Fields Medals 1970


    Alan BAKER

    born August 19, 1939 London
    Cambridge University

    Generalized the Gelfond-Schneider theorem (the solution to Hilbert's seventh problem). From this work he generated transcendental numbers not previously identified.


    Heisuke HIRONAKA

    born April 9, 1931, Yamaguchi-ken, Japan
    Harvard University

    Generalized work of Zariski who had proved for dimension <=3 the theorem concerning the resolution of singularities on an algebraic variety. Hironaka proved the results in any dimension.


    Serge NOVIKOV

    born March 20, 1938, Gorki, USSR
    Belorusskii University

    Made important advances in topology, the most well-known being his proof of the topological invariance of the Pontrjagin classes of the differentiable manifold. His work included a study of the cohomology and homotopy of Thom spaces.


    John Griggs THOMPSON

    born October 13, 1932, Kansas, USA
    University of Chicago

    Proved jointly with W. Feit that all non-cyclic finite simple groups have even order. The extension of this work by Thompson determined the minimal simple finite groups, that is, the simple finite groups whose proper subgroups are solvable.

    This document has been reproduced from

    Albers, Donald J.; Alexanderson, G. L.; Reid, Constance:
    International mathematical congresses. An illustrated history 1893 - 1986
    Rev. ed. including ICM 1986. Springer-Verlag, New York, 1986

    with friendly permission from Springer Verlag