A common simplification technique used in theoretical physics is to take oscillatory solutions to differential equations and use trial solutions that are complex , i.e. .  Then, once we have the final solution to the equations, we just truncate the imaginary part of the solution, saying that the real part of the answer corresponds to the physical variables.

Can anyone justify this for me?  We've always done it, but I've never been clear on why it's supposed to work.

I think it has something to do with the linearity of the differential equations we're trying to solve: suppose z=x+iy is a solution to some linear differential equation.  Then, if z*=x-iy is also a solution, then z+z* = 2x is also a solution of the differential equation, and hence x is a solution.  But not all differential equations we work with have z* as another solution to the differential equation.  So how does this work?