If you just need to find a new matrx B, then there is ABSOLUTELY NO reason to use optimization techniques!
A is assumed to be a matrix with complex eigenvalues. This will suffice:
A = randn(3) + i*randn(3)
eig(A)
Now, what is a similar matrix? Two matrices A and B are similar, If we can employ a similarity transformation between them. A similarity transformation is of the form
B = P*A*P^-1
Clearly, if the non-singular matrix P is some general orthogonal matrix, then it won't change the rank of A, it won't change the determinant, it won't change the eigenvalues.
So all you need to do is choose some random orthogonal matrix. (That wil allow you to construct B directly. NO OPTIMIZATION NEEDED!)
HINT: Can ORTH help you here? What would happen if you applied orth to some random matrix? That A happens to be complex and has complex eigenvalues is irrelevant.
Sorry. I won't do what clearly seems to be homework. As it is, I've already given you all the hint you need.
