Diff for "HermitianMatrix"

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= Hermitian Matrix Definition =

$M$ is a Hermitian Matrix if $M = {\overset{―}{M}}^{⊤}$ . That is if $M$ is equal to its complex conjugate transposed, it is Hermitian.

-  ⇤ ← Revision 1 as of 2007-02-13 23:48:23 → 
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+   ← Revision 3 as of 2020-01-26 23:15:22 → ⇥
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-If [[latex2($M$ is a Hermitian Matrix if $M = \overline{M}^\top$)]] which mean it is equal to it complex conjugate transposed.
+= Hermitian Matrix Definition = 

$$M$$ is a Hermitian Matrix if $$M = \overline{M}^\top$$. That is if  $M$  is equal to its complex conjugate transposed, it is Hermitian.