Singular values of unitarily equivalent matrices

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Homework Statement


If two square matrices, A and B are unitarily equivalent then A = QBQ* for some unitary Q of the same size as A and B. Prove that A and B are unitarily equivalent if and only if they have the same singular values


Homework Equations





The Attempt at a Solution


I started from the definition of singular values:

Au = sigma v for singular vectors u and v
A*v = sigma u
substitution A with QBQ*,
QBQ*u = sigma v
(QBQ*)*v = QB*Q*v = sigma u

Can't see how this leads to proving that the sigmas of A and B are the same..?
 
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