NTAG Seminar: Good Reduction of Generalized Kummer surfaces in the non-supersingular case
In this talk, we study the good reduction of generalized Kummer surfaces, which are K3 surfaces obtained as minimal resolutions of quotients of abelian surfaces by finite groups. In particular, we establish a criterion for good reduction when the abelian surface has non-supersingular reduction and the group is cyclic. This extends the result of Lazda and Skorobogatov on Kummer surfaces.
| A Number Theory, Algebra and Geometry seminar | |
|---|---|
| Speaker(s) | Tianchen Zhao |
| Date | 3 March 2026 |
| Time | 10:30 to 11:30 |
| Place | Harrison 170 |
| Organizer | Chris Lazda |