Goro Nishida

Goro Nishida (西田 吾郎, Goro Nishida, born 18 September 1943 in Osaka 2 June 2014) was a Japanese mathematician. He was a leading member of the Japanese school of homotopy theory, following in the tradition of Hiroshi Toda.[1]

Nishida received his Ph.D. from Kyoto University in 1973, after spending the 1971-72 academic year at the University of Manchester in England. He then became a professor at Kyoto University. His proof in 1973 of Michael Barratt's conjecture (that positive-degree elements in the stable homotopy ring of spheres are nilpotent) was a major breakthrough: following Frank Adams' solution of the Hopf invariant one problem, it marked the beginning of a new global understanding of algebraic topology.

His contributions to the field were celebrated in 2003 at the NishidaFest[2] in Kinosaki, followed by a satellite conference at the Nagoya Institute of Technology; the proceedings were published in Geometry and Topology's monograph series. In 2000 he was the leading organizer for a concentration year at the Japan–US Mathematics Institute[3] at Johns Hopkins University.

Nishida's earliest work grew out of the study of infinite loop spaces; his first paper (in 1968, on what came eventually to be known as the Nishida relations) accounts for interactions between Steenrod operations and Kudo–Araki (Dyer–Lashof) operations. Some of his later work concerns a circle of ideas surrounding the Segal conjecture, transfer homomorphisms, and stable splittings of classifying spaces of groups. The ideas in this series of papers have by now grown into a rich subfield of homotopy theory; it continues today in (for example) the theory of p-compact groups.

References

  1. "西田吾郎氏死去(京都大名誉教授・代数トポロジー、京都大元副学長)". Jiji Press. 2014-06-03. Archived from the original on 2014-06-03. Retrieved 2014-06-03.
  2. http://msp.warwick.ac.uk/gtm/2007/10/index.xhtml
  3. "Archived copy". Archived from the original on 2010-06-05. Retrieved 2013-08-06.CS1 maint: archived copy as title (link)
  • G. Nishida, The nilpotency of elements of the stable homotopy groups of spheres. J. Math. Soc. Japan 25 (1973) 707–732
  • Michael J. Hopkins, Global methods in homotopy theory, in Homotopy theory (Durham, 1985), 73-96, London Math. Soc. Lecture Notes 117, Cambridge Univ. Press, Cambridge, 1987
  • V. Voevodsky, A nilpotence theorem for cycles algebraically equivalent to zero. Internat. Math. Res. Notices 4 (1995) 187–198
  • Proceedings of the International Meeting and its Satellite Conference on Homotopy Theory, dedicated to Goro Nishida, held in Kinosaki, July 28–August 1 and August 4–8, 2003. Geometry & Topology Monographs, 10. Geometry & Topology Publications, Coventry, 2007
  • G. Nishida Stable homotopy type of classifying spaces of finite groups. Algebraic and topological theories (Kinosaki, 1984) 391–404, Kinokuniya, Tokyo, 1986
This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.