In recent years, Sho Tanimoto has supervised a large number of students (In 2024, there are 10 master's students and 6 PhD students!). 

We, Sho's students, study various topics in algebraic geometry and arithmetic geometry each semester. 

2024

• Fall: We are going to study three topics separating into three groups, 

1. Arithmetic geometry group: to read Mustata's Zeta functions in algebraic geometry, 

Thursdays 10:30 - 12:00 JST, Room A332, Science Bldg. A 

2. Algebraic geometry group I: to read Mumford's Abelian Varieties, 

Fridays 13:00 - 14:30 JST, Room A332, Science Bldg. A

3. Algebraic geometry group II: to read Debarre's Higher-Dimensional Algebraic Geometry, 

Fridays 14:45 - 16:15 JST, Room A332, Science Bldg. A

• Spring: Each member has given a presentation based on a paper they are interested in.  

1. Runxuan Gao: "On étale fundamental group, fundamental group scheme and fundamental gerbe, with applications to section conjecture", Apr. 11th

2. Shuto Abe: "On equivariant birational types", Apr. 18th and 25th

3. Mitsuru Sugata: "On Shokurov’s rational connectedness conjecture", May 9th

4. Rikuto Ito: "The Tate conjecture for K3 surfaces in odd characteristic", May 23rd and 30th

5. Haruki Ito: "Vojta's Conjecture implies the Batyrev-Manin Conjecture for K3 surfaces", Jun. 6th

6. Shuhei Katsuta: "Hodge theory for combinatorial geometries", Jun. 27th and Jul. 11th

7. Hayato Takagi: "Über die Einfachheit der speziellen projektiven Gruppen", Jul. 25th

2023

• Fall: We read Beauville's Complex Algebraic Surfaces. 

• Spring: We read Voisin's Hodge Theory and Complex Algebraic Geometry I. 

2022

• Fall: We read Neukirch's Algebraic Number Theory.

• Spring: We read Huybrechts' Fourier-Mukai Transforms in Algebraic Geometry.