I have a complex matrix A (NxN). In Matlab eig(A) will give me all the complex eigenvalues of the matrix. Now I am interesting in finding the absolute value (r) and the argument (\phi) of each complex eigenvalues (each eigenvalue has its own r=abs(Z) and \phi=arg(Z)) . How can I write the following product expression:

\prod_j (sin(\phi_j)+r^(1/2)_j where the index j run over all the eigenvalues of the matrix A.