Let X be a compact hausdorff topological space with more than one element.Then prove that the

Amirah Hayden

Amirah Hayden

Answered question

2022-06-01

Let X be a compact hausdorff topological space with more than one element.Then prove that the ring C ( X ) of complex valued continuous functions on X is not an integral domain. Thanks for any help. Actually this question arose when I was trying to prove that any commutative C -algebra which is also an integral domain must be isomorphic to C and I think this statement is correct. The problem I am having is with the case when X is connected.

Answer & Explanation

treskjeqlalo

treskjeqlalo

Beginner2022-06-02Added 3 answers

Let X be a compact Hausdorff space with more than one point. Then C ( X ) is a natural, normal uniform algebra on X. This means that the character space of C ( X ) is exactly X and for each closed set E X and each closed set F X E, there exists a function f C ( X ) such that f ( y ) = 0 for all y F and f ( y ) = 1 for each y∈F. Thus C ( X ) necessarily contains non-zero divisors. This follows from the Tietze extension theorem.
Ayana Waller

Ayana Waller

Beginner2022-06-03Added 3 answers

Let A be a non-commutative C*-algebra that is also an integral domain. If a be a self-adjoint element of A, then it is well-known that C*(a), C*-algebra generated by a, is a commutative C*-algebra. Since, A is an integral domain, C*(a) is an integral domain, too. If we accept the above conjecture that any commutatve C*-algebra which is also an integral domain must be isomorphic to C, then C*(a) as a commutative C*-algebra which is also an integral domain must be C and it implies that a is a complex number. Since a is an arbitrary self-adjoint element of A, A must be isomorphic to C and it is a contradiction beacause of non-commutativity of A. Hence, I think the above conjecture in incorrect.

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