Fields Medals 1978


    Pierre René DELIGNE

    born October 3, 1944, Brussels, Belgium
    Institut des Hautes Études Scientifiques

    Gave solution of the three Weil conjectures concerning generalizations of the Riemann hypothesis to finite fields. His work did much to unify algebraic geometry and algebraic number theory.


    Charles Louis FEFFERMAN

    born April 18, 1949, Washington, D.C.
    Princeton University

    Contributed several innovations that revised the study of multidimensional complex analysis by finding correct generalizations of classical (low-dimensional) results.


    Gregori Aleksandrovitch MARGULIS

    born February 24, Moscow
    Moscow University

    Provided innovative analysis of the structure of Lie groups. His work belongs to combinatorics, differential geometry, ergodic theory, dynamical systems, and Lie groups.


    Daniel G. QUILLEN

    born June 22, 1940, Orange, New Jersey
    Massachusetts Institute of Technology

    The prime architect of the higher algebraic K-theory, a new tool that successfully employed geometric and topological methods and ideas to formulate and solve major problems in algebra, particularly ring theory and module theory.

    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