Runge-Kutta for a system of differential equations

dy/dx = f(x, y(x), z(x)), y(x₀) = y₀
dz/dx = g(x, y(x), z(x)), z(x₀) = z₀

k₁ = h · f(x_n, y_n, z_n)
l₁ = h · g(x_n, y_n, z_n)

k₂ = h · f(x_n + h/2, y_n + k₁/2, z_n + l₁/2)
l₂ = h · g(x_n + h/2, y_n + k₁/2, z_n + l₁/2)

k₃ = h · f(x_n + h/2, y_n + k₂/2, z_n + l₂/2)
l₃ = h · g(x_n + h/2, y_n + k₂/2, z_n + l₂/2)

k₄ = h · f(x_n + h, y_n + k₃, z_n + l₃)
l₄ = h · g(x_n + h, y_n + k₃, z_n + l₃)

k = 1/6 · (k₁ + 2 · k₂ + 2 · k₃ + k₄)

l = 1/6 · (l₁ + 2 · l₂ + 2 · l₃ + l₄)

x_n+1 = x_n + h

y_n+1 = y_n + k

z_n+1 = z_n + l

Last modified: 14 December 1995
boein@nsc.liu.se