Pith Number
pith:O5SK2AQL
pith:2024:O5SK2AQLE4IJPAWDVI4EKX7EYV
not attested
not anchored
not stored
refs pending
The constructive inverse Galois problem via Hilbert modular forms: realizing the transitive group 17T7
arxiv:2411.07857 v4 · 2024-11-12 · math.NT
Add to your LaTeX paper
\usepackage{pith}
\pithnumber{O5SK2AQLE4IJPAWDVI4EKX7EYV}
Prints a linked badge after your title and injects PDF metadata. Compiles on arXiv. Learn more · Embed verified badge
Record completeness
1
Bitcoin timestamp
2
Internet Archive
3
Author claim
· sign in to
claim
4
Citations
5
Replications
✓
Portable graph bundle live · download bundle · merged
state
The bundle contains the canonical record plus signed events. A mirror can host it anywhere and recompute the same
current state with the deterministic merge algorithm.
Receipt and verification
| First computed | 2026-06-02T02:04:04.491739Z |
|---|---|
| Builder | pith-number-builder-2026-05-17-v1 |
| Signature | Pith Ed25519
(pith-v1-2026-05) · public key |
| Schema | pith-number/v1.0 |
Canonical hash
7764ad020b27109782c3aa38455fe4c57e2c45e897ba3d6d85b707134c0022ed
Aliases
· · · · ·Agent API
Verify this Pith Number yourself
curl -sH 'Accept: application/ld+json' https://pith.science/pith/O5SK2AQLE4IJPAWDVI4EKX7EYV \
| jq -c '.canonical_record' \
| python3 -c "import sys,json,hashlib; b=json.dumps(json.loads(sys.stdin.read()), sort_keys=True, separators=(',',':'), ensure_ascii=False).encode(); print(hashlib.sha256(b).hexdigest())"
# expect: 7764ad020b27109782c3aa38455fe4c57e2c45e897ba3d6d85b707134c0022ed
Canonical record JSON
{
"metadata": {
"abstract_canon_sha256": "b409e7eaed08f17997e1c7fdaaf4426ea25af7163cc087c52c2d922d374edaa2",
"cross_cats_sorted": [],
"license": "http://arxiv.org/licenses/nonexclusive-distrib/1.0/",
"primary_cat": "math.NT",
"submitted_at": "2024-11-12T15:15:11Z",
"title_canon_sha256": "77e0fa4a8713d1274a6f5165b569be2f794fe6cc3a12dd52caf2db3dcbd1a9f7"
},
"schema_version": "1.0",
"source": {
"id": "2411.07857",
"kind": "arxiv",
"version": 4
}
}