| 释义 |
Runge–Kutta Math.|ˈrʊŋgə ˈkʊta|
The names of Carl David Tolme Runge (1856–1927) and Martin Wilhelm Kutta (1867–1944), German mathematicians, used attrib. to designate a method of approximating to solutions of differential equations.
1930J. B. Scarborough Numerical Math. Analysis xiii. 274 In the special case where dy/dx is a function of x alone the Runge-Kutta method reduces to Simpson's rule. 1950High-Speed Computing Devices (Engin. Res. Associates) vii. 128 By the Runge-Kutta method, the formulas which are applied are given below. 1975Nature 9 Oct 516/2 Membrane action potentials were computed with Hodgkin-Huxley equations, modified for Myxicola, using a modified fourth-order Runge–Kutta algorithm, and the six-parameter model. 1980Daily Tel. 16 Sept. 2 (Advt.), It has 128 program steps that fulfil practically every function a mathematician needs. From setting a program for the definite integral by the Simpson's rule..to the Runge-Kutta method. |