Valery A. Lunts
Mathematics · Indiana University
Publications
74
Citations
2,096
Est. group size
—
Recurring co-author estimate
Active years
38
Publishing since 1988
Valery A. Lunts works in pure mathematics, focusing on algebraic geometry and abstract algebra. A central theme is the study of 'derived categories'—a framework for organizing geometric and algebraic objects like sheaves on spaces—along with related structures such as matrix factorizations, quiver algebras, and connections to mirror symmetry. The work is highly theoretical and builds bridges between algebra, geometry, and topology.
Publication activity has been fairly steady over the past several years, averaging around one to two papers per year with a peak in 2020.
Generated by claude-opus-4-8 from public bibliographic data · Jul 11, 2026
- Derived Category of Equivariant Coherent Sheaves on a Smooth Toric Variety and Koszul Duality
Functional Analysis and Its Applications · 2025
- Catalan numbers and noncommutative Hilbert schemes
Pure and Applied Mathematics Quarterly · 2024
- Derived category of equivariant coherent sheaves on a smooth toric variety and Koszul duality
arXiv (Cornell University) · 2024
- On cohomological and K-theoretical Hall algebras of symmetric quivers
Journal of Algebra · 2023
- Néron–Severi Lie Algebra, Autoequivalences of the Derived Category, and Monodromy
Moscow Mathematical Journal · 2022
- Catalan numbers, parking functions, permutahedra and noncommutative Hilbert schemes
arXiv (Cornell University) · 2022
- On cohomological and K-theoretical Hall algebras of symmetric quivers
arXiv (Cornell University) · 2022
- Derived categories of coherent sheaves on some zero-dimensional schemes
Journal of Pure and Applied Algebra · 2021
- Categorical measures for finite group actions
Journal of Algebraic Geometry · 2021
- Smoothness of Derived Categories of Algebras
Moscow Mathematical Journal · 2020
- Three notions of dimension for triangulated categories
Journal of Algebra · 2020
- Thick subcategories on curves
Advances in Mathematics · 2020
- Mirror symmetry: monodromy and autoequivalences of the derived category
arXiv (Cornell University) · 2020
- Neron-Severi Lie algebra, autoequivalences of the derived category, and monodromy
arXiv (Cornell University) · 2020
- Landau–Ginzburg Hodge numbers for mirrors of del Pezzo surfaces
Advances in Mathematics · 2018
- arXiv (Cornell University)×5
- Moscow Mathematical Journal×3
- Advances in Mathematics×2
- Journal of Noncommutative Geometry×2
- Journal of Algebra×2
This profile was generated automatically from public scholarly data (OpenAlex). Group size and activity levels are estimates derived from co-authorship patterns.
Last updated Jul 11, 2026.
Claim or correct this profile