Felix Gantmacher

Felix R. Gantmacher
Native name Феликс Рувимович Гантмахер
Born (1908-02-23)23 February 1908
Odessa, Russia
Died 16 May 1964(1964-05-16) (aged 56)
Nationality Russian
Fields Mathematics
Institutions Moscow Institute of Physics and Technology
Alma mater Odessa University

Felix Ruvimovich Gantmacher (Russian: Феликс Рувимович Гантмахер) (23 February 1908 – 16 May 1964) was a Soviet mathematician, professor at Moscow Institute of Physics and Technology, well known for his contributions in mechanics, matrix theory and Lie group theory. In 1925–1926 he participated in seminar guided by Nikolai Chebotaryov in Odessa and wrote his first research paper in 1926.

His book Theory of Matrices (1953) is a standard reference of matrix theory. It has been translated into various languages including a two-volume version in English prepared by Joel Lee Brenner, Donald W. Bushaw, and S. Evanusa.[1][2] George Herbert Weiss noted that "this book cannot be recommended too highly as it contains material otherwise unavailable in book form".[3]

Gantmacher collaborated with Mark Krein on Oscillation Matrices and Kernels and Small Vibrations of Mechanical Systems.[4]

In 1939 he contributed to the classification problem of the real Lie algebras.[5]

In the same year he wrote on automorphisms of complex Lie groups.[6]

His son Vsevolod Gantmacher is a noted physicist.



  1. Gantmacher, Felix (1959), Theory of matrices, AMS Chelsea publishing
  2. Gantmacher, Felix (1959), Applications of the theory of matrices, Interscience publishers
  3. Weiss, George (1960). "Review of Applications of the Theory of Matrices". Science. 131 (3398): 405–6. doi:10.1126/science.131.3398.405-a.
  4. Gantmacher, Felix; Krein, Mark (2002), Oscillation Matrices and Kernels and Small Vibrations of Mechanical Systems: Revised Edition, AMS Chelsea Publishing
  5. Gantmacher, Felix (1939), "On the classification of real simple Lie groups", Sbornik: Mathematics, AMS Chelsea Publishing, 5(47) (2): 217–250
  6. Gantmacher, Felix (1939), "Canonical representation of automorphisms of a complex semi-simple Lie group", Sbornik: Mathematics, AMS Chelsea Publishing, 5(47) (2): 101–146
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