# Solve system of complex differential equations in Octave

Well, I wanna solve a system of complex ODE in the form:

$i\hbar \dfrac{\partial \rho}{\partial t} = \left[ H, \rho \right]$

http://mathbin.heroku.com/rq65idQ

where $\rho$ and $H$ are $n x n$ matrices.

I tried to define a general function using:

function xdot = f(x,t)

i*xdot(1)=
i*xdot(2)=

endfunction
x0=[0;0];
t=linspace(0,20,200);
y=lsode("f",x0,t).


but I got a error message concerning the i . My question is, then: how to solve a complex differential equation in Octave?

-

## 1 Answer

I think the issue is because i is on the LHS of the equal sign rather than the RHS.

Have you tried?

xdot(1) = <whatever your RHS expression is> / i;
xdot(2) = <whatever your RHS expression is> / i;

-