Project/Area Number  04302002 
Research Category 
GrantinAid for Cooperative Research (A).

Research Field 
代数学・幾何学

Research Institution  TOKYO INSTITUTE OF TECHNOLOGY 
Principal Investigator 
FUKUDA Takuo Tokyo Institute of Tech.Dept.Math.Professor, 理学部, 教授 (00009599)

CoInvestigator(Kenkyūbuntansha) 
NOGURA Tsugunori Ehime Univ.Dept.Math.Professor, 理学部, 教授 (00036419)
MATSUMOTO Takao Hiroshima U.Dept.Math.Professor, 理学部, 教授 (50025467)
MATSUMOTO Yukio Tokyo Univ.Inst.Math.Sci.Professor, 大学院・数理科学研究科, 教授 (20011637)
NISHIDA Goro Kyoto Univ.Dept.Math.Professor, 理学部, 教授 (00027377)
KAWAKUBO Katsuo Osaka Univ.Dept.Math.Professor, 理学部, 教授 (50028198)

Project Fiscal Year 
1992 – 1993

Project Status 
Completed(Fiscal Year 1993)

Budget Amount *help 
¥21,500,000 (Direct Cost : ¥21,500,000)
Fiscal Year 1993 : ¥11,100,000 (Direct Cost : ¥11,100,000)
Fiscal Year 1992 : ¥10,400,000 (Direct Cost : ¥10,400,000)

Keywords  Manifold / Topology / Dynamical System / Homology / Floer Homology / Gauge Theory / Conformal Field Theory / Knot / 多様体 / トポロジー / 力学系 / ホモロジー / フレアホモロジー / ゲージ理論 / 共形場理論 / 結び目 / フレアーホモロジー / インスタントン / ラグランジアンホモロジー / カオス / フラクタル / マンデルブロート 
Research Abstract 
In this decade various deep relations between topology of manifolds and other mathematical fields and mathematical physics such as the one between Physics and the knot theory as well as the theory of lowdimensional manifolds were discovered. Since then these new researches on topology of manifolds have been quite remarkablely developped. The japanese school of topology has made a big contribution to the development. Among them we have the following distiguished researches done under the support of this Grantin Aid : (1)In the theory of complex dynamical systems where one studies dynamics of iterations of complex holomorphic functions, Mitsuhiro SHISHIKURA proved D.Sullivan's conjecture that the Hausdorf dimension of the boundary of the Mandelbrot set is 2. The Mandelblot set itself is 2dimensional. It may sound bery curious that the boundary of a 2dimensional set is also of 2dimension. Shishikura's result shows us complexity of dynamical systems. (2)Concerning the topology of lowdimensional manifolds and Mathematical Physics, we have remarkable deep researches done by T.Yoshida, K.Fukaya, T.Kohno and S.Morita. On the Floer homology which is an invariant of 3manifolds based on Gauge theory, Yoshida affirmatively answered to Atyah' conjecture that the Floer homology will be isomorphic to the Lagrangean Floer homology. Among other motivations, inspirerd by Yoshida's work, Fukaya is now constructing a magnificient theory which intends to unify lowdimensional Gaude theory and by which one can regard the Floer homology as the topological field theory. T.Kohno obtained quite interesting results on applications of 2dimensional conformal field theory to 3dimensional manifolds. S moritagave conclusive results on mapping class group of surfaces. Using these results, he constructed characteristic classes of surface bundles in a natural way and he succeeded in defining second characteristic classes as well.
