Biography
My research lies in the study of derived categories and their implications in Algebraic geometry and Mirror symmetry. Recently I am interested in the construction and study of non-commutative (crepant) resolutions.
Group:
Algebraic Geometry
Research Interest
- Derived categories
- Mirror Symmetry
- Toric geometry
- Logarithmic geometry
- Birational Geometry
- Homological projective duality
Education Experience
- 2019 - 2023 | University of Birmingham | Pure Mathematics | Ph.D | (Supervisor: Dr Tyler Kelly)
- 2018 - 2019 | University of Cambridge | Mathematics | Master
- 2015 - 2018 | University of Cambridge | Mathematics | Bachelor
Work Experience
- 2023 - 2024 | Tokyo University of Agriculture and Technology | JSPS Short-Term Postdoctoral Fellow
Publication
- [1] D. Schleicher, D. Zagier, A. Malter, New looks at old number theory, The American Mathematical Monthly, 120(3), 243-264 (2013)
- [2] A. Malter, A Derived Equivalence of the Libgober-Teitelbaum and the Batyrev-Borisov Mirror Constructions, International Mathematics Research Notices, 2024(2024), 3, 2099-2137
- [3] T. Kelly, A. Malter, Toric Exoflops and Categorical Resolutions, accepted by Journal of the Institute of Mathematics of Jussieu (2024)
- [4] A. Malter, A.Sheshmani, Non-commutative crepant resolutions for (almost) simplicial toric algebras, arXiv:2602.21802 (2026)
- [5] A. Malter, A. Sheshmani, Towards non-commutative crepant resolutions of affine toric Gorenstein varieties, arXiv:2509.11664 (2026)
- [6] A. Malter, Conic modules, secondary fans and non-commutative resolutions (2026)
- [7] A Malter, A Derived Equivalence of the Libgober–Teitelbaum and the Batyrev–Borisov Mirror Constructions, International Mathematics Research Notices, 2024(3), 2099-2137 (2024)
- [8] A Malter, Studying categorical aspects of the Landau-Ginzburg B-model using variations of geometric invariant theory, University of Birmingham (2023)
Update Time: 2026-06-23 23:05:55