Suppose that A is a natural Banach function algebra on K , a compact Hausdorff space. So

hovudverkocym6

hovudverkocym6

Answered question

2022-05-12

Suppose that A is a natural Banach function algebra on K, a compact Hausdorff space. So A is realised as an algebra of continuous functions on K, is a Banach algebra for some norm (necessarily dominating the supremum norm) and each character on A is given by evaluation at a point of K.
If F K is closed, then
I ( F ) = { f A : f ( k ) = 0   ( k F ) }
is a closed ideal in A. If e.g. A = C ( K ) then every closed ideal is of this form.What's a simple example of an A where not every closed ideal is of this form?
Can we find an A which is conjugate closed?

Answer & Explanation

Haylie Cherry

Haylie Cherry

Beginner2022-05-13Added 17 answers

C 1 ( [ 0 , 1 ] ) - take the ideal of functions which vanish at p and whose derivatives vanish at p.
velinariojepvg

velinariojepvg

Beginner2022-05-14Added 2 answers

That was easy... Thank you!

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