Let $T,N:V\to V$ such that $N$ is a normal operator and $TN=NT$. Prove that $T^*N=NT^*$ and $N^*T=TN^*$.
I'd be glad for help because I don't even have an idea how to approach this
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Related. I'm hesitant to call this a duplicate, though. – Ben Grossmann Jul 22 '15 at 13:51
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1Look up "Fuglede's theorem" in any book on advanced linear algebra. – user1551 Jul 22 '15 at 14:20
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Hint: As a consequence of the spectral theorem, there exists a polynomial $p(t)$ such that $N^* = p(N)$.
Ben Grossmann
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