# Runge-Kutta Algorithm

I'm looking at this RK4 since it was described as a better algorithm than the Euler algorithm

So i had a fiddle a while ago, but i think i've made a mistake somehow, although i'm not sure what.

``````var state = {},
t = 0,
dt = 0.1;

function acceleration(state, t) {

var k = 10,
b = 1;

return -k * state.x - b * state.v;
}

function eval1(initial, t) {
var output = {};

output.dx = initial.v;
output.dv = acceleration(initial, t);

return output;
}

function eval2(initial, t, dt, d) {

var st = {};
st.x = initial.x + d.dx * dt;
st.v = initial.v + d.dv * dt;

var output = {};
output.dx = st.v;
output.dv = acceleration(st, t + dt);

return output;
}

function integrate(state, t, dt) {

var a = eval1(state, t);
var b = eval2(state, t, dt * 0.5, a);
var c = eval2(state, t, dt * 0.5, b);
var d = eval2(state, t, dt, c);

var dxdt = 1.0/6.0 * (a.dx + 2.0 * (b.dx + c.dx) + d.dx);
var dvdt = 1.0/6.0 * (a.dv + 2.0 * (b.dv + c.dv) + d.dv);

state.x = state.x + dxdt * dt;
state.v = state.v + dvdt * dt;

}

state.x = 100;
state.v = 0;

while(t < 1) {
console.log(state.x, state.v);
integrate(state, t, dt);
t += dt;
}
``````

http://jsfiddle.net/e9vZh/2/

any thoughts?

-
I don't understand what the question is, is the script broken completely or are you getting an incorrect answer? –  FraserK Jul 29 '13 at 2:38
i'm getting incorrect answer, if you see the log the velocity (state.v) and the position (state.x) doesnt make any sense –  badcoder Jul 29 '13 at 3:06
Im currently not 100% familiar with the RK4 algorithm, i did do some work with improved Euler though. Have you checked that A: your algorithm is correct, B: Your solution will converge and/or C: you are getting significant rounding errors? –  FraserK Jul 29 '13 at 3:11
Were you using explicit (forward) or implicit (backward) Euler? RK4 is better (converges more quickly) than explicit Euler, however it is not necessarily better than implicit Euler - RK4 converges more quickly if it converges, but implicit Euler is more stable. If speed is not essential then stick with implicit Euler; if you need faster convergence and you're working with a stiff equation then use a Gear method or an Adams-Moulton method. –  Zim-Zam O'Pootertoot Jul 29 '13 at 4:24
wow, so much to learn. thank you! –  badcoder Jul 29 '13 at 4:50
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