Intelligent Computer Mathematics

.- Automated Reasoning. .- Hammering Higher Order Set Theory. .- Synthesis Benchmarks for Automated Reasoning. .- Automated Symmetric Constructions in Discrete Geometry. .- Formal Libraries. .- Growing Mathlib: Maintenance of a Large Scale Mathematical Library. .- Exploring Formal Math on the Blockchain: An Explorer for Proofgold. .- Supporting Maintenance of Formal Mathematics with Similarity Search. .- Logical and Linguistic Foundations. .- Graded Quantitative Narrowing. .- Equational Generalization Problems with Atom-Variables. .- Extending Flexible Boolean Semantics for the Language of Mathematics. .- A Formal Definition of an Algorithm Suitable for Parsing the Language of Mathematics. .- Mathematical Knowledge Management. .- Reaping the Benefits of Modularization in Flexiformal Mathematics by GFbased AST Transformations. .- Semantic Authoring in a Flexiformal Context — Bulk Annotation of Rigorous Documents. .- Michael Kohlhase and Jan Frederik Schaefer Lightweight Realms. .- Indexing and Retrieval in a Heterogeneous Formal Library. .- Neural Language Models. .- Exploring Proof Autoformalization with Mistral on Herald. .- Boosting Math Problem Solving in Small LLMs via Ensembles. .- Proof Assistants and Formalizations. .- Formalizing a Classification Theorem for Low-Dimensional Solvable Lie Algebras in Lean. .- Certified Algorithms for Numerical Semigroups in Rocq. .- Formalizing the Solow Model in Naproche. .- Formalizing MLTL Formula Progression in Isabelle/HOL. .- Formalising Fairness in the Assignment Problem with Ordinal Preferences in Isabelle/HOL. .- A PVS Library on the Infinitude of Primes. .- Vector Graphics through Category Theory. .- A Lean-Based Language for Teaching Proof in High School.