X-Git-Url: http://gitweb.michael.orlitzky.com/?p=mjotex.git;a=blobdiff_plain;f=examples.tex;h=e70e0e1e0c63ad2d12ef667ebde7e69d9a6a0ad7;hp=f23b9e9af8911ad29eea5580ef80c0c45156ec47;hb=4d76b8a320e183fc1fcae6f0c55d7af96806a00b;hpb=a883c37180e9a8aaa9d1b2f611c93b6be7dc48be

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@@ -139,12 +139,12 @@
 
   \begin{section}{Cone}
     The dual cone of $K$ is $\dual{K}$. Some familiar symmetric cones
-    are $\Rnplus$, $\Lnplus$, $\Snplus$, and $\Hnplus$.  If cones
-    $K_{1}$ and $K_{2}$ are given, we can define $\posops{K_{1}}$,
-    $\posops[K_{2}]{K_{1}}$, $\Sof{K_{1}}$, $\Zof{K_{1}}$,
-    $\LL{K_{1}}$, and $\lyapunovrank{K_{1}}$. We can also define $x
-    \gecone_{K} y$, $x \gtcone_{K} y$, $x \lecone_{K} y$, and $x
-    \ltcone_{K} y$ with respect to a cone $K$.
+    are $\Rnplus$, $\Rnplusplus$, $\Lnplus$, $\Snplus$, and $\Hnplus$.
+    If cones $K_{1}$ and $K_{2}$ are given, we can define
+    $\posops{K_{1}}$, $\posops[K_{2}]{K_{1}}$, $\Sof{K_{1}}$,
+    $\Zof{K_{1}}$, $\LL{K_{1}}$, and $\lyapunovrank{K_{1}}$. We can
+    also define $x \gecone_{K} y$, $x \gtcone_{K} y$, $x \lecone_{K}
+    y$, and $x \ltcone_{K} y$ with respect to a cone $K$.
   \end{section}
 
   \begin{section}{Convex}