Mikio Sato

Mikio Sato
Born (1928-04-18) April 18, 1928
Tokyo, Japan
Nationality Japan
Fields Mathematics
Institutions Kyoto University
Alma mater University of Tokyo (B.Sc., 1952) (Ph.D., 1963)
Doctoral advisor Shokichi Iyanaga
Doctoral students Masaki Kashiwara
Motohico Mulase
Known for Bernstein–Sato polynomials
Sato-Tate conjecture
Notable awards Rolf Schock Prize in Mathematics (1997)
Wolf Prize in Mathematics (2003)

Mikio Sato (佐藤 幹夫 Satō Mikio, born April 18, 1928) is a Japanese mathematician, who started the field of algebraic analysis. He studied at the University of Tokyo and then did graduate study in physics as a student of Shin'ichiro Tomonaga. Since 1970, Sato has been professor at the Research Institute for Mathematical Sciences, of Kyoto University.

He is known for his innovative work in a number of fields, such as prehomogeneous vector spaces and Bernstein–Sato polynomials; and particularly for his hyperfunction theory. This theory initially appeared as an extension of the ideas of distribution theory; it was soon connected to the local cohomology theory of Grothendieck, for which it was an independent origin and to expression in terms of sheaf theory. Further, it led to the theory of microfunctions, interest in microlocal aspects of linear partial differential equations and Fourier theory such as wave fronts, and ultimately to the current developments in D-module theory. Part of Mikio Sato's hyperfunction theory is the modern theory of holonomic systems: Partial Differential Equations (PDEs) over-determined to the point of having finite-dimensional spaces of solutions.

He also contributed basic work to non-linear soliton theory, with the use of Grassmannians of infinite dimension. In number theory, he is known for the Sato–Tate conjecture on L-functions.

He has been a member of the National Academy of Sciences since 1993. He also received the Schock Prize in 1997 and the Wolf Prize in 2003.

This article is issued from Wikipedia - version of the 2/2/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.