SAITO, Takeshi
Title
|
Professor |
Field
|
Arithmetic geometry |
Research interests
|
Galois representations, ramification |
Current research
|
Arithmetic geometry studies algebraic varieties defined over arithmetic fields or rings including Q, Q_p Z, etc. The main object of study is l-adic Galois representations of global and local field defined as etale cohomology of varieties. |
Selected publications
|
|
Books
|
Number theory 1, Fermat's dream Number theory 2, Introduction to Class Field Theory Number theory 3, Iwasawa Theory and Modular Forms Fermat's Last Theorem : Basic Tools (translated by M. Kuwata) AMS (2013) Fermat's Last Theorem :The proof (translated by M. Kuwata) AMS (2014) |
Memberships, awards and activities |
Mathematical Society of Japan Algebra prize 1998.9, Spring prize of Math. Soc. Japan 2001.3 Documenta DMV, Japanese Journal of Mathematics (editor). |