- 6
- 1
Sylvie Boldo
7
Documents
Identifiants chercheurs
- sboldo
- 0000-0002-1970-3019
- IdRef : 112505821
Présentation
Auto-magically brought to you by HAL.
Auto-magically brought to you by HAL.
Publications
- 4
- 3
- 3
- 2
- 2
- 2
- 2
- 2
- 2
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 1
- 7
- 7
- 3
- 3
- 3
- 3
- 2
- 1
- 1
- 1
- 1
- 1
- 1
- 2
- 1
- 1
- 1
- 1
|
Trusting computations: a mechanized proof from partial differential equations to actual programComputers & Mathematics with Applications, 2014, 68 (3), pp.28. ⟨10.1016/j.camwa.2014.06.004⟩
Article dans une revue
hal-00769201v3
|
|
Wave equation numerical resolution: a comprehensive mechanized proof of a C programJournal of Automated Reasoning, 2013, 50 (4), pp.423-456. ⟨10.1007/s10817-012-9255-4⟩
Article dans une revue
hal-00649240v3
|
|
A Coq Formalization of Lebesgue Induction Principle and Tonelli's Theorem25th International Symposium on Formal Methods (FM 2023), Mar 2023, Lübeck, Germany. pp.39--55, ⟨10.1007/978-3-031-27481-7_4⟩
Communication dans un congrès
hal-03889276v2
|
|
A Coq formal proof of the Lax–Milgram theorem6th ACM SIGPLAN Conference on Certified Programs and Proofs, Jan 2017, Paris, France. ⟨10.1145/3018610.3018625⟩
Communication dans un congrès
hal-01391578v1
|
|
Formal proof of a wave equation resolution scheme: the method errorITP'10 - Interactive Theorem Proving, Jul 2010, Edinburgh, United Kingdom. pp.147-162, ⟨10.1007/978-3-642-14052-5_12⟩
Communication dans un congrès
inria-00450789v3
|
|
Teaching Divisibility and Binomials with CoqRR-9547, Inria. 2024, pp.13
Rapport
hal-04550762v1
|
|
Lebesgue Induction and Tonelli's Theorem in Coq[Research Report] RR-9457, Institut National de Recherche en Informatique et en Automatique (INRIA). 2023, pp.17
Rapport
hal-03564379v2
|