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| -rw-r--r-- | proofs.tex | 2 |
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@@ -311,7 +311,7 @@ $A-B$ is positive definite (positive semi-definite). This order allows us to define the notion of a \emph{decreasing} as well as \emph{convex} matrix function, similarly to their real counterparts. With this definition, matrix inversion is decreasing and convex over symmetric positive definite -matrices~\cite{convexmatrix}. +matrices (see Example 3.48 p. 110 in \cite{boyd2004convex}). In particular, \begin{gather*} \forall S\subseteq\mathcal{N},\quad A(S)^{-1} \succeq A(S\cup\{i\})^{-1} |