https://jaalonso.github.io/vestigium/esContents © 2026 <a href="mailto:">José A. Alonso</a> <a rel="license" href="https://creativecommons.org/licenses/by-nc-sa/4.0/"> <img alt="Creative Commons License BY-NC-SA" style="border-width:0; margin-bottom:12px;" src="https://i.creativecommons.org/l/by-nc-sa/4.0/88x31.png"></a>Sat, 25 Apr 2026 07:10:21 GMTNikola (getnikola.com)http://blogs.law.harvard.edu/tech/rsshttps://jaalonso.github.io/vestigium/posts/2026/04/25-readings_shared_04-24-26/José A. Alonso<p>The readings shared in <a href="https://bsky.app/profile/jalonso.bsky.social">Bluesky</a> on 24 April 2026 are:</p> <ul> <li><a href="https://arxiv.org/abs/2604.16507v1">Deep Vision: A formal proof of Wolstenholmes theorem in Lean 4</a>. ~ Alexandre Linhares. #LeanProver #ITP #AI4Math</li> <li><a href="https://arxiv.org/abs/2604.15839v1">Discover and prove: An open-source agentic framework for hard mode automated theorem proving in Lean 4</a>. ~ Chengwu Liu et als. #LeanProver #ITP #AI4Math</li> <li><a href="https://afm.episciences.org/18061">Formalising the Bruhat–Tits tree</a>. ~ Judith Ludwig and Christian Merten. #LeanProver #ITP</li> <li><a href="https://arxiv.org/abs/2604.18882v1">Formally verified patent analysis via dependent type theory: Machine-checkable certificates from a hybrid AI + Lean 4 pipeline</a>. ~ George Koomullil. #LeanProver #ITP #AI4Math</li> <li><a href="https://leanfirststeps.blogspot.com/p/contents.html">Lean: First steps</a>. ~ Tariq Rashid. #LeanProver #ITP #Math</li> <li><a href="https://alexkontorovich.wordpress.com/2026/04/05/lecture-interactions-of-ai-with-research-math-and-formalization-at-newton-insitute-cambridge/">Lecture «Interactions of AI with research math and formalization» at Newton Insitute (Cambridge)</a>. ~ Alex Kontorovich. #AI4Math #LeanProver #ITP</li> <li><a href="https://www.irif.fr/~lahaye/logique_propositionnelle/">Logique propositionnelle (dans Lean)</a>. ~ Sebastien Lahaye. #LeanProver #ITP #Logic</li> <li><a href="https://arxiv.org/abs/2604.16538v1">Understanding tool-augmented agents for Lean formalization: A factorial analysis</a>. ~ Ke Zhang, Patricio Gallardo, Maziar Raissi, Sudhir Murthy. #LeanProver #ITP #AI4Math</li> <li><a href="https://github.com/chenson2018/leanprover-community.github.io/blob/grind-style/templates/contribute/grind.md">grind best practices</a>. ~ Chris Henson. #LeanProver</li> <li><a href="https://arxiv.org/abs/2604.20807v1">Formal primal-dual algorithm analysis</a>. ~ Mohammad Abdulaziz, Thomas Ammer. #IsabelleHOL #ITP</li> <li><a href="https://arxiv.org/abs/2604.15713v1">Just type it in Isabelle! AI agents drafting, mechanizing, and generalizing from human hints</a>. ~ Kevin Kappelmann, Maximilian Schäffeler, Lukas Stevens, Mohammad Abdulaziz, Andrei Popescu, Dmitriy Traytel. #IsabelleHOL #ITP #AI4Math</li> <li><a href="https://arxiv.org/abs/2604.20345v1">A Rocq formalization of simplicial Lagrange finite elements</a>. ~ Sylvie Boldo, François Clément, Vincent Martin, Micaela Mayero, Houda Mouhcine. #RocqProver #ITP #Math</li> <li><a href="https://arxiv.org/abs/2604.16477v1">A constructive proof of Rice's theorem and the halting problem via Hilbert's tenth problem</a>. ~ Jonathan Brossard. #RocqProver #ITP #Math</li> <li><a href="https://arxiv.org/abs/2604.21376">A formal proof of the Sands-Sauer-Woodrow theorem using the Rocq prover and mathcomp/ssreflect</a>. ~ Jean-Philippe Chancelier. #RocqProver #ITP #Math</li> <li><a href="https://arxiv.org/abs/2604.19558v1">On reasoning-centric LLM-based automated theorem proving</a>. ~ Yican Sun, Chengwei Shi, Hangzhou Lyu, Yingfei Xiong. #RocqProver #AI4Math</li> <li><a href="https://arxiv.org/abs/2604.19459v1">Do LLMs game formalization? Evaluating faithfulness in logical reasoning</a>. ~ Kyuhee Kim, Auguste Poiroux, Antoine Bosselut. #AI4Math #LeanProver #ITP #Autoformalization</li> <li><a href="https://davidbessis.substack.com/p/the-fall-of-the-theorem-economy">The fall of the theorem economy (How AI could destroy mathematics and barely touch it)</a>. ~ David Bessis. #AI4Math #LeanProver #ITP</li> <li><a href="https://lawrencecpaulson.github.io//2026/04/23/Why_not_Lean.html">Why not just use Lean?</a>. ~ Lawrence Paulson. #ITP #Nqthm #HOL #CoqProver #IsabelleHOL #LeanProver #AI4Math</li> <li><a href="https://www.youtube.com/live/Yt2E1vrgP_E%20~%20Edsko%20de%20Vries,%20Andres%20L%C3%B6h.">The Haskell Unfolder Episode 54: Not quite monads</a>. #Haskell #FunctionalProgramming</li> <li><a href="https://inf9340.pages.info.uqam.ca/notes/notes.pdf">Introduction to computational logic</a>. ~ Ryan Kavanagh. #Logic #Math #CompSci</li> <li><a href="https://arxiv.org/abs/2603.21852">All elementary functions from a single binary operator</a>. ~ Andrzej Odrzywołek. #Math</li> <li><a href="https://www.gaussianos.com/eml-una-funcion-para-generarlas-a-todas/">EML: una función para generarlas a todas</a>. ~ Miguel Ángel Morales. #Math</li> <li><a href="https://jaalonso.github.io/vestigium/posts/2026/04/23-matematicas-en-la-era-de-la-ia-demostraciones-rapidas-comprension-lenta/">Matemáticas en la era de la IA: demostraciones rápidas, comprensión lenta</a>. #AI4Math</li> <li><a href="https://jaalonso.github.io/vestigium/posts/2026/04/22-the-fall-of-the-theorem-economy-how-ai-could-destroy-mathematics-and-barely-touch-it/">Reseña de «The fall of the theorem economy (How AI could destroy mathematics and barely touch it)»</a>. #AI4Math #LeanProver #ITP</li> </ul>AI4MathAutoformalizationCompSciCoqProverFunctionalProgrammingHaskellHOLIsabelleHOLITPLeanProverLogicMathNqthmRocqProverhttps://jaalonso.github.io/vestigium/posts/2026/04/25-readings_shared_04-24-26/Sat, 25 Apr 2026 04:00:00 GMT