Can we prove existence of Spectral Decomposition from Singular Value Decomposition(SVD)??

The Spectral Decomposition Theorem is, if $A$ is hermitian , then there exists a unitary matrix $U$ such that

$$U^{*}AU=D$$

where $D$ is a diagonal matrix.

By using the existence of SVD, can we prove that Spectral Decomposition exists as well.