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Hailey Newton

Hailey Newton

Answered question

2022-05-23

If A is a commutative C -subalgebra of B ( H ), where H is a Hilbert space, then the weak operator closure of A is also commutative.
I can not prove this.

Answer & Explanation

xxsailojaixxv5

xxsailojaixxv5

Beginner2022-05-24Added 10 answers

Apparently, A n A weakly iff
( u , A n v ) ( u , A v ) , for all  u , v H .
Assume that A , B belong to the weak closure of the commutative sub-algebra A, and A n A, B n B, weakly, with { A n } n N , { B n } n N A. Then A n B m = B n A m , for all u , v H. Fix know u , v H. Then, as n , we have that
( u , A n B m v ) ( u , A B m v )
and
( u , A n B m v ) = ( u , B m A n v ) = ( B m u , A n v ) ( B m u , A v ) = ( u , B m A v )
and hence ( u , A B m v ) = ( u , B m A v ), for all u , v H, and hence A B m = B m A, for all m N. Repeating this for ( u , A B m v ) = ( u , B m A v ), and letting m , we obtain that ( u , A B v ) = ( u , B A v ), and hence A B = B A.
Akira Huang

Akira Huang

Beginner2022-05-25Added 3 answers

Thanks a lot!

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