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If a linear transformation $A$ on a finite-dimensional inner product space is strictly positive and if $A\leq B$, then $B^{-1}\leq A^{-1}$

By ExtraProxies | Proxy Quality | Comments are Closed | 8 January, 2018 | 0

If a linear transformation $ A$ on a finite-dimensional inner product space is strictly positive and if $ A\leq B$ , prove that $ B^{-1}\leq A^{-1}$ . Note: Here $ M\geq 0$ means that $ M = C^*C$ for some $ C$ , and $ M\geq N$ means that $ M-N\geq0$ .Read more

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If a linear transformation $A$ on a finite-dimensional inner product space is strictly positive and if $A\leq B$, then $B^{-1}\leq A^{-1}$

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