
ResidueRing.jl
0.150142 seconds (122.61 k allocations: 14.635 MiB, 26.65% compilation time)
ResidueField.jl
0.623514 seconds (468.22 k allocations: 26.067 MiB, 87.43% compilation time)
Clgp.jl
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 50, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 49, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 48, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 47, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 46, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 45, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 44, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 43, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 42, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 41, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 40, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 39, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 38, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 37, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 36, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 35, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 34, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 33, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 32, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 31, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 30, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 29, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 28, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 27, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 26, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 25, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 24, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 23, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 22, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 21, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 20, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 19, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 18, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 17, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 16, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 15, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 14, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 13, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 12, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 11, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 10, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 9, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 8, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 7, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 6, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 5, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 4, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 3, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 2, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 + 1, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 2, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 3, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 5, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 6, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 7, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 8, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 10, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 11, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 12, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 13, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 14, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 15, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 17, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 18, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 19, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 20, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 21, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 22, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 23, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 24, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 26, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 27, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 28, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 29, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 30, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 31, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 32, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 33, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 34, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 35, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 37, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 38, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 39, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 40, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 41, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 42, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 43, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 44, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 45, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 46, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 47, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 48, a)
(K, a) = NumberField(x ^ 2 - d, "a") = (Number field over Rational Field with defining polynomial x^2 - 50, a)
(K, a) = NumberField(f, "a") = (Number field over Rational Field with defining polynomial x^3 - 3*x - 1, a)
(K, a) = NumberField(phi29, "a") = (Number field over Rational Field with defining polynomial x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1, a)
(K, a) = NumberField(x, "a", cached = false) = (Number field over Rational Field with defining polynomial x, 0)
(K, a) = NumberField(x ^ 2 - 2, "a") = (Number field over Rational Field with defining polynomial x^2 - 2, a)
(K, a) = NumberField(x ^ 2 - 3, "a") = (Number field over Rational Field with defining polynomial x^2 - 3, a)
(K, a) = NumberField(x ^ 5 - 11 ^ 2 * 7, "a") = (Number field over Rational Field with defining polynomial x^5 - 847, a)
(K, a) = cyclotomic_field(13, cached = false) = (Cyclotomic field of order 13, z_13)
(K, a) = NumberField((((x ^ 18 + 18 * x ^ 16 + 135 * x ^ 14 + 192 * x ^ 12) - 2961 * x ^ 10) - 17334 * x ^ 8) + 20361 * x ^ 6 + 315108 * x ^ 4 + 514944 * x ^ 2 + 123904, "a") = (Number field over Rational Field with defining polynomial x^18 + 18*x^16 + 135*x^14 + 192*x^12 - 2961*x^10 - 17334*x^8 + 20361*x^6 + 315108*x^4 + 514944*x^2 + 123904, a)
(K, a) = NumberField(f) = (Number field over Rational Field with defining polynomial x^6 - 24*x^4 + 157*x^2 - 162, _a)
(K, a) = NumberField(f) = (Number field over Rational Field with defining polynomial x^2 - 1155, _a)
67.636824 seconds (163.14 M allocations: 16.744 GiB, 6.68% gc time, 1.38% compilation time)
RayClassGroup.jl
2.214776 seconds (4.24 M allocations: 237.568 MiB, 81.00% compilation time)
ResidueRingMultGrp.jl
5.520072 seconds (18.32 M allocations: 1.237 GiB, 12.75% gc time, 19.51% compilation time)
Overorders.jl
9.619422 seconds (51.53 M allocations: 2.513 GiB, 15.66% gc time, 8.92% compilation time)
LinearAlgebra.jl
15.403730 seconds (33.97 M allocations: 2.281 GiB, 8.65% gc time, 33.35% compilation time)
PicardGroup.jl
13.973296 seconds (44.07 M allocations: 3.238 GiB, 8.71% gc time, 2.94% compilation time)
Test Summary: | Pass Total
Orders in absolute number fields | 15915 15915
203.874309 seconds (605.59 M allocations: 41.595 GiB, 9.13% gc time, 8.19% compilation time)
NfRel/NfRelOrd.jl
11.329957 seconds (14.38 M allocations: 815.514 MiB, 4.21% gc time, 89.41% compilation time)
NfRel/Ideal.jl
3.146204 seconds (10.68 M allocations: 556.200 MiB, 12.33% gc time, 28.95% compilation time)
NfRel/FracIdeal.jl
0.057344 seconds (315.92 k allocations: 16.597 MiB, 31.45% compilation time)
NfRel/NfRel.jl
0.630973 seconds (1.13 M allocations: 109.685 MiB, 73.13% compilation time)
NfRel/Elem.jl
0.030274 seconds (28.54 k allocations: 1.801 MiB, 65.91% compilation time)
NfRel/NEQ_Kirschmer.jl
3.485474 seconds (5.46 M allocations: 311.248 MiB, 4.38% gc time, 81.80% compilation time)
Test Summary: | Pass Total
NfRel | 98 98
18.747131 seconds (32.04 M allocations: 1.771 GiB, 5.43% gc time, 77.04% compilation time)
Test Summary: | Pass Total
RCF | 62 62
42.288569 seconds (109.48 M allocations: 6.241 GiB, 7.33% gc time, 44.96% compilation time)
Test Summary: |
Examples | No tests
0.004389 seconds (1.23 k allocations: 115.094 KiB, 0.01% compilation time)
Test Summary: | Pass Total
Sparse | 176 176
7.174575 seconds (6.46 M allocations: 386.049 MiB, 2.53% gc time, 85.23% compilation time)
Test Summary: | Pass Total
Quadratic and hermitian forms | 822 822
155.925954 seconds (513.17 M allocations: 32.392 GiB, 8.77% gc time, 33.93% compilation time)
Conjugates.jl
2.694665 seconds (3.11 M allocations: 179.919 MiB, 8.52% gc time, 91.99% compilation time)
Test Summary: | Pass Total
LocalField ... | 10 10
2.727045 seconds (3.12 M allocations: 180.846 MiB, 8.42% gc time, 91.88% compilation time)
Testing Hecke tests passed