suppose A is a C &#x2217;<!-- ∗ --> </msup> -algebra and x is a norma

Despiniosnt

Despiniosnt

Answered question

2022-05-29

suppose A is a C -algebra and x is a normal element in A. C -algebra generated by x denote by A [ x ]. then
1) A [ x ] is commutative.
2) A [ x ] is the clouser of polynomials of two variable x and x .

Answer & Explanation

rass1k6s

rass1k6s

Beginner2022-05-30Added 13 answers

Let's do this backwards :
Let D denote the closure of all polynomials in x and x . Since x x = x x, any two polynomials commute. Hence, D is commutative.
Clearly, D is a C algebra and contains x. Any other C algebra B that contains x, must contain x , and hence must contain all polynomials in x and x . Thus, D B.
Hence, D = A [ x ], and so (1) and (2) hold.
Liberty Mack

Liberty Mack

Beginner2022-05-31Added 6 answers

A [ x ] is bad notation, since this usually refers to the smallest algebra (inside a larger one, or the universal example) containing A and x. But here A [ x ] is contained in A. A better and more common notation would be C [ x ] or (in order to emphasize the C -structure) C [ x ].

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