| 21. | Hermitian 22 : 07, 15 September 2007 ( UTC)
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| 22. | Where the expression on the right is the Hermitian conjugate.
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| 23. | Since is not hermitian, is, in general, a complex number.
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| 24. | Recall that a Hermitian ( or real symmetric ) matrix has real eigenvalues.
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| 25. | This leads to various local rigidity results for actions on Hermitian symmetric spaces.
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| 26. | Which obviously remains true if is a Hermitian matrix.
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| 27. | Since positive semidefinite hermitian sesquilinear forms satisfy the Cauchy Schwarz inequality, the subset
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| 28. | Every matrix is consimilar to a real matrix and to a Hermitian matrix.
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| 29. | Thus, a Hermitian symmetric space of compact type.
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| 30. | Mathematically this means the operators must be Hermitian.
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