Assume we have real symmetric $A,B,A-B$ non-negative definite matrix , how to prove $\sqrt{A}-\sqrt{B}$ also is non-negative definite matrix? Where $\sqrt{A}$ is the only symmetric non-negative definite matrix satisfy $X^2=A$.
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@Omnomnomnom can you help me? Thanks! – Idele Jan 17 '17 at 16:13
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Note that $\sqrt{A},\sqrt{B},$ and $\sqrt{A}^2 - \sqrt{B}^2$ are positive semidefinite. Then, apply the arguments from here.
Ben Grossmann
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