University of Stuttgart RWTH Aachen Friedrich Schiller University Jena
Doctoral advisor
C. L. Ferdinand Lindemann Gustav A. Bauer
Other academic advisors
Walther Franz Anton von Dyck
Martin Wilhelm Kutta (German:[ˈkʊta]; 3 November 1867 – 25 December 1944) was a German mathematician.
Kutta was born in Pitschen, Upper Silesia, Kingdom of Prussia (today Byczyna, Poland). He attended the University of Breslau from 1885 to 1890, and continued his studies in Munich until 1894, where he became the assistant of Walther Franz Anton von Dyck. From 1898, he spent half a year at the University of Cambridge.[1] From 1899 to 1909, he worked again as an assistant of von Dyck in Munich; from 1909 to 1910, he was adjunct professor at the Friedrich Schiller University Jena. He was professor at the RWTH Aachen from 1910 to 1912. Kutta became professor at the University of Stuttgart in 1912, where he stayed until his retirement in 1935.
In 1901, he co-developed the Runge–Kutta method, used to solve ordinary differential equations numerically. He is also remembered for the Zhukovsky–Kutta aerofoil, the Kutta–Zhukovsky theorem and the Kutta condition in aerodynamics.
Kutta died in Fürstenfeldbruck, Germany in 1944.
^"Kutta, Wilhelm Martin (KT899WM)". A Cambridge Alumni Database. University of Cambridge.
Martin Wilhelm Kutta (German: [ˈkʊta]; 3 November 1867 – 25 December 1944) was a German mathematician. Kutta was born in Pitschen, Upper Silesia, Kingdom...
named for German mathematician and aerodynamicist MartinKutta. Kuethe and Schetzer state the Kutta condition as follows:: § 4.11 A body with a sharp...
investigated it. The force on a rotating cylinder is known as Kutta–Joukowski lift, after MartinKutta and Nikolay Zhukovsky (or Joukowski), who first analyzed...
Applications. Orchard Publications. p. 15. ISBN 978-0-9709511-6-8. Roden, Martin S. (2014-05-17). Introduction to Communication Theory. Elsevier. p. [6]...
Carl Runge publishes the first Runge–Kutta method. 1901 - MartinKutta describes the popular fourth-order Runge–Kutta method. 1910 - Lewis Fry Richardson...
rotation. This force on a rotating cylinder is known as Kutta–Joukowski lift, after MartinKutta and Nikolai Zhukovsky (or Joukowski), who first analyzed...
Runge–Kutta methods, can be applied to the restated problem and thus be used to evaluate the integral. For instance, the standard fourth-order Runge–Kutta method...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
numerically integrated using standard techniques such as Euler's method, Runge–Kutta, etc. Finite-difference methods are numerical methods for approximating...
Lanchester, MartinKutta, and Nikolai Zhukovsky independently created theories that connected circulation of a fluid flow to lift. Kutta and Zhukovsky...
integration of ordinary differential equations and is the simplest Runge–Kutta method. The Euler method is named after Leonhard Euler, who first proposed...
that includes parts of the imaginary axis, such as the fourth order Runge-Kutta method, is used. This makes the SAT technique an attractive method of imposing...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Doctoral advisor C. Felix Klein Doctoral students Emil Hilb David Hilbert MartinKutta Alfred Loewy Hermann Minkowski Oskar Perron Arthur Rosenthal Arnold Sommerfeld...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Modern Astrodynamics. Ohio: Aphelion Press. p. 107. ISBN 978-145378-1470. Martin C. Gutzwiller, "Moon-Earth-Sun: The oldest three-body problem", Rev. Mod...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
Joseph Fourier Augustin-Louis Cauchy George Green Carl David Tolmé Runge MartinKutta Rudolf Lipschitz Ernst Lindelöf Émile Picard Phyllis Nicolson John Crank...
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