pith. sign in

Recoverable Identifier

arXiv:2605.18426 · detector doi_compliance · incontrovertible · 2026-05-20 00:01:14.891751+00:00

advisory doi_compliance recoverable_identifier

DOI in the printed bibliography is fragmented by whitespace or line breaks. A longer candidate (10.1215/00127094-2916104.url:https://doi.org/10.1215/) was visible in the surrounding text but could not be confirmed against doi.org as printed.

Paper page Integrity report arXiv Try DOI

Evidence text

arXiv:2510.15196 [math.AG].url:https://arxiv.org/abs/2510.15196. [BCGP21] George Boxer, Frank Calegari, Toby Gee, and Vincent Pilloni. “Abelian surfaces over totally real fields are potentially modular”. In:Publications mathématiques de l’IHÉS 134.1 (2021), pp. 153–501. [BH15] Christophe Breuil and Florian Herzig. “Ordinary representations ofG(Qp)and fun- damental algebraic representations”. In:Duke Mathematical Journal164.7 (2015), pp. 1271–1352.doi:10.1215/00127094-2916104.url: https://doi.org/10.1215/ 00127094-2916104. [BHHMS23] Christophe Breuil, Florian Herzig, Yongquan Hu, Stefano Morra, and Benjamin Schraen. “Gelfand–Kirillov dimension and mod p cohomology for GL2”. In:Inventiones mathematicae234.1 (2023), pp. 1–128.issn: 0020-9910. [BHHMS24] ChristopheBreuil,FlorianHerzig,YongquanHu,StefanoMorra,andBenjaminSchraen. “Conjectures and results on modular representations of GL n (K) for a p-adic field K”. In:Memoirs of the American Mathematical Society(2024). [BL84] J-L Brylinski and J-P Labesse. “Cohomologie d’intersection et fonctionsL de certaines variétés de Shimura”. In:Annales scientifiques de l’École Normale Supérieure17.3 (1984), pp. 361–412. [BMS19] BhargavBhatt,MatthewMorrow,andPeterScholze.“TopologicalHochschildhomology and integral p-adic Hodge theory”. In:Publications mathématiques de l’IHÉS129.1 (2019), pp. 199–310. [Böc01] Gebhard Böckle. “On the density of modular points in universal deformation spaces”. In:American Journal of Mathematics123.5 (2001), pp. 9

Evidence payload

{
  "printed_excerpt": "arXiv:2510.15196 [math.AG].url:https://arxiv.org/abs/2510.15196. [BCGP21] George Boxer, Frank Calegari, Toby Gee, and Vincent Pilloni. \u201cAbelian surfaces over totally real fields are potentially modular\u201d. In:Publications math\u00e9matiques de l\u2019I",
  "reconstructed_doi": "10.1215/00127094-2916104.url:https://doi.org/10.1215/",
  "ref_index": 1,
  "resolved_title": null,
  "verdict_class": "incontrovertible"
}