Let A be a C &#x2217;<!-- ∗ --> </msup> -algebra. We say A is “comm

Mauricio Hayden

Mauricio Hayden

Answered question

2022-05-21

Let A be a C -algebra. We say A is “commutative“ if a b c = c b a for all a , b , c A and define “center” of A as
Z ( A ) = { v A : a v c = c v a a , c A }
Are these notions of “commutativity“ and “center” same as usual notions of commutativity and center in C -algebras?

Answer & Explanation

coquinarq1

coquinarq1

Beginner2022-05-22Added 14 answers

Suppose the C* algebra is commutative (in the weird sense). Choose an approximate identity { e λ } λ  L . Then the net { a e λ  c } λ  L = { a e λ c } λ  L converges to a c. Moreover, this net equals { c e λ  a } = { c e λ a }, which comes together at approx. As net limits are distinct in every Banach algebra, a c = c a. Of course, if the C* algebra is commutative in the normal sense, then it is commutative in the weird sense. Hence, "commutative" fits both definitions.
Similarly, if v is in the (weird) center, then { e λ v  c  } λ  L = { c  v  e λ } λ  L converges to ( c v )  = v  c  = c  v  = ( v c )  , so c v = v c for all c.

shelohz0

shelohz0

Beginner2022-05-23Added 3 answers

Thank you, thanks to you, I can solve my problem with other numbers

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