Spectral radius in Banach algebra is commutative I want to show that for a Banach algebra A a

Emanuel Keith

Emanuel Keith

Answered question

2022-06-20

Spectral radius in Banach algebra is commutative
I want to show that for a Banach algebra A and elements x , y A, we have
r A ( x y ) = r A ( y x ) ,
where r A is a spectral radius. This is how I am trying to do that:
r a ( x y ) = lim n ( x y ) n 1 n = lim n x ( y x ) n 1 y 1 n .
And this is where I stuck, since I only know that x y x y . Could you please suggest any ideas on how to proceed with the proof?

Answer & Explanation

crociandomh

crociandomh

Beginner2022-06-21Added 19 answers

Note that
x ( y x ) n 1 y 1 / n x 1 / n ( y x ) n 1 1 / n y 1 / n = x 1 / n y 1 / n ( ( y x ) n 1 1 / ( n 1 ) ) ( n 1 ) / n .
Now think about what happens as n .

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