I am trying to work on stochastic differential equations and I have been trying to use Mathematica's built-in function to simulate the system of equations below. When i use the randomfunction to simulate it using the Milstein method. I keep getting an output implying the RandomFunction method is not a random process recognized by the system.
Please look at my codes and help.
This is the system of equations:
dx[t] = (-a*s(x[t] + y[t]) - s*z[t])dt + 0.1*x[t] dw1
dy[t] = (p*x[t] - l*y[t] + s*z[t])dt + 0.1*y[t] dw2
dz[t] = (-p*x[t] -l*y[t] -(s + m)*z[t]) + 0.1*z[t] dw3
where w1, w2 and w3 are standard Wiener processes.
a = 10; l = 24.625; m = 14.925; s = 0.415; p = 5;
proc1 =
ItoProcess[
{\[DifferentialD]x[t] == (-a*s x[t] - a*s y[t] - s*z[t] )\[DifferentialD]t + 0.1*x[t] \[DifferentialD]w1[t],
\[DifferentialD]y[t] == (p* x[t] - l*y[t] + s*z[t]) \[DifferentialD]t + 0.1*y[t] \[DifferentialD]w2[t], \[DifferentialD]z[t] == (-p*x[t] + {{l*y[t], -(s + m)*z[t]}}) \[DifferentialD]t + 0.1*z[t] \[DifferentialD]w3[t]},
{x[t], y[t], z[t]}, {{x, y, z}, {0.115, -0.115, 0}}, t,
{w1, w2, w3} \[Distributed] WienerProcess[]]
paths = RandomFunction[proc1, {0, 100, 0.01}, 250, Method -> "Milstein"];
