The theorem is stated in the context of commutative Banach (unitary) algebras, but the proof seems t

orlovskihmw

orlovskihmw

Answered question

2022-07-11

The theorem is stated in the context of commutative Banach (unitary) algebras, but the proof seems to show that it is valid for any commutative algebra defined as a linear space where a commutative, associative and distributive (with respect to the addition) multiplication is defined such that α K α ( x y ) = ( α x ) y = x ( α y ).
In any case, whether it concerns only commutative Banach unitary algebras or commutative algebras as defined above, I think we must intend contained as properly contained. Am I right?

Answer & Explanation

Nicolas Calhoun

Nicolas Calhoun

Beginner2022-07-12Added 15 answers

in Lemma 2 only necessity is demonstrated, and the demonstration does no more than point to the general structure theorem for arbitrary commutative rings - that for a ring A and an ideal I the ideals over I in A are in 1-1 correspondence with the ideals of A / I.
the answer to your question is, therefore, yes.

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Commutative Algebra

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?