Can Hermitian Matrices be Traceless?

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SgrA*
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Hello,
Here's a textbook question and my solution, please check if it is correct, I'm slightly doubtful about the second part.

Consider Hermitian matrices [itex]M_1, M_2, M_3,\ and\ M_4[/itex] that obey:
[itex]M_i M_j+M_j M_i = 2 \delta_{ij} I \hspace{10mm} for\ i,\ j\ = 1,\ ... ,4[/itex]

(1) Show that the eigenvalues of [itex]M_i[/itex] are [itex]±1[/itex].
Solution: When [itex]i = j, \hspace{20mm} M_i M_i = I[/itex].
Since [itex]M_i[/itex] are Hermitian, this equation implies that they are unitary. The eigenvalues of a unitary matrix are complex numbers of unit modulus, since it's also Hermitian, they have to be real. So, the eigenvalues have to be [itex]±1[/itex]. [itex]\hspace{20mm} Q.E.D.[/itex]

(2) Show that [itex]M_i[/itex] are traceless.
Solution: When [itex]i ≠ j, \\<br /> M_i M_j = -M_j M_i\\<br /> \Rightarrow M_i M_j M_i = -M_j M_i M_i\\<br /> \Rightarrow M_i M_j M_i = -M_j I\\<br /> \Rightarrow Tr(M_i M_j M_i) = -Tr(M_j) \\<br /> \Rightarrow Tr(M_j M_i M_i) = -Tr(M_j)\\<br /> \Rightarrow Tr(M_j) = -Tr(M_j)\\<br /> \Rightarrow Tr(M_j) = 0. \hspace{20mm} Q.E.D.[/itex]

(3) Show that [itex]M_i[/itex] cannot be odd-dimensional matrices.
Solution: For some eigenbasis [itex]U, D = U^†M_iU, D[/itex] is a diagonal matrix with [itex]Tr(D) = Tr(M_i)[/itex] and the diagonal elements of [itex]D[/itex] are the eigenvalues, [itex]±1[/itex]. Also, [itex]Tr(D) = Tr(M_i) = 0.[/itex] An odd dimension cannot result in a traceless matrix, hence by argument of parity, [itex]M_i[/itex] are even dimensional matrices. [itex]\hspace{20mm}Q.E.D.[/itex]

Thanks!
 
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Yes, I think the three proofs are fine. Nothing suspicious about (2) in particular.
 
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Thanks for verifying, I'm still not very confident. :)
 
I mean, I got it right, but I'm not confident that I can get math right, yet. Hopefully more problems and I'll feel confident about my solutions. Thanks for asking! :)
 
I think there is a mistake on the 2nd question. Between line 4 and 5 you comutate Mi with Mj which you can't do it. You should put a (-) in front so the final result would be 0=0 . There is another way ;) .
 
No, it's okay - it's a cyclic permutation, just cycled the "wrong" way (or cycled twice)