Yasutaka Ihara

Yasutaka Ihara (伊原康隆, Ihara Yasutaka; born 1938, Tokyo Prefecture) is a Japanese mathematician, professor emeritus at the Research Institute for Mathematical Sciences, working on number theory who introduced Ihara's lemma and the Ihara zeta function.

Ihara received his PhD at the University of Tokyo in 1967 with thesis Hecke polynomials as congruence zeta functions in elliptic modular case.^[1] In 1965/66 he was at the Institute for Advanced Study. He was a professor at the University of Tokyo and then at the Research Institute for Mathematical Science (RIMS) of the University of Kyōto. In 2002 he retired from RIMS as professor emeritus and then became a professor at Chūō University.

Ihara has done important research on geometric and number theoretic applications of Galois theory. In the 1960s he introduced the eponymous Ihara zeta function.^[2] In graph theory the Ihara zeta function has an interpretation, which was conjectured by Jean-Pierre Serre and proved by Toshikazu Sunada in 1985. Sunada also proved that a regular graph is a Ramanujan graph if and only if its Ihara zeta function satisfies an analogue of the Riemann hypothesis.^[3]

In 1990 Ihara gave a plenary lecture Braids, Galois groups and some arithmetic functions at the ICM in Kyōto. In 1970 he was an invited speaker (with lecture Non abelian class fields over function fields in special cases) at the ICM in Nice.

His doctoral students include Kazuya Katō.

Selected works

On Congruence Monodromy Problems, Mathematical Society of Japan Memoirs, World Scientific 2009 (based on lectures in 1968/1969)
with Michael Fried (ed.): Arithmetic fundamental groups and noncommutative Algebra, American Mathematical Society, Proc. Symposium Pure Math. vol.70, 2002
as editor: Galois representations and arithmetic algebraic geometry, North Holland 1987
with Kenneth Ribet, Jean-Pierre Serre (eds.): Galois Groups over Q, Springer 1989 (Proceedings of a Workshop 1987)

References

↑ Yasutaka Ihara at the Mathematics Genealogy Project
↑ Ihara: On discrete subgroups of the two by two projective linear group over p-adic fields. J. Math. Soc. Japan, vol. 18, 1966, pp. 219–235
↑ Terras, Audrey (1999). "A survey of discrete trace formulas". In Hejhal, Dennis A.; Friedman, Joel; Gutzwiller, Martin C.; et al. Emerging Applications of Number Theory. IMA Vol. Math. Appl. 109. Springer. pp. 643–681. ISBN 0-387-98824-6. Zbl 0982.11031. See p.678

External links

Authority control	WorldCat Identities VIAF: 109209541 LCCN: n85042680 ISNI: 0000 0001 0932 7366 GND: 1055759417 SUDOC: 07673692X BNF: cb12281409w (data) MGP: 172396 NDL: 00534614

This article is issued from Wikipedia - version of the 2/22/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.